Superior thermal conductivity in suspended bilayer hexagonal boron nitride

Abstract

We reported the basal-plane thermal conductivity in exfoliated bilayer hexagonal boron nitride h-BN that was measured using suspended prepatterned microstructures. The h-BN sample suitable for thermal measurements was fabricated by dry-transfer method, whose sample quality, due to less polymer residues on surfaces, is believed to be superior to that of PMMA-mediated samples. The measured room temperature thermal conductivity is around 484 Wm⁻¹K⁻¹(+141 Wm⁻¹K⁻¹/ −24 Wm⁻¹K⁻¹) which exceeds that in bulk h-BN, providing experimental observation of the thickness-dependent thermal conductivity in suspended few-layer h-BN.

Introduction

Hexagonal boron nitride (h-BN), analogous to graphene, is an one-atomic layer two dimensional (2D) material with honeycomb structures in which equal Boron and Nitrogen atoms bond compartmentally by sp2 hybridization¹. Due to their strong covalent bond between B-N and C-C atoms, h-BN and graphene hold similar structural and physical properties such as strong mechanical properties, high thermal stability and superior thermal conductivity^{2,3,4,5,6,7,8,9,10}. Consequently, h-BN has been proposed to be potential as insulating and dielectric layer for graphene based electronics. Given their geometric similarity and atomic flat on surface, the carrier mobility in graphene/h-BN devices has been significantly improved by a factor of 20 at room temperature when comparing to that of graphene on amorphous SiO₂ substrate and reaches an ultra high value of 1,000,000 cm²V⁻¹s⁻¹ at low temperature^11,12,13. Furthermore, it’s important to note that thermal conductivity in bulk h-BN has been found to be as high as 390 Wm⁻¹K⁻¹, indicating a potential 2D material for efficient heat removal and conduction in further integration and miniaturization of the modern electronics¹⁴.

Several theoretical calculations have suggested that room temperature thermal conductivity in single layer h-BN reaches 600Wm⁻¹K⁻¹ when considering the exact numerical solution of the Boltzmann transport equation, far exceeding that in bulk h-BN (~390 Wm⁻¹K⁻¹)^14,15,16,17. This is reasonable as out-of-plane acoustic phonons are suppressed due to interlayer interaction, as already observed in graphene and graphite theoretically and experimentally⁹. However, recent experiments show that the highest thermal conductivity obtained is around 243 Wm⁻¹K⁻¹ in 9-layer h-BN by Raman method⁶ and around 360 Wm⁻¹K⁻¹ in 11-layer h-BN by microbridge device with built-in thermometers⁴, respectively. This is understandable that organic residues (e.g. PMMA) and functional groups which are introduced during PMMA-mediated wet-transfer process dominate thermal conduction in few-layer BN and reduce its value to below that of bulk h-BN^4,18. Therefore, to study the intrinsic thermal conduction behavior in few-layer h-BN, a new transfer technique should be introduced to obtain high quality sample with as less residues as possible.

Here we reported thermal conductivity measurement on suspended bilayer h-BN by using prepatterned microstructures with built-in platinum-resistive thermometers. A PMMA-free technique was used to fabricate suspended device suitable for thermal conduction measurement. This dry-transfer method guarantees cleaner surfaces of h-BN sample than that in PMMA-mediated method. Consequently, the measured room temperature thermal conductivity reaches a high value of 484 Wm⁻¹K⁻¹(+141 Wm⁻¹K⁻¹/−24 Wm⁻¹K⁻¹), exceeding that in bulk hexagonal boron nitride, indicating h-BN as a potential 2D material for efficient heat removal and thermal management in integrated electronic circuit with further miniaturization.

Results

We employed the standard prepatterned microstructures for thermal measurements^2,19,20,21, in which the two Pt/SiNx membranes, named Heater and Sensor in Fig. 1b and their six supporting Pt/SiNx beams were released from silicon substrate by wet etching for 2.5 h to 3 h. The suspended prepatterned microstructure device was first placed in O₂ plasma for 5 min to clean possible organic residue on top of Pt/SiNx membranes. At the mean time, few-layer h-BN was exfoliated from BN power by scotch tape method onto PDMS film, in which h-BN can been easily identified by different contrast under optical microscope (Fig. 1a). Subsequently, h-BN/PDMS was aligned under micro-manipulator upside down and attached onto the center of prepatterned microstructure. Due to the strong van der waals force/static electric force, the few-layer h-BN was left on Pt electrode after PDMS being peeled off. It is important to note this transfer process is challenging and the sample yield is only few hundred percents. Fortunately, a rectangular h-BN between two suspended membranes can be seen in Fig. 1b,c. The device was annealed at 225 °C in H₂/Ar atmosphere for two hours to clean the possible residue on top and bottom sides of h-BN thin film before any thermal measurements.

Figure 1

Details of the sample.

