Abstract
An invisibility cloak that can hide an arbitrary object external to the cloak itself has not been devised before. In this Letter, we introduce a novel way to design a remote cloaking device that makes any object located at a certain distance invisible. This is accomplished using multi-folded transformation optics to remotely generate a hidden region around the object that no field can penetrate and that does not disturb the far-field scattering electromagnetic field. As a result, any object in the hidden region can stay in position or move freely within that region and remain invisible. Our idea is further extended in order to design a remote illusion optics that can transform any arbitrary object into another one. Unlike other cloaking methods, this method would require no knowledge of the details of the object itself. The proposed multi-folded transformation optics will be crucial in the design of remote devices in a variety of contexts.
Similar content being viewed by others
Introduction
The ingenious theory of transformation optics proposed by Pendry et al.1 gives the ability to control electromagnetic waves. Due to this extraordinary feature, transformation optics has many applications, such as cloaking devices2, 3, 4, 5, 6, superlenses7, 8, 9 antennas10 etc. Among them, the most attractive is a cloaking device that can direct light to propagate smoothly around an object, making it disappear for the viewers1, 2, 3, 4, 5, 6. Since the transformation-based cloak was firstly proposed, extensive theoretical and experimental works have been developed to demonstrate the functionality of this interesting device11, 12, 13, 14, 15, 16, 17, 18, 19, 20. An important feature of this invisibility cloak is that the object should be enclosed by the cloaking shell, such that no incident wave can penetrate into the hidden region.
In order to hide an object at a distance, Lai et al.21 proposed the ‘anti-object’ concept22, a complementary ‘image’ object that cancels the scattering field generated by a pre-specified object. Based on this method, a scheme for illusion optics23 was further introduced to generate the illusion of transforming one object into another one. A key feature of a remote cloak is that it does not require the cloak shell to enclose the object. However, unlike the original cloak that can hide any arbitrary object1, Lai’s remote devices are designed for a particular object with known shape, size, and position. Therefore, the cloak can operate only for a specific object, and a little change in its position can destroy the exact restoration and cancellation of the optical path of the incident wave. Another approach to remote cloaking was investigated to design active exterior cloaks24 that require advance knowledge of the phase information and of the incoming probing wave. In (Ref. 25, 26), Milton and Nicorovici et al proposed an external cloak that can hide a countable set of dipoles with the help of a cylindrical superlens. However, that cloak can only work in the quasistatic limit for polarizable lines. In short, a remote cloaking device that can hide any arbitrary object is still elusive.
In this Letter, we propose the design for a remote cloaking device that requires no knowledge of the hidden object’s shape and material. Our designing technique is based on multi-folded transformation optics27 to remotely produce a hidden region into which the incoming electromagnetic waves cannot penetrate, and that does not alter the far-field scattering field. Therefore, the device can still rendered invisible even with the existence of such hidden region. Most importantly, the proposed device is not based on the ‘anti-object’ concept and the hidden object is not restricted to move within a certain range of the hidden region to avoid affecting the outer boundary field pattern. Our new designed device has no physical attachment with the hidden object so any object inside the hidden range can move freely. We further extend this idea to design an object-independent remote illusion optics that remotely creates the illusion of any object in this hidden region looking like another object. Full-wave finite element simulations validate the expected behavior of our proposed device.
Figure 1a shows the schematics of a conventional cloak1 that conceals an object inside the cloak region without altering the incoming field. This is achieved using a coordinate transformation to create a hole in the center such that no fields can penetrate inside the cloak but the outside field remains unaltered. Therefore, any object inside the cloak is invisible to the outside observers. A conventional remote cloaking21, instead, cloaks a pre-specified object outside of the cloaking shell by using the ‘anti-object’ concept. The idea is illustrated in Figure 1b, where an object with constitutive parameters ɛ(r) and μ(r) is placed in free space (on the right), and a complementary image object with negative constitutive parameters is embedded in the complementary media (on the left). As a consequence, the object and the complementary media with anti-object cancel the scattering field generated by the object and the object becomes undetectable.
