Introduction

Nowadays, most researchers and scientists pay great attention to those methods and techniques that are useful for improving heat transfer in various heat exchanger processes. To meet these requirements, researchers have developed a new type of fluid called a nanofluid. A nanofluid is a fluid that contains nanoparticles, which are nanometer-sized particles. Metals, their oxides, carbides and carbon nanotubes are the most commonly used nanoparticles in nanofluids. Nanofluids are helpful and have a wide range of applications, including microelectronics, fuel cells, pharmaceutical processes, cross-race machines, temperature controls, heating systems, exhaust gasses from smokestacks, heat dissipation, and so on. Due to the importance of nanofluids, numerous experimental and theoretical observations are being carried out by many researchers. In a detailed study, Kakac et al.1 investigated how nanofluids increase the thermal conductivity of a base fluid. Due to the high predictability of nanofluids, the problems identical to decay, clumping of new charges, and sedimentation do not occur2. In recent years, researchers have focused on the thermal perspectives of nanofluid because it is practical and has more applications in heat transfer and cooling. Natural convection is the general mode of heat movement. The phenomenon of natural convection allows heat to flow with external aids such as suction devices, fans, and pumps, etc., and these flows are created by changing the density of fluids. It has been observed that as the temperature changes, the density decreases, but the volume increases, so that the heated layer is loses its thickness and rises. In nature, free convection currents usually occur, caused by differences in concentration and density. The most important works and reviews by researchers can be such as Ghosh and Beg3 studied the effects of local thermal non-equilibrium (LTNE) on free convection in a uniformly curved, non-Darcian permeable annulus traversed by nanofluid. Fetecau et al.4 used an isothermal vertical plate to study a fractional nanofluid combining the effects of thermal radiation and natural convection, and found the solution of the temperature and dimensionless velocity using the Laplace transform and Caputo-Fabrizio time derivative. Toki and Tokis5 studied the free convection flow considering the time-dependent heating over a porous medium and used the Laplace transform to find an exact solution. Hussanan et al.6 studied mass and heat transfer using a vertical plate and a Newtonian heater and presented an accurate temperature and velocity analysis that satisfied the boundary conditions. Turkyilmazoglu and Pop7 studied a nanofluid over a vertical flat (infinite) surface in natural convection flow with radiation effect. Pramanik8 found a result for a Casson fluid flowing through a stretching surface exponentially porous under the influence of thermal radiation. Turkilmazgolu9 studied the effect of heat transfer and unsteady flow of a nanofluid through a moving vertical plate. Ge-JiLe et al.10 studied the radiated MHD flow of iron-containing nanoparticles with Brownian motion and thermophoresis through a cone. Kavya et al.11 revealed a hybrid nanofluid with MHD and heat extraction/injection through a shrinking/stretching cylinder with a suspension of MoS4 and copper nanoparticles. The study of a hybrid nanofluid composed of a Newtonian and a non-Newtonian fluid flowing over a stretching sheet was reported by12,13,14,15,16,17.

The magnetic field affects both man-made and natural currents. The magnetic field plays a major role in the pumping, stirring, and levitation of liquid metals and in the generation of electricity in industry. Molten metals are found in the Earth's core, creating a magnetic field known as the geomagnetic field. Sunspots and solar flares form the solar magnetic field. Due to practical applications, the study of MHD with heat transfer is of particular importance, as evidenced by the buoyancy-induced effect in quasi-solid bodies, water bodies, and the atmosphere, e.g., the Earth. Khan et al.15 studied the unsteady MHD flow with free convection in a porous medium with heat diffusion and a sloped wall. Khan et al.16 also considered a porous medium with Newtonian heating and a Casson type sodium alginate based nanofluid and analyzed the unsteady MHD flow. Yigra et al.17 dealt with mass transfer and convective heat in a nanofluid in applied magnetic field, flow past a permeable medium on a stretching sheet, chemical reaction, viscous dissipation and Soret effect. Gaffar et al.18 studied MHD (free convection) flow with ohmic dissipation of Eyring-Powell fluid and Hall/Islip flows in a porous medium on a vertical surface. Mahmoudi et al.19 obtained a result to improve the heat transfer and entropy generation in a flow with natural convection using a copper–water nanofluid and a two-dimensional trapezoidal enclosure with a continuous magnetic field. Khan et al.20 considered a non-compressible fluid (viscous) and worked on the results of MHD flow with free convection in a permeable medium located near an oscillating plate. Jha et al.21 used a vertical annular microchannel in which a magnetic field is present and discussed free convection flow. Sheikholeslami et al.22 inquired about the flow behavior using a constant heat source and a porous medium and obtained results for a nanofluid by increasing the buoyancy forces to enhance the heat transfer. In the applied magnetic field, Fetecau et al.23 studied the natural convection flow with radiation effects. Zeeshan et al.24 studied the spontaneous convection flow through porous media under the influence of MHD and provided pictorial and mathematical results. Ashorynejad et al.25 studied hybrid nanofluid as natural convection flow in an open cavity under the influence of MHD. Turkilmazgolu26 studied the heat transfer and mass properties of electrically conducting fluids over a apartment plate (infinite and vertical) and represented them numerically. Sheikholeslami et al.27 studied the effects of MHD on natural convection in a 2D horizontal annulus for an Al2O3-water nanofluid. Azhar et al.28 discussed a fractional nanofluid as a free convection system with a constant heat flux and a heat source flowing over an endless vertical plate, focusing on the graphical and analytical results.

Wang et al.29 studied the heat and mass transfer of a general MHD-Oldroyd-B bio-nanofluid in a permeable medium with increasing conditions in comparison. Heat transport by free convection is an important branch of fluid dynamics that has been matured for applications such as geothermal, geo- and astrophysics, paramedical sciences, and oil reservoirs, etc. Ramudu et al.30 have studied the influence of Soret and Dufour on Casson MHD fluid flow on an extended surface. The solution of the model is obtained by the Runge–Kutta method (along shooting). Farooq et al.31 presented the free convective flow of an oscillating Maxwell nanofluid with heat and mass transport. The velocity is a decreasing function of the volume fraction, while the temperature profile grows with varying estimates of the volume fraction parameter. Tang et al.32 reported the comparative approach of naturally convective flow of a fractional Maxwell fluid with radiation and uniform heat flux. The well-known integral transform (Laplace transform) is used to solve the fractional Caputo and Caputo-Fabrizio model. The phenomenon of heat absorption/consumption has numerous applications in engineering such as reinforcement of thrust bearings, cooling of metal sheets, recovery of unpolished oil and in medicine etc. Anantha Kumar et al.33 studied the first and second order slips in micropolar fluid flow over a convective surface with MHD and varying heat absorption/consumption. The velocity of the fluid increases as the second order slip is estimated, while the temperature decreases against the second order slip. Anantha Kumar et al.34 studied the MHD Cattaneo-Christov flow with variable heat source/sink over a cone and wedge. The study of non-Newtonian MHD fluid flow with heat absorption/consumption along different geometries was analyzed by35,36,37,41,42,43,44,45,46. Anantha Kumar et al.38 studied the MHD fluid Williamson with variable heat source/sink and chemical reaction on a curved/apartment surface. Also Anantha Kumar et al.39,40 presented the influence of free convection and nonlinear radiation of a micropolar MHD fluid near stagnation with convective surface.