(a) Optical image of exfoliated bilayer h-BN on PDMS. (b,c) Optical and Scanning Electron Microscope image of bilayer BN suspending on prepatterned devices; the rectangle in the center which bridging Heater and Sensor is the suspended h-BN sample with l = 3 μm and w = 3.3 μm. (d) Atomic Force Microscope on the edge of h-BN sample; the step of ~1 nm is the mark of bilayer h-BN. The scale bars are 10 μm.

Raman spectroscopy is one of the most powerful and fastest methods to detect the number of layers in 2D materials such as graphene and MoS₂^22,23,24,25. However, the Stokes shift of Raman peaks varies weekly between different h-BN layers, making it impossible to detect the thickness of h-BN samples by Raman method²⁶. Hence, Atomic Force Microscope was used and a clear step of around 1 nm was obtained on edge, indicating two atomic layers in the fabricated h-BN sample (Fig. 1d).

We followed the same approach employed by Xu et al. to measure the thermal conductivity of the suspended device². The device was loaded in Variable Temperature Instrument with vacuum better than 1 × 10⁻⁴ pa and an in-situ anneal was carried out at T = 450 K for 2 hours to remove possible residual gas and water molecule. The total measured thermal conductance of h-BN sample (σ_s) and the six supporting Pt/SiNx beams (σ_b) follows²¹:

where Q_h and Q_s are the Joule heating power on the Heater and one supporting Pt/SiNx beam, respectively. ΔT_h and ΔT_s, corresponding to resistance changes ΔR_h and ΔR_s, are the temperature rise on Heater and Sensor, respectively. In previous studies, a uniform temperature distribution was assumed and the average temperature rise ΔT_h (ΔT_s) in Heater (Sensor) was used instead of the real temperature rise ΔT_R,h (ΔT_R,s) at the joint part of sample and Heater (Sensor). This assumption is valid when thermal conductance is low, e.g. σ_s < 0.1σ_b. However for high thermal conductance sample when ΔT_h is comparable to ΔT_s, according to equation (2), a tiny inaccuracy in measuring ΔT_h (ΔT_s) will result in significant changes in final σ_s.

As such, the Finite Element Simulations (COMSOL Multiphysics 5.2, License No: 9400382) was carried out to simulate the temperature distribution in the suspended membranes, Heater and Sensor, at each temperature we measured. Figure 2 shows the simulating results at T = 300 K. In this simulation, thermal conductivity of Pt can be obtained from the Weidemann-Franz law, thermal conductance of SiNx beam was determined by subtracting the thermal conductance contribution of Pt from the measured Pt/SiNx beams σ_b and its thermal conductivity is calculated to be around 5.8 Wm⁻¹K⁻¹. The ΔT_R,h (ΔT_R,s) was obtained by adjusting the averaged temperature of Heater (Sensor) membrane bounded by dash-dot rectangle to be consistent with the measured temperature rise ΔT_h (ΔT_s). Figure 2b illustrates the temperature profile cross the platform with ΔT_R,s determined to be 5.344 K, comparing to ΔT_h = 6.822 K and ΔT_s = 5.245 K. The final thermal conductivity of h-BN sample varies 8% and 7.2% at T = 300 K and T = 80 K respectively after the Finite Element Simulations.

Figure 2

Finite Element Simulations (COMSOL Multiphysics 5.2) of the temperature distributions in Sensor.

(a) Temperature distribution of Sensor (left) and the whole suspended device (right) at T = 300 K. (b) Temperature profile crossing the Sensor (indicated by dashed line in (a)) at T = 300 K.

Generally speaking, the total measured thermal resistance R = 1/σ_s consistent of the contributions from suspended region of h-BN sample, R_BN and the contacting area between h-BN sample and Pt electrode, R_c, i.e. R = R_BN + 2R_c. The thermal contact resistance R_c can be calculated using interfacial thermal resistance (R_int). The two have been shown to be related as¹⁸

where κ_c is thermal conductivity of supported bilayer h-BN (we assume κ_c equal to κ in suspended bilayer h-BN), A is the cross section area between h-BN sample and electrode, w is the sample width, l_c is the contact length, R_int is the interfacial thermal resistance per unit area between BN and Pt electrode. We have not found R_int of clean h-BN and Pt interface and the samples in reference have PMMA residues on bottom and top h-BN surface⁴, therefore R_int of clean graphene and metal interface was used here. Based on the R_int data on available literature for graphene measured by the same prepatterned microstructure method, we used the data of R_int from the length dependent measurement of suspended single layer graphene with two ends encased by Au and Pt electrode². If this R_int is used, the obtained 2R_c/R_BN ratio reaches 29.1% and 34.1% at T = 300 K and T = 60 K, respectively.