Materials and methods
Unlike the methods mentioned above, in this paper we aim to create a hidden region at a distance, so that any object moving inside this hidden region can be invisible, as shown in Figure 2a. Therefore, this remote cloaking device is object-independent. Here, as an example, the remote cloaking device is made of two elements that create a hidden region, but the same method can be extended to an arbitrary number of elements. Figure 2b depicts the effect of this object-independent remote cloaking device in free space. The figure shows the equivalent virtual space created by the device and how the wave can propagate through the cloak without any perturbations. Figure 2c illustrates the schematic diagram of our proposed remote cloaking device with two transformation steps. In the first step, a square shaped space filled with air placed in the virtual space (x,y,z) is transformed into a conventional cloak (light blue segments). In the next step, the cloak is divided into four segments (delimited by dashed lines and denoted A, B, C and D); the second transformation function on each segment is used to compress the whole segment as A′, B′, C′ and D′, respectively, so that the cloak is open and does not require enclosing the hidden object. As shown in Figure 2c, each segment is further divided into four regions. For example, segment A’ contains the region I (green), represented by (x1,y1,z1), region II (dark blue), denoted by (x2,y2,z2), region III (orange), denoted by (x3,y3,z3), and region IV (purple) denoted by (x4,y4,z4). A zoomed-in view of the proposed system, clarifying the design methodology, is presented at the most right side of Figure 2c. Consequently, we compress the complete black dashed lined area into the region I and region II. It should be noticed that the material parameters of region II are obtained from the conventional square cloak. Thereafter, a folded transformation is used to compensate the discontinuity due to the compressing coordinate transformation. In this case, the regions III and IV are obtained with different parameters at different folding ranges. The materials in these two regions are complementary materials that have been used to compensate some space in the lens design7. xn, yn and zn indicate the coordinate system of each region, where n=1, 2, 3 and 4.
For the first step shown in Figure 2c, the constitutive parameters of the conventional cloak are obtained from (Ref. 6), the resulting permittivity and permeability tensors for the segment A of the conventional square cloak can be expressed as:
with
The half of the side lengths of the inner and outer square are s1 and s2 respectively (see Figure 2c).
In the next step, we apply the second transformation as shown in Figure 2c. It should be noted that although here we use a square shaped cloak as an example, the method can be applied to cloaks of any shapes19, 20. We take the segment A′ as an example (the other three segments B′, C′ and D′ can be analyzed in a similar way due to the symmetry of the cloak), the transformation equations of the regions I and II in the Cartesian coordinates are given
where κ=tan β/tan α. The constitutive parameters for the regions I and II are obtained from the Jacobian transformation matrix as follows:
Moreover, the folded transformations are applied to the regions III and IV. Taking the orange area in the first quadrant as an example in region III, leads to the transformation equation:
where τ=tan γ=( tan α +tan β)/2 and P is the intersection point of all the regions at the horizontal-axis. The material parameters of the complementary material for this region are:
Similarly, taking the purple area in the second quadrant as an example in region IV, gives the transformation equation and the constitutive parameters:
where τ1=tan γ1=(tan α1 +tan β1)/2 and P1 is the coordinate value along the x-axis. The other parts of these complementary regions transform in a similar way, that for brevity we do not write in this Letter. In addition, due to the symmetry of the cloak, the permittivity and permeability tensors of the other domains i.e. B′, C′ and D′ can be obtained by rotating all of the corresponding tensors shown above by π/2, π, and 3π/2, respectively.
In short, we apply a second step transformation to the conventional enclosed cloak design. By compressing the different segments, the hidden region is open to the outer space and the cloaking device can work remotely. Folded transformations are also applied to satisfy the boundary continuity. A detailed general transformation function is described in the Supplementary Material.