From the literature review, no work has been done on convective heat transport of nanofluids along a porous medium under the effect of magnetism. Such geometries have many applications in science and technology, such as power generation, conductive plates, automobiles, refrigeration, power generation, etc. Blood is used as the base fluid for the suspension of CNTs. Carbon nanotubes (CNTs) as nanoparticles have great applications in the field of nanotechnology due to their unique electrical shape and mechanical properties. Applications of CNTs also include energy storage, conductive films, advanced electrodes, catalyst supports, coatings, biomedical and sensing applications, wearable electronics, solar and structural materials. CNTs have higher conductivity, which they use to build a network of conducting tubes. To identify the memory effect of nanofluids, the fractional derivative (Caputo-Fabrizio model) is solved exactly using Laplace technique (LT). Finally, various physical parameters are explained physically and graphically. The skin fraction and the Nusslet value are also obtained to determine the rate of heat transport and the drag forces of the nanofluid. Zakian's algorithm is used to simulate graphs and tables41.

The research questions are as follows, which is helpful in understanding the novelty and key research findings;

  • How do the SWCNTs and MWCNTs nanoparticles affect the flow of a viscous nanofluid with free convection?

  • How does the Lorentz force affect the velocity of the nanofluid when magnetic parameters are used?

  • How can the exact solution of the fractional model be determined and the memory effect on the nanofluid be established?

  • How does the porosity parameter behave on the velocity of the nanofluid?

  • How does the fractional parameter affect the thickness of the thermal boundary layer?

Mathematical statement of the problem

The equations for the free convection flow of an incompressible MHD fluid and the heat transfer in the presence of a heat source/sink at an infinite vertical plate in a porous medium subject to the Boussinesq approximation are as follows,

$$\nabla .{\mathbf{V}} = 0,$$
(1)
$$\rho_{nf} \left[ {\frac{{\partial {\mathbf{V}}}}{\partial t} + \left( {{\mathbf{V}}.\nabla } \right){\mathbf{V}}} \right] = \mu_{nf} \nabla^{2} {\mathbf{V}} + {\mathbf{J}} \times {\mathbf{B}} + {\mathbf{r}} + \rho_{nf} g\beta_{nf} \left( {T - T_{\infty } } \right),$$
(2)
$$\left( {\rho C_{p} } \right)_{nf} \left[ {\frac{\partial T}{{\partial t}} + \left( {{\mathbf{V}}.\nabla } \right)T} \right] = k_{nf} \nabla^{2} T + {{\varvec{\uptau}}}{\mathbf{.L}} - Q^{ * } \left( {T - T_{\infty } } \right).$$
(3)

where, \({\mathbf{r}}\) denotes the Darcy’s resistance, \({\mathbf{J}}\) is the current density, \({\mathbf{B}}\) demonstrates the total magnetic field, \({\mathbf{V}}\) denotes the velocity vector i-e \({\mathbf{V}} = \left[ {W\left( {Y,\tilde{t}} \right),0,0} \right],\)\({{\varvec{\uptau}}}{\mathbf{.L}}\) represents the term viscous dissipation, \({\mathbf{L}} = {\text{grad}}{\mathbf{V}}\), \({{\varvec{\uptau}}}\) denotes the Cauchy stress tensor i-e \({{\varvec{\uptau}}} = - {\rm P}{\rm I} + S,\)\({\rm P}\) is the pressure, \({\rm I}\) represents the unit tensor, \(S\) expressed the extra stress tensor, \(\rho_{nf} ,\;\mu_{nf} ,\;\beta_{nf} ,\;\left( {C_{p} } \right)_{nf} ,\;k_{nf}\) are respectively density, absolute viscosity, thermal expansion coefficient of nanofluid, specific heat and nanofluid’s thermal conductivity, \(g\) is the gravitational acceleration and \(Q^{ * }\) denotes the coefficient of heat source/sink.

Consider the natural convection flow of electrically conducting and incompressible nano-fluids. The flow medium is an infinite vertical plate. The magnetic field strength B_o acts uniformly and perpendicularly on the plate. At a given time, both the plate and the fluid are in a stationary position with ambient temperature. When the timecomes, the plate starts to move with velocity \({U}_{o}(1-{e}^{-\gamma t})\), provided that no heat enters or leaves the system. Here shows the amplitude of the motion and denotes the dimensional constant. The non-Darcian modal with porous medium is considered. In the energy equation, viscous dissipation is not included because of its small size. The geometry of the flow problem is shown in Fig. 1. In addition, the assumptions made to idealize the above model are examined as follows:

Figure 1
figure 1

Geometry of the flow problem.

The nanofluid consists of the base fluid blood and nanoparticles called SWCNTs and MWCNTs.

  • The thermal equilibrium is balanced between the base fluid and the nanoparticles.

  • The temperature buoyancy force in the momentum equation is a function of density.

  • The viscous dissipation is ignored in the energy equation.

  • The resulting magnetic field due to the nanofluid flow is neglected compared to the imposed magnetic field.

  • The influence of the polarization of the nanofluid is ignored, so no external electric field is applied.