Figure 3a shows the final thermal conductivity κ of biyaler h-BN with respect to temperature. κ is calculated from κ = σl/(wh), where l = 3 μm is the suspended length, w = 3.3 μm is suspended width, h = 0.666 nm is the thickness of bilayer h-BN as suggested^14,27, σ is the obtained thermal conductance after the Finite Element Simulations. The plus error bars (i.e. 29.1% at T = 300 K and 34.1% at T = 60 K) are resulted from the uncertainty in determining the contact resistance 2R_c as mentioned above in this manuscript. The measured thermal conductivity increases with temperature and shows a broad plateau/peak when T > 250 K due to the Umklapp phonon scattering process dominating the thermal conduction at higher temperature. The plateau/peak value reaches as high as 484 Wm⁻¹K⁻¹(+141 Wm⁻¹K⁻¹/−24 Wm⁻¹K⁻¹), exceeding that in bulk h-BN^14,28. Meanwhile, the plateau/peak at higher temperature when comparing with that in bulk h-BN single crystal suggests that the extrinsic scattering such as contact, defect and grain size dominance the intrinsic phonon-phonon scattering process at higher temperature. At lower temperature, the thermal conductivity decreases rapidly with its value below that of bulk h-BN when T < 200 K. This is probably due to the contact²⁹, relatively smaller grain size²⁸, or possible tiny residue⁴ but non-negligible effect on thermal conductivity.

Figure 3

Thermal conductivity of the measured bilayer h-BN.

(a) Thermal conductivity with respect to temperature. The diamonds, pentagons, squares and triangles represent thermal conductivity of single layer h-BN (theory)¹⁵, high-quality bulk h-BN (experiment)¹⁴, 11-layers suspended h-BN and 5-layers suspended h-BN (experiment)⁴, respectively. (b) Layer-dependent thermal conductivity. The left diagonal and right diagonal represent thermal conductivity of high-quality¹⁴ and low-quality²⁸ bulk h-BN (experiment), respectively.

Nevertheless, the obtained thermal conductivity is larger than that in 5-layer and 11-layer exfoliated h-BN measured by modified prepatterned microstructure method (Fig. 3a) and that in 9-layer CVD h-BN measured by Raman method, suggesting that sample prepared by dry-transfer method holds cleaner surfaces and superior sample quality when comparing to that prepared by PMMA-mediated transfer method^4,6,18.

Discussion

Thickness-dependent behavior on basal-plane thermal conductivity of 2D materials is an important topic in thermal transport properties in low dimensional materials and gained intense attractions in last decade. Both theory and experiment suggested that basal-plane thermal conductivity in clean few-layer graphene decreases with increasing layers due to the enhancement of phonon scattering between layers^30,31,32,33. On the other hand, the question on thickness-dependent basal-plane thermal conductivity in MoS₂ is still under debate^34,35, as MoS₂ has much stronger bond between different layers. Due to the geometric similarity, few-layer h-BN has been suggested to have the same thickness dependence similar to graphene¹⁶, yet not observed experimentally. Figure 3b shows the thermal conductivity with respect to layers. At T = 300 K, the observed thermal conductivity is larger than that in bulk h-BN but smaller than that in single layer h-BN by theoretical calculation, indicating a thickness-dependent thermal conductivity in few-layer h-BN.

It is importing to note that thermal conductivity of supported or encased few-layer graphene and h-BN decrease with decreased thickness with the value below that of its bulk counterpart³⁶. These two different trends with respect to thickness is understandable as the interaction between graphene (h-BN) and substrate materials can also enhance the phonon scatterings in the graphene (h-BN) layers. Interestingly, the polymer residues on graphene (h-BN) surfaces can also increase the phonon scattering, resulting in opposite trend of the thickness-dependent thermal conductivity. In Fig. 3b, the previously measured thermal conductivity in 5-layer and 11-layer h-BN with PMMA residue has lower value than that in bulk h-BN. It is worth noting that directly comparison of the results from this study and reference 4 is unfair due to the length-dependent thermal conductivity in two-dimensional materials, which has been predicted theoretically^{33,37,38,39,40} and later confirmed by experiment². However, when comparing the result of sample in this study (with length of 3 μm and width of 3.3 μm) and that of 12-layers sample in reference 4 (with length of 3 μm and width of 9 μm), the thermal conductivity in former sample is much larger than that in latter sample with polymer residues on surface, no mention about the slightly width dependent^2,40. This result provides further evidence that the sample prepared by dry-transfer method has much cleaner surfaces than that obtained by PMMA-mediated method.

In summary, we observed a thickness-dependent thermal conductivity in bilayer h-BN with the room temperature value reach as high as 484 Wm⁻¹K⁻¹(+141 Wm⁻¹K⁻¹/−24 Wm⁻¹K⁻¹), exceeding that in bulk h-BN. Our thermal conduction measurement indicates that the PMMA-free dry-transfer method preserves relatively higher sample quality with less residues on surfaces, providing a brand-new and reliable technique for transferring 2D materials onto suspended prepatterned microstructures suitable for thermal measurements.