Results and discussion
The following section summarizes the full wave simulations of the proposed remote cloaking device by adopting the scattered transverse electric (TE) mode with a frequency of 3 GHz and by using the 2D finite element simulator (COMSOL). For the closed square cloak, the simulation uses the following parameters: s1=0.075 m and s2=0.1 m, the compression ratio κ=0.8 with α=45°, γ=42° and β=38.66° for the regions I and II. Additionally, τ=0.9 with the same α, γ and β in the region III and τ1=2.7 with α1=71.57°, γ1=69.68° and β1=67.38° for a different folding range of region IV.
The material parameters for each region in segment A′ are shown in Figure 3. It should be noted that all the parameters are transformed into the diagonal form. For region I, all the parameters are homogeneous, positive and anisotropic, as shown in Figure 3a. For regions III and IV, as a consequence of the folding transformation, all the parameters are negative and highly anisotropic, as shown in Figures 3b and 3c. For region II, since it is obtained from applying the second transformation to the conventional square cloak, all the parameters are inhomogeneous and highly anisotropic. Figure 3d shows the distribution of the parameters in region II. For ɛv or μv, an inset shows a color bar range of the distribution with x from 0.075 to 0.078 m. The white dotted line represents the position of the x-axis in region II and a plot of the parameters along this line is also shown in Figure 3d.
In Figure 4, we consider the electric field components of the wave for objects of different shape and compare the field behaviors for each with and without the remote cloaking device. In Figure 4a, a perfect electric conductor (PEC) circle with a radius of 0.03 m is placed in the air and is subjected to a plane wave. In this case, the field is scattered. In Figure 4b, the remote cloaking device is used to cloak the PEC circle. It can be seen that the scattering field caused by the PEC circle (visible in Figure 4a) is well minimized by the open cloaking device and the PEC circle becomes invisible. It should be noted that, although the remote cloaking device is open, the center field region it creates is a hidden region that no wave can penetrate, and therefore, any change of the objects does not affect the performance of the cloak. In order to verify this, we changed the hidden object to be a PEC square, and a dielectric star shaped object with ɛ0=5 and μ0=1, respectively. The results shown in Figures 4c–4f illustrate that the scattering caused by these different objects can be well minimized by the same remote object-independent cloak. Figures 4g–4i show the calculated far field differential RCS via different azimuthal angles for all the three cases. The blue lines represent the RCS with the bare object, while the red lines represent the RCS with the cloak. The results show that for different objects, the scattering is much larger without the cloaking device than with the cloaks, especially for the forward scattering. Moreover, for different objects with the external cloaking device, the RCS are the same, which is a proof of the object independence of our cloaking device.
The required parameters for regions III and IV have double negative values for both the permittivity and permeability as described by Equation (7) and Equation (9). This will lead to loss and dispersions. In the following, we show how the material dispersion will influence the cloaking effect. For the ease of discussion, we use a Drude model for permittivity and a Lorentz model for permeability:
where Γe and Γh are damping constants for the electric and magnetic field, respectively, while F is the filling ratio. From previous works28, it can be seen that Γh/ω0 can reach values as low as 10−3. In low frequencies, the damping constant can be further reduced29. Accordingly, in our simulation we choose Γe=Γh=1e7 Hz and F=0.5, at the working frequency of 3 GHz. Different ωp and ωo are also chosen separately to satisfy the required negative values in the working frequency. The reduction of the total RCSs by this cloaking device compared with the bare object via different frequencies is shown in Figure 5. It is evident that the dispersion will affect the cloaking performance very much and that the cloak can only work in a small frequency band.