However, one-dimensional and unidirectional flow is studied, and the vertical plate is assumed to be infinite in length, so temperature and velocity are only a function of and Darcy's law for viscous fluids is represented as follows

$${\mathbf{r}} = - \frac{{\mu_{nf} }}{K}W\left( {\tilde{t},Y} \right).$$
(4)
$${\text{div}}{\mathbf{B}} = 0,{\text{ curl}}{\mathbf{B}} = \mu_{m} {\mathbf{J}},{\text{ Curl}}{\mathbf{E}} = - \frac{{\partial {\mathbf{B}}}}{\partial t},$$
(5)

and utilization of Ohm’s law that lead to,

$${\mathbf{J \times B}} = - \left( {\sigma_{nf} B_{0}^{2} W,0,0} \right).$$
(6)

The suspension of nanoparticles in a fluid cannot be left uncontrolled; it must be controlled or tightened. Fluid movement and temperature are components of and because they are interdependent. Blood (as the base fluid) plus nanoparticles SWCNTs and MWCNTs form the nanofluid. Table 1 lists the physical and thermal properties of the particles.

Table 1 Shows the thermo-physical characteristics of human blood and nanoparticles.

In response to Eqs. (4)–(6) and all the assumptions mentioned, Eqs. (2) and (3) for nanofluids can be considered as follows28;

$$\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{nf} \frac{{\partial W(Y,\tilde{t})}}{{\partial \tilde{t}}} = \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\mu }_{nf} \frac{{\partial^{2} W(Y,\tilde{t})}}{{\partial Y^{2} }} - W(Y,\tilde{t})\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\sigma }_{nf} \mathop B\nolimits_{o}^{2} - W(Y,\tilde{t})\frac{{\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\mu }_{nf} }}{K} + g\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } } \right)_{nf} \left( {T(Y,\tilde{t}) - T_{\infty } } \right),$$
(7)
$$\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } C_{p} } \right)_{nf} \frac{{\partial T(Y,\tilde{t})}}{{\partial \tilde{t}}} = \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{k}_{nf} \frac{{\partial^{2} T(Y,\tilde{t})}}{{\partial Y^{2} }} - Q^{ * } (T(Y,\tilde{t}) - T_{\infty } ),Y,\tilde{t} > 0.$$
(8)

Here \(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\sigma }_{nf}\), \(K\) are respectively the electrical conductivity of nanofluid, permeability of porous medium, \(T\left( {Y,\tilde{t}} \right)\) is the temperature of the nano-fluid and \(W(Y,\tilde{t})\) denotes the velocity of nanofluid.

The expressions of \(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{nf}\), \(\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } } \right)_{nf}\),\(\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } C_{p} } \right)_{nf} ,\frac{{\kappa_{nf} }}{{\kappa_{f} }},{\text{ and }}\mu_{nf}\), \(\frac{{\sigma_{nf} }}{{\sigma_{f} }}\) are;

$$\left\{ \begin{gathered} \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{nf} = \ddot{\varphi }\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{s} + (1 - \ddot{\varphi })\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{f} ,\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } C_{p} } \right)_{nf} = (1 - \ddot{\varphi })\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } C_{p} } \right)_{f} + \ddot{\varphi }\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } C_{p} } \right)_{s} , \hfill \\ \left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } } \right)_{nf} = (1 - \ddot{\varphi })\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } } \right)_{f} + \ddot{\varphi }\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } } \right)_{s} ,\mu_{nf} = \mu_{f} \left( {1 - \ddot{\varphi }} \right)^{ - 2.5} , \hfill \\ \frac{{\kappa_{nf} }}{{\kappa_{f} }} = \frac{{(\kappa_{s} + 2\kappa_{f} ) - 2\ddot{\varphi }\left( {\kappa_{f} - \kappa_{s} } \right)}}{{(\kappa_{s} + 2\kappa_{f} ) + \ddot{\varphi }\left( {\kappa_{f} - \kappa_{s} } \right)}} = g\left( {\ddot{\varphi }} \right), \hfill \\ \frac{{\sigma_{nf} }}{{\sigma_{f} }} = 1 + \frac{{\left( {\frac{{\sigma_{s} }}{{\sigma_{s} }} - 1} \right)\ddot{\varphi }}}{{\left( {\frac{{\sigma_{s} }}{{\sigma_{s} }} + 2} \right) - \left( {\frac{{\sigma_{s} }}{{\sigma_{s} }} - 1} \right)\ddot{\varphi }}}. \hfill \\ \end{gathered} \right\}$$
(9)

Here \(\ddot{\varphi }\), \(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{f}\), \(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{s}\), \(C_{p}\) \(\kappa_{f} ,\kappa_{s} ,\mu_{f}\) represent the volume fraction of the nanoparticles, the density of the base fluid, the density of the solid particles or the specific heat at constant pressure, the thermal conductivity of the base fluid, the thermal conductivity of the base fluid and the viscosity of the base fluid.

For the prescribed Pde's (Eq. 7 and Eq. 8), the corresponding boundary conditions and initial conditions are as follows;

$$W(Y,0) = 0,\;\;T(Y,0) = T_{\infty } \;\;Y \ge 0,$$
(10)
$$W\left( {0,\tilde{t}} \right) = U_{o} \left( {1 - e^{{ - \gamma \tilde{t}}} } \right),k_{{nf}} \left. {\frac{{\partial T\left( {Y,\tilde{t}} \right)}}{{\partial Y}}} \right|_{{Y = 0}} = - q_{w} ,\tilde{t} > 0,$$
(11)
$$W(Y,\tilde{t}) = 0,T(Y,\tilde{t}) = T_{\infty } ,\;\;{\text{as}}\;\;Y \to \infty .$$
(12)

\(q_{w}\) represents heat passing from surface of wall.

Now incorporate the unit less parameters

$$\left[ \begin{gathered} Y^{*} = \frac{Y}{N},\tilde{t}^{*} = \frac{{\upsilon_{f} }}{{N^{2} }}\tilde{t},W^{*} = \frac{N}{{\upsilon_{f} }}W,\Theta = \frac{{k_{f} }}{{q_{w} }}(T - T_{\infty } ) \hfill \\ N = \left( {\frac{{k_{f} \upsilon_{f}^{2} }}{{g\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta }_{f} q_{w} }}} \right)^{{^{\frac{1}{4}} }} ,U_{o} = \frac{{\upsilon_{f} }}{N},\gamma^{*} = \frac{{\gamma N^{2} }}{{\upsilon_{f} }}, \hfill \\ \end{gathered} \right]$$
(13)

and by neglecting \(*\) from Eqs. (7), (8) and from Eqs. (1012), we get the unit less form given as;