To further show how the loss will influence the cloaking effect, we make simulations with some loss in the ideal parameters. The frequency is set to be 3 GHz and we use ɛ=ɛr(1 + iδ) and μ=μr(1 + iδ) for the region III and IV, where ɛr and μr are the ideal parameters from Equation (7) and Equation (9). δ is the loss tangent for the negative values in region III and IV. For the dispersion model mentioned above, the magnitude of the loss tangent is δ=0.001. Since the first double negative metamaterial has been experimentally realized30, many successive studies have been done to minimize the loss28, 31. The loss of the metamaterials can be further reduced by adding some gain elements32, 33. In the simulation, we set the loss tangent to be 0.0001, 0.001, 0.01 and 0.1, respectively. The total field distributions with different loss tangents are shown in Figure 6. The calculated far field differential RCSs via different azimuthal angles with different losses compared to those of the bare object are also provided in each figure. One can see that a big loss will destroy the cloaking effect, leading to a forward scattering even higher than that of the bare object, but the performance is still acceptable when the loss is relatively small.
To realize such an external cloaking device will be a big challenge due to its complicated parameters, especially for regions III and IV that have negative and highly anisotropic values for both permittivity and permeability. Here we propose a possible metamaterial structure that could be used to mimick the parameters of the cloaking device. We take the transverse magnetic polarization as an example. The related constitutive parameters in the simulation are ɛ1u=1.25, ɛ1v=0.8, μ1w=1.25, ɛ3u=−0.1983, ɛ3v=−5.0417, μ3w=−1 and ɛ4u=−0.0321, ɛ4v=−31.1279, μ4w=−1 for region I, III and IV, respectively. Region II is inhomogeneous; choosing the position at x=0.08 m and y=0 m as an example we get ɛ2u=0.07813, ɛ2v=12.8, μ2w=1.25. The structure is shown in Figure 7a, which is composed of split-ring resonators (SRRs) and metal rods together. With the dimensions and parameters described in the Figure caption, we can get the parameters shown in Figures 7b–7e. The retrieved results match well with the required parameters at the frequency of 3 GHz. This therefore demonstrates the possibility of realization of our cloaking device.
This multi-folded transformation optics method can be similarly extended to design remote illusion optics. The real space of object-independent illusion optics is illustrated in Figure 8a. In this scenario, the remote device, embedded with the compressed object selected for the illusion, is used to create the hidden region. Figure 8b demonstrates the illusion effect created by the illusion device. In general, any object (here a flower is shown as an example) inside the hidden region will turn into another object, e.g., a stick. The schematic diagram of the proposed illusion optics is shown in Figure 8c. This device is based on the remote cloaking device discussed earlier, with the addition of an illusionary object embedded inside the remote cloaking device. Here, as an example, we used a dielectric stick as embedded object. The stick is first transformed and adjusted into the segment B of the conventional cloak, and further compressed in the second transformation step with the same equation as regions I and II for segment B′ of the proposed remote cloaking device.
Figure 9a–9f is the simulation result that demonstrates the functionality of the remote illusion device in transforming one image into another. In Figure 9a, a dielectric flower with ɛf=3 and μf=1 is placed at the center, with a plane wave incident from left to right. Figure 9b shows the scattering pattern of the flower with the remote illusion device placed beside it, while Figure 9c shows the scattering pattern of a dielectric stick of 0.02 m with ɛs=5 and μs=1. Comparing the field patterns of Figure 9a–9c, it is evident that the remote illusion device makes the flower behave like if there were a stick. Furthermore, the device is omnidirectional. For example, Figure 9d–9f shows the simulated results when the propagation direction of the incident plane wave is rotated by π/4. The material parameters and functionality in Figure 9d–9f are the same as in Figure 9a–9c, respectively. One can see that the scattering pattern of Figure 9e is identical to Figure 9f, which is a proof that the proposed remote illusion device is without any limitation of incident wave’s direction. It is important to realize that, since the center region we created is a hidden region, the object to be transformed is not limited to be made of dielectric materials. This shows that the remote illusion device can be applied to any arbitrary object.