$$\vartheta_{1} \frac{{\partial W(Y,\tilde{t})}}{{\partial \tilde{t}}} = \frac{{\partial^{2} W(Y,\tilde{t})}}{{\partial Y^{2} }} - \vartheta_{3}^{ * } W(Y,\tilde{t}) - \vartheta_{4}^{ * } W(Y,\tilde{t}) + \vartheta_{2} \Theta (Y,\tilde{t}),Y,\tilde{t} \ge 0$$
(14)
$$\vartheta_{3} \frac{{\partial \Theta (Y,\tilde{t})}}{{\partial \tilde{t}}} = \frac{{\partial^{2} \Theta (Y,\tilde{t})}}{{\partial Y^{2} }} - \vartheta_{4} \Theta (Y,\tilde{t}),Y,\tilde{t} \ge 0,$$
(15)
$$W(Y,0) = 0,\Theta (Y,0) = 0,Y > 0,$$
(16)
$$W(0,\tilde{t}) = U_{o} \left( {1 - e^{{ - \gamma \tilde{t}}} } \right),g(h,\ddot{\varphi })\left. {\frac{{\partial \Theta (Y,\tilde{t})}}{{\partial Y}}} \right|_{{Y = 0}} = - 1,\tilde{t} > 0,$$
(17)
$$W(Y,\tilde{t}) = 0,\Theta (Y,\tilde{t}) \to 0,\;\;{\text{as}}\;\;Y \to \infty .$$
(18)

\(\vartheta_{1}\), \(\vartheta_{2}\), \(\vartheta_{3}^{ * }\), \(\vartheta_{4}^{ * }\), \(\vartheta_{3}\), and \(\vartheta_{4}\) are values in the equations before which can be expressed as;

$$\left\{ \begin{gathered} \vartheta_{1} = \frac{1}{{p(\ddot{\varphi })}}\left( {(1 - \ddot{\varphi }) + \ddot{\varphi }\frac{{\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{s} }}{{\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{f} }}} \right),\vartheta_{2} \frac{1}{{p(\ddot{\varphi })}}\left( {(1 - \ddot{\varphi }) + \ddot{\varphi }\frac{{(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } )_{s} }}{{(\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho } \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta } )_{f} }}} \right), \hfill \\ \vartheta *_{3} = \frac{{\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\sigma }_{f} B_{o}^{2} N^{2} }}{{\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\rho }_{f} \upsilon_{f} p(\ddot{\varphi })}} = \frac{{\sigma_{nf} }}{{\sigma_{f} }}\frac{{M^{2} }}{{p(\ddot{\varphi })}}, \, \vartheta *_{4} = \frac{{N^{2} }}{K} = K_{p} \hfill \\ \vartheta_{3} = \frac{\Pr }{{g(\ddot{\varphi })}}\left( {(1 - \ddot{\varphi }) + \ddot{\varphi }\frac{{(\rho C_{p} )_{s} }}{{(\rho C_{p} )_{f} }}} \right),Pr = \frac{{\left( {\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\mu } C_{p} } \right)_{f} }}{{\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{k}_{f} }},\vartheta_{4} = \frac{{\upsilon_{f} Q^{ * } }}{{g(\ddot{\varphi })\sqrt {g\overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{\beta }_{f} \overset{\lower0.5em\hbox{$\smash{\scriptscriptstyle\frown}$}}{k}_{f} } q_{w} }} \hfill \\ \end{gathered} \right\},$$
(19)

where \(\Pr ,M,K_{p}\) are respectively represents the Prandtl number, the Magnetic factor and the inverse permeability.

To obtain a fractional model, we include the Caputo-Fabrizio time derivative in Eqs. (7) and (8):

$$\vartheta_{1} {}^{CF}\delta_{t}^{{\hat{\alpha }}} W(Y,\tilde{t}) = \frac{{\partial^{2} W(Y,\tilde{t})}}{{\partial Y^{2} }} - \vartheta_{3}^{ * } W(Y,\tilde{t}) - \vartheta_{4}^{ * } W(Y,\tilde{t}) + \vartheta_{2} \Theta (Y,\tilde{t}),0 < \hat{\alpha } \le 1,Y,\tilde{t} \ge 0,$$
(20)
$$\vartheta_{3} {}^{CF}\delta_{t}^{{\hat{\beta }}} \Theta (Y,\tilde{t}) = \frac{{\partial^{2} \Theta (Y,\tilde{t})}}{{\partial Y^{2} }} - \vartheta_{4} \Theta (Y,\tilde{t}),0 < \hat{\beta } \le 1,Y,\tilde{t} \ge 0.$$
(21)

The Caputo-Fabrizio time fractional derivative and their Laplace transform are given by;

$${}^{CF}\delta_{\tau }^{\chi } Z(Y,\tau ) = \frac{1}{1 - \tau }\int\limits_{0}^{\tau } {\frac{\partial Z(Y,r)}{{\partial r}}} \, e^{{\left( { - \frac{\chi (\tau - \chi )}{{1 - \chi }}} \right)}} dr,0 < \chi < 1,$$
(22)
$$L\left\{ {{}^{CF}\delta_{\tau }^{\chi } Z(Y,\tau )} \right\} = \frac{{r\overline{Z}(Y,r) - \overline{Z}(Y,0)}}{(1 - \chi )r + \chi }.$$
(23)

‘L’ denotes the LT.

Solution of the problem

Temperature field

Taking LT on (21) and make use of respective transformed ICs and BCs along with Eq. (23), we obtained

$$\frac{{\partial^{2} \overline{\Theta } (Y,r)}}{{\partial Y^{2} }} = \left[ {\frac{\eta q + \chi }{{r + \psi }}} \right]\overline{\Theta } (Y,r)$$
(24)

where

$$\eta = \frac{{\vartheta_{3} }}{{(1 - \hat{\beta })}} + \vartheta_{4} ,\chi = \frac{{\vartheta_{4} \hat{\beta }}}{{1 - \hat{\beta }}},\psi = \frac{{\hat{\beta }}}{1 - v},\hat{\beta } \in (0,1),$$

\(r\) represents the Laplace frequency and \(\beta\) is the fractional parameter.

$$\left. {\frac{{\partial \bar{\Theta }(Y,r)}}{{\partial Y}}} \right|_{{Y = 0}} = \frac{{ - 1}}{{g(\ddot{\varphi })r}},\bar{\Theta }(Y,r) \to 0,\;\;Y \to \infty .$$
(25)

For the solution of Eq. (24) and utilizing Eq. (25), we get

$$\overline{\Theta }\left( {Y,r} \right) = \frac{1}{{g(\ddot{\varphi })}}\frac{1}{r}\overline{\Omega } (Y,r;\eta ,\chi ,\psi ),$$
(26)

where

$$\overline{\Omega } (Y,r;\eta ,\chi ,\psi ) = \frac{1}{r}\frac{1}{{\sqrt {\frac{\eta r + \chi }{{r + \psi }}} }}e^{{ - Y\sqrt {\frac{\eta r + \chi }{{r + \psi }}} }} = \frac{1}{r}\frac{1}{{\sqrt {d_{{\hat{\beta }}} (r)} }}e^{{ - Y\sqrt {d_{{\hat{\beta }}} (r} )}} ,$$
(27)

also

$$\, d_{{\hat{\beta }}} (r) = \frac{\eta r + \chi }{{r + \psi }} = \frac{{\left[ {\vartheta_{3} + (1 - \hat{\beta })\vartheta_{4} } \right] + \vartheta_{4} \hat{\beta }}}{{(1 - \hat{\beta })r + \vartheta_{4} }},$$
(28)

Now we have to find \(\overline{\Omega }\) which is solved by using Laplace inverse over \(\overline{\Omega }\) but the given function is not a simple function, it is a compound function and can be defined as;

If \(\overline{F}(r)\) be a function then the Laplace inverse \(\overline{F}(r)\) of is \(F(\tilde{t})\). Then the LIT of \(F(d(r))\) is represented by;

$$\, L^{ - 1} \{ F(d(q))\} = \int\limits_{0}^{\infty } {F(m)s(m,\tilde{t})} dm, \;\; \text{and}$$
$$s(m,\tilde{t}) = L^{ - 1} \left\{ {e^{( - md(r))} } \right\}$$
(29)

Taking LIT to Eq. (28) and utilizing Faltung product present in Eq. (23), here \(\overline{F}(r) = \left( {\frac{1}{\sqrt r }} \right)e^{ - Y\sqrt r }\) and \(d(r) = d_{\beta } (r)\), we acquired the Laplace inverse of \(\overline{\Omega }(Y,r;\eta ,\chi ,\psi )\), we have

$$\Omega (Y,\tilde{t};\eta ,\chi ,\psi ) = \left\{ \begin{gathered} \frac{1}{\sqrt \pi }H(\tilde{t})\int\limits_{0}^{\infty } {\frac{1}{\sqrt \pi }} e^{{\left( {\frac{{ - Y^{2} }}{4m} - \eta m} \right)}} dm + \hfill \\ \sqrt {\frac{\eta \psi - \chi }{\pi }} \int\limits_{0}^{\infty } {e^{{\left( {\frac{{ - Y^{2} }}{4m} - \eta m} \right)}} } \times \hfill \\ \int\limits_{0}^{\infty } {\frac{{e^{ - \psi n} }}{\sqrt n }J_{1} \left( {2\sqrt {(\eta \psi - \chi )mn} } \right)dndm} \hfill \\ \end{gathered} \right\},$$
(30)

The unit step Heaviside function H(t) and the Bessel modified function of order one and first types are expressed in the preceding equation. The more reliable form of Eq. (30) is given below;

$$\Omega (Y,\tilde{t};\eta ,\chi ,\psi ) = \frac{1}{\sqrt \eta }H(\tilde{t})e^{ - Y\sqrt \eta } + \sqrt {\frac{\eta c - b}{\pi }} \int\limits_{0}^{\infty } {e^{{\left( {\frac{{ - Y^{2} }}{4m} - \eta m} \right)}} } \times \int\limits_{0}^{{\tilde{t}}} {\frac{{e^{ - \psi n} }}{\sqrt n }J_{1} \left( {2\sqrt {(\eta \psi - \chi )mn} } \right)dndm} ,$$
(31)

Applying LIT upon Eq. (26) we acquired

$$\Theta (Y,\tilde{t}) = \frac{1}{{g(h,\ddot{\varphi })}}\frac{1}{r}\Omega (Y,\tilde{t};\eta ,\chi ,\psi ).$$
(32)

Nusslet number

The Nusselt number Nu, is taken from23,

$$Nu\left( r \right) = \frac{{Nq_{w} }}{{k_{f} (T_{w} - T_{\infty } )}} = \frac{1}{{\Theta (Y,\tilde{t})}}|_{Y = 0} = \frac{1}{{L^{ - 1} \{ \overline{\Theta } (0,r)\} }},$$
(33)
$$Nu\left( {\tilde{t}} \right) = \frac{{g(r,\ddot{\varphi })}}{{\Omega (0,\tilde{t};\eta ,\chi ,\psi )}},$$
(34)

The expression \(\Omega (0,\tilde{t};\eta ,\chi ,\psi )\) has been acquired by using

$$\Omega (0,\tilde{t};\eta ,\chi ,\psi ) = L^{ - 1} \left\{ \begin{gathered} \frac{1}{r}\sqrt {\frac{r + \psi }{{\eta r + \chi }}} = \frac{1}{\sqrt \eta }e^{{\left( {\frac{{ - (\eta \psi + \chi )\tilde{t}}}{2\eta }} \right)}} \times J_{o} \left( {\frac{{ - (\eta \psi + \chi )\tilde{t}}}{2\eta }} \right)H(\tilde{t}) + \hfill \\ \frac{\psi }{\sqrt \eta } \times \int\limits_{0}^{{\tilde{t}}} {e^{{\left( {\frac{ - (\eta \psi + \chi )m}{{2\eta }}} \right)}} J_{o} \left( {\frac{ - (\eta \psi + \chi )m}{{2\eta }}} \right)} dm. \hfill \\ \end{gathered} \right\}$$
(35)

To find the thermal boundary layer thickness in term of fractional derivative. We will integrate thermal layer Eq. (24) from \(Y \to 0\) to \(Y \to \infty\)

$$\Phi_{T} (\tilde{t}) = \int\limits_{0}^{{\Phi_{1T} }} {\Theta (Y,\tilde{t})dY,}$$
(36)

By utilizing the ICs and BCs in Eqs. (17) and (18), we acquired

$$\vartheta_{3} {}^{CF}\delta_{{\tilde{t}}}^{{\hat{\beta }}} \Phi_{T} (\tilde{t}) + \vartheta_{4} \delta_{{\tilde{t}}}^{{\hat{\beta }}} \Phi_{T} (\tilde{t}) = \frac{1}{{g(h,\ddot{\varphi })}},$$
(37)

After solving Eq. (37) and using respective ICs and BCs, we acquired

$$\Phi_{T} \left( {\tilde{t}} \right) = \frac{1}{{\vartheta_{4} g(h,\ddot{\varphi })}}\left\{ {1 - \frac{{\vartheta_{3} }}{{\vartheta_{3} + (1 - \hat{\beta })\vartheta_{4} }}e^{{\left( {\frac{{ - \vartheta_{4} \hat{\beta }\hat{t}}}{{\vartheta_{3} + (1 - \hat{\beta })\vartheta_{4} }}} \right)}} } \right\},$$
(38)

For \(\hat{\beta } \to 1\) (integer order derivative), Eq. (38) becomes.

$$\Phi_{T} \left( {\tilde{t}} \right) = \frac{1}{{\vartheta_{4} g(h,\ddot{\varphi })}}\left\{ {1 - e^{{\left( {\frac{{ - \vartheta_{4} \tilde{t}}}{{\vartheta_{3} }}} \right)}} } \right\}.$$
(39)

Dimensional less velocity and skin Friction coefficient

Taking LT of Caputo-Fabrizio derivative of Eq. (23) upon Eq. (20) and their respective ICs and BCs and incorporate Eq. (27), we acquired

$$\frac{{\partial^{2} \overline{W} (Y,r)}}{{\partial Y^{2} }} = \frac{{sr\overline{W} (Y,r)}}{r + j} + \vartheta_{3}^{ * } \overline{W} (Y,r) + \vartheta_{4}^{ * } \overline{W} (Y,r) - \vartheta_{2} \frac{1}{{g(\ddot{\varphi })r}}\frac{1}{{\sqrt {d_{{\hat{\beta }}} (r)} }}e^{{ - Y\sqrt {d_{{\hat{\beta }}} (r} )}}$$
(40)

Where

$$s = \frac{{\vartheta_{1} }}{{1 - \hat{\alpha }}}{, }j{ = }\frac{{\hat{\alpha }}}{{1 - \hat{\alpha }}},$$

After solving Eq. (40) and using ICs and BCs, we acquired

$$\overline{W} (Y,r) = \left\{ \begin{gathered} \frac{\gamma }{r(r + \gamma )}\overline{\zeta } (Y,r;s,j,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } ) + a_{2} \overline{D} \left( r \right))\overline{\Theta } (Y,r) \hfill \\ \, - a_{2} \overline{\Theta } (0,r)\overline{D} (r)\overline{\zeta } (Y,r;s,j,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } ) \hfill \\ \end{gathered} \right\},$$
(41)
$$\overline{\zeta } (Y,r;s,j,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } ) = e^{{ - Y\sqrt {U_{{\hat{\alpha }}} (r)} }} ,{\text{ Where }}U_{{\hat{\alpha }}} (r) = \frac{sr}{{r + j}} + \vartheta_{3}^{ * } + \vartheta_{3}^{ * } ,$$

and

$$\begin{gathered} \overline{D} (r) = \left\{ \begin{gathered} \frac{(r + \psi )(r + j)}{{(s + \vartheta_{3}^{ * } + \vartheta_{4}^{ * } - \eta )r^{2} - r(\eta j + \chi - s\psi - \vartheta_{3}^{ * } \psi + \vartheta_{4}^{ * } - j\psi \vartheta_{3}^{ * } - \vartheta_{4}^{ * } j) - (j\chi - \vartheta_{3}^{ * } j\psi - \vartheta_{4}^{ * } j\psi )}} \hfill \\ = \frac{1}{s - \eta }\left( {1 + \frac{{l_{11} }}{{r - q_{1} }} - \frac{{l_{12} }}{{r - q_{2} }}} \right){ , } \quad s \ne \eta . \, \hfill \\ \end{gathered} \right\} \hfill \\ \, \hfill \\ \end{gathered}$$
(42)

where \(l_{11} = \frac{{(q_{1} + \psi )(q_{1} + j)}}{{q_{1} - q_{2} }},l_{12} = \frac{{(q_{2} + \psi )(q_{2} + j)}}{{q_{1} - q_{2} }}.\)

And

$$q_{1,2} = \frac{{\left\{ \begin{gathered} \eta j + \chi - s\psi - \vartheta_{3}^{ * } \psi - \vartheta_{4}^{ * } \psi - \vartheta_{3}^{ * } j - \vartheta_{4}^{ * } j \pm \hfill \\ \sqrt {(\eta j + \chi - s\psi - \vartheta_{3}^{ * } \psi - \vartheta_{4}^{ * } \psi - \vartheta_{3}^{ * } j - \vartheta_{4}^{ * } j)^{2} + 4(\chi j - \vartheta_{3}^{ * } j\psi - \vartheta_{4}^{ * } j\psi )(s + \vartheta_{3}^{ * } + \vartheta_{4}^{ * } - \eta )} \hfill \\ \end{gathered} \right\}}}{{2(s + \vartheta_{3}^{ * } + \vartheta_{4}^{ * } - \eta )}}$$
(43)

are the polynomial roots

$$p(r) = (s + \vartheta_{3}^{ * } + \vartheta_{3}^{ * } - \eta )r^{2} - r(\eta j + \chi - \psi s - \vartheta_{3}^{ * } \psi + \vartheta_{4}^{ * } - \vartheta_{3}^{ * } \psi j - \vartheta_{4}^{ * } \psi ) - (\eta j - \vartheta_{3}^{ * } \psi j - \vartheta_{4}^{ * } \psi j)$$
(44)

Applying Laplace inverse transform to Eq. (41) using Eq. (29) i.e. Eq. of compound function. with \(E(r) = e^{ - Y\sqrt r } {\text{ and }}U_{{\hat{\alpha }}} (r) = \frac{sr}{{r + j}} + \vartheta_{3}^{ * } + \vartheta_{3}^{ * } ,\) we acquired

$$\zeta (Y,\tilde{t};s,j,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } ) = \delta (\tilde{t})e^{{ - Y\sqrt {s + \vartheta_{3}^{ * } + \vartheta_{4}^{ * } } }} + \zeta_{o} (Y,\tilde{t};s,j,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } ),$$
(45)

where

$$\zeta_{o} \left( {Y,\tilde{t};s,j,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } } \right) = \frac{{Y\sqrt {sj} e^{{ - j\tilde{t}}} }}{{2\sqrt {\pi \tilde{t}} }}\int\limits_{0}^{\infty } {\frac{{e^{{^{{\left( {\frac{{ - Y^{2} }}{4x}} \right. - x\left( {s + \vartheta_{3}^{ * } + \vartheta_{3}^{ * } } \right)}} }} }}{x} \times J_{1} \left( {2\sqrt {sjx\tilde{t}} } \right)dx.}$$
(46)

The LIT of \(\overline{D}(r)\), present in Eq. (42) is,

$$D(\tilde{t}) = \frac{1}{s - \eta }\left( {\delta (\tilde{t}) + l_{11} e^{{q_{1} \tilde{t}}} - l_{12} e^{{q_{2} \tilde{t}}} } \right) \,$$
(47)

Applying the Laplace inverse transformation on Eq. (41) and Faltung theorem, we acquired

$$\begin{aligned} W(Y,\tilde{t}) & = \left( {1 - e^{{ - \gamma \tilde{t}}} } \right)e^{{ - Y\sqrt {s + \vartheta_{3}^{ * } + \vartheta_{4}^{ * } } }} + \vartheta_{2} \int\limits_{0}^{{\tilde{t}}} {\left( {1 - e^{{ - \gamma (\tilde{t} - k)}} } \right)\zeta_{o} (Y,k;s,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } )dk + \vartheta_{2} \int\limits_{0}^{{\tilde{t}}} {D(\tilde{t} - k)\Theta (Y,k)dk} } \hfill \\ & \quad - \vartheta_{2} \int\limits_{0}^{{\tilde{t}}} {\int_{0}^{k} {\Theta (0,\tilde{t} - k)D(k - \varsigma )\zeta_{o} (Y,\varsigma ;s,\vartheta_{3}^{ * } ,\vartheta_{4}^{ * } )d\varsigma dk.} } \, \hfill \\ \end{aligned}$$
(48)

Skin friction coefficient is a basic physical quantity of relevance that is defined as

$$C_{f} = \left\{ \begin{gathered} \frac{{\hat{\tau }_{w} }}{{\hat{\rho }_{f} ({{\hat{\upsilon }_{f} } \mathord{\left/ {\vphantom {{\hat{\upsilon }_{f} } N}} \right. \kern-\nulldelimiterspace} N})^{2} }} = p(\ddot{\varphi })\frac{{\partial^{2} W(Y,\tilde{t})}}{{\partial Y^{2} }}|_{Y = 0} = p(\ddot{\varphi })L^{ - 1} \left( {\frac{{\partial^{2} W(Y,\tilde{t})}}{{\partial Y^{2} }}|_{Y = 0} } \right) \hfill \\ = p(\ddot{\varphi })L^{ - 1} \left( {\vartheta_{2} \overline{\Theta } {(0,}r{)}\overline{D} {(}r{)}\overline{Q} {(}r{) - }\frac{{\vartheta_{2} }}{{g(h,\ddot{\varphi })}}\frac{1}{r}\overline{D} {(}r{)} - \frac{\gamma }{r(r + \gamma )}\overline{Q} {(}r{)}} \right) \hfill \\ \end{gathered} \right\},$$
(49)

where

$$Q(r) = \sqrt {\frac{sr}{{r + j}} + \vartheta_{3}^{ * } + \vartheta_{4}^{ * } } \,$$
(50)

The LIT of skin friction coefficient is;

$$C_{f} = p(\ddot{\varphi })\left\{ {\vartheta_{2} \int\limits_{0}^{{\tilde{t}}} {\int\limits_{0}^{k} {D{(}k - \varsigma {)}\Theta {(0,}\tilde{t} - k{)}Q{(}\varsigma } } {)}d\varsigma dk - \frac{{\vartheta_{2} }}{{g(h,\ddot{\varphi })}} \times \int\limits_{0}^{{\tilde{t}}} {D{(}k{)}dk} - \int\limits_{0}^{{\tilde{t}}} {Q(k)(1 - e^{{ - \gamma (\tilde{t}{ - }k)}} )dk} } \right\},$$
(51)

With

$$Q(\tilde{t}) = \sqrt \vartheta \left( {\frac{\vartheta j - \chi }{{2\vartheta }}J_{o} \left( {\frac{\vartheta j - \chi }{{2\vartheta }}\tilde{t}} \right) + \delta (\tilde{t})} \right)e^{{\left( {\frac{ - \vartheta j + \chi }{{2\vartheta }}\tilde{t}} \right)}} + \frac{\chi - \vartheta j}{{2\sqrt \vartheta }}J_{o} \left( {\frac{\vartheta j - \chi }{{2\vartheta }}\tilde{t}} \right)e^{{\left( {\frac{ - \vartheta j + \chi }{{2\vartheta }}\tilde{t}} \right)}} .$$
(52)

Numerical results and discussions

In the following section, a detailed graphical description of the results obtained in the previous section is given. Figures 2, 3, 4 and 5 show the behavior of various parameters with respect to the temperature curve. Figure 2 shows the physical observation of the fractional parameter on the temperature field. It shows that the temperature of nanofluids increases with the increase of the estimated fractional parameter. Physically, this behavior is due to the kernel of the fractional operator. The kernel studied the memory of the function and is capable of impectvely capturing the memory effect through the process. Thus, temperature of nanofluid elevates. From Fig. 3 it can be seen that the temperature of the nanofluid increases with increasing value of the volume fraction physically, this result is due to the high thermal conductivity of CNTs, which causes the thermal conductivity of the base fluid to increase when CNTs are added to it. Consequently, the temperature profile grows. This result highlights the importance of nanoparticles in the heating and cooling process. Figure 4 shows the temperature of the outline when the heat injector or the heat sink is is associated to the system. The temperature field falls with the intensifying estimations of. In associated graph, represents heat consumption, represents heat injection and represents that no heat is consumed or supplied. Physically, the addition of heat means an increase in the temperature of the nanofluid, while the consumption of heat means a decrease in the temperature of the nanofluid. In this process, heat is consumed because the temperature is lowered. Figure 5 shows the transient effect on the temperature curve. The nanofluid temperature curve increases as the time period increases. The temperature of the nanofluid is high near the plate and finally reaches zero asymptotically away from the plate. Figures 6, 7, 8, 9, 10, 11 and 12 show the characteristics of various relevant parameters on the velocity contour. Figure 6 describes the effect of the fractional parameter on velocity. It is worth noted that the nanofluid’s velocity boost with accelerating the fractional parameter. Physically, it is due to the higher value of momentum boundary layer, the velocity is boosted.

Figure 2
figure 2

Temperature profile for different values of \(\beta\).

Figure 3
figure 3

Temperature profile for different values of \(\ddot{\varphi }\).

Figure 4
figure 4

Temperature profile for different values of \(Q\).

Figure 5
figure 5

Temperature profile for different values of \(t\).

Figure 6
figure 6

Velocity profile for different values of \(\beta\).

Figure 7
figure 7

Velocity profile for different values of \(\alpha\).

Figure 8
figure 8

Velocity profile for different values of \(\ddot{\varphi }\).

Figure 9
figure 9

Velocity profile for different values of \(M\).

Figure 10
figure 10

Velocity profile for different values of \(K\).

Figure 11
figure 11

Velocity profile for different values of \(\gamma\).

Figure 12
figure 12

Velocity profile for different values of \(t\).

Figure 7 shows the effects of the fractional parameter on the velocity contour. The higher the fractional parameter is estimated, the higher the velocity of the nanofluids. Figure 8 shows the behavior of the volume fractional parameter on the velocity contour. From Fig. 8, it can be seen that the velocity and momentum of the boundary layer of the nanofluids increases. Physically, the resistance between the particles of the nanofluid is low due to the higher temperature, so the velocity increases. This is also due to the fact that the suspension of CNTs in the base fluid reduces the viscous forces and leads to an increase in the momentum boundary layer. Figure 9 shows the characteristics of the magnetic factor on the velocity sketch. The velocity of the nanofluid decreases at a higher value of the magnetic factor. This is because the magnetic field acts on electrically isolated nanofluids, which behave as a source for generating Lorentz drag forces. Because of these drag forces, the velocity of the nanofluids decreases. As the fluids move away from the plate, the Lorentz force weakens and the fluid comes to rest. Figure 10 shows the influence of the inverse permeability parameter on the velocity of the nanofluid. The momentum boundary layer thickness and velocity decreases with a larger estimate of permeability parameters . Physically, due to the high porosity of the medium, the resistance in the nanofluid particles increases, causing the velocity to decrease. In Fig. 11, the influence of on the velocity of the nanofluid is shown. It can be seen that the velocity increases as the estimate of increases. The velocity is initially higher, later it asymptotically approaches zero. Physically, this happens because there is inverse relation between and viscous forces. As we elevate the estimation of, the viscous forces reduce. As a result, velocity of nanofluid rises. Figure 12 shows that the velocity of nanofluids increases with increasing time value. The momentum boundary layer is raised for a higher estimate of the transient effects. Figure 13 shows the effect of SWCNTs and MWCNTs on the temperature distribution. The temperature of SWCNTs is higher than that of MWCNTs due to the high thermal conductivity of SWCNTs. Figure 14 shows the comparison between the velocity of SWCNTs and MWCNTs. It shows that the velocity of MWCNTs is larger than that of SWCNTs. Figure 15 is the contour plot for the thickness of the thermal layer. The thickness of the thermal boundary layer decreases as we increase the estimates of the fractional parameters Table 2 shows the properties of various relevant parameters on the Nusselt number of SWCNTs and MWCNTs. It can be seen that the heat transport rate increases with the increase of heat source/sink and the time while decrease occurs against fractional parameter and volume fraction From Table 3, it can be seen that the skin fraction (drag forces) increases with the increase in the fractional parameter while the function against the other fractional parameter for both SWCNTs and MWCNTs. Similarly, skin friction is dominant with the increasing value of the magnetic factor, permeability parameter and heat source or sink. Moreover, the drag forces are de-escalates with the escalation of volume fraction time and furthermore, the skin fraction of MWCNTs is lower than the SWCNTs.

Figure 13
figure 13

Analysis of SWCNTs and MWCNTs on \(\Theta \left( {Y,t} \right).\)

Figure 14
figure 14

Analysis of SWCNTs and MWCNTs on \(W\left( {Y,t} \right).\)

Figure 15
figure 15

Analysis of \(\beta\) on thermal boundary layer thickness.

Table 2 Demonstrated the influence of various parameters on Nusslet number of both SWCNTs and MWCNTs.
Table 3 Depicts the impact of various pertinent parameters on skin fraction of both SWCNTs and MWCNTs.

Conclusion

The main topic of this research is to investigate the MHD and permeability effects on CNT-based nanofluids. SWCNTs and MWSNTs are suspended in blood (base fluid). Laplace transform is a very powerful mathematical tool used in various fields of physics and electrical power engineering. The Laplace transform is very important in circuit analysis, system modeling, analog signal processing, digital signal processing, process control, and radioactive decay, etc. Laplace transform technique is used to solve the non-dimensional fractional model. The exact solution for the velocity, temperature and thermal layer thickness is obtained by the above method. Zakian's algorithm is used for the simulations and inverse Laplace transform. The physical parameters such as skin fraction (drag force) and Nusselt number (heat transfer rate) are also studied. The conclusions of this study are presented below:

  • The temperature of the nanofluid is higher due to the increasing estimate of the volume fraction parameter \(\ddot{\varphi }\), fractional parameter \(\beta\), and time \(t\).

  • The greater the value of the heat source or heat sink, the lower the temperature curve.

  • The velocity of nanofluids in escalating function as we estimate the volume escalated fractional parameter \(\ddot{\varphi }\), fractional parameters \(\alpha {\text{ and }}\beta\), time \(t\), and \(\gamma .\)

  • The velocity of the nanofluid is deescalated to increase the estimate of the magnetic factor \(M\) and permeability parameter \(K\) due to high drag forces.

  • Nanofluid temperature is higher for SWCNTs, while the reverse effects on velocity are seen.

  • The thermal boundary layer increases against the fractional parameter \(\beta .\)

  • The heat transport rate is lower for both SWCNTs and MWCNTs as a function of fraction parameters \(\beta\) and \(\ddot{\varphi }\) higher as a function of heat source/sink and time.

  • Reinforcement occurs in the skin fraction with the growing estimate of \(M,K,\alpha {\text{ and }}\gamma\) while boosting the value of \(\beta ,\ddot{\varphi },Q{\text{ and }}t,\) reduces the skin fraction.

In future, we will study, what will be the effects of various fractional operators on free convective trickling over a porous medium of nanofluids with MHD and heat source/sink.