Conclusions
We proposed a new recipe to remotely conceal any arbitrary object by applying multi-folded transformation optics. This remote device can hide any object from a certain distance and it can be used to remotely change the field pattern of one object into that of another one. The hidden object can move freely inside the hidden region created by the proposed device, and it can change shape, without requiring the cloak to create different anti-objects for each different structure. Due to the material dispersed, the device we proposed is still limited to a small frequency band. Still, the multi-folded transformation method will be very helpful to design many other remote devices such as remote waveguides, remote antennas, sensors etc., that will be very useful in future microwave and optical applications.
References
Pendry JB, Schurig D, Smith DR . Controlling electromagnetic fields. Science 2006; 312: 1780–1782.
Cai WS, Chettiar UK, Kildishev AV, Shalaev VM . Optical cloaking with metamaterials. Nat Photonics 2007; 1: 224–227.
Li JS, Pendry JB . Hiding under the carpet: a new strategy for cloaking. Phys Rev Lett 2008; 101: 203901.
Leonhardt U, Tyc T . Broadband invisibility by non-euclidean cloaking. Science 2009; 323: 110–112.
Alù A, Engheta N . Multifrequency optical invisibility cloak with layered plasmonic shells. Phys Rev Lett 2008; 100: 113901.
Rahm M, Schurig D, Roberts DA, Cummer SA, Smith DR et al. Design of electromagnetic cloaks and concentrators using form-invariant coordinate transformation of the Maxwell’s equations. Photon Nanostr Fundam Appl 2008; 6: 87–95.
Pendry JB, Ramakrishna SA . Near-field lenses in two dimensions. J Phys: Condens Matter 2002; 14: 8463–8479.
Kildishev AV, Narimanov EE . Impedance-matched hyperlens. Opt Lett 2007; 32: 3432–3434.
Yan M, Yan W, Qiu M . Cylindrical superlens by a coordinate transformation. Phys Rev B 2008; 78: 125113.
Luo Y, Zhang JJ, Chen HS, Huangfu JT, Ran LX . High-directivity antenna with small antenna aperture. Appl Phys Lett 2009; 95: 193506.
Schurig D, Mock JJ, Justice BJ, Cummer SA, Pendry JB et al. Metamaterial electromagnetic cloak at microwave frequencies. Science 2006; 314: 977–980.
Leonhardt U . Optical conformal mapping. Science 2006; 312: 1777–1780.
Chen HS, Zheng B, Shen L, Wang HP, Zhang XM et al. Ray-optics cloaking devices for large objects in incoherent natural light. Nat Commun 2013; 4: 2652.
Leonhardt U . Optical metamaterials: invisibility cup. Nat Photonics 2007; 1: 207–208.
Yan W, Yan M, Ruan ZC, Qiu M . Coordinate transformations make perfect invisibility cloaks with arbitrary shape. New J Phys 2008; 10: 043040.
Ruan ZC, Yan M, Neff CW, Qiu M . Ideal cylindrical cloak: Perfect but sensitive to tiny perturbations. Phys Rev Lett 2007; 99: 113903.
Xi S, Chen HS, Wu BL, Kong JA . One-directional perfect cloak created with homogeneous material. IEEE Microw Wirel Compon Lett 2009; 19: 131–133.
Li W, Guan JG, Sun ZG, Wang W, Zhang QJ . A near-perfect invisibility cloak constructed with homogeneous materials. Opt Express 2009; 17: 23410–23416.
Diatta A, Guenneau S . Non-singular cloaks allow mimesis. J Opt 2011; 13: 024012.
Chen HS, Zheng B . Broadband polygonal invisibility cloak for visible light. Sci Rep 2012; 2: 255.
Lai Y, Chen HY, Zhang ZQ, Chan CT . Complementary media invisibility cloak that cloaks objects at a distance outside the cloaking shell. Phys Rev Lett 2009; 102: 093901.
Chen HY, Chan CT . ‘Cloaking at a distance’ from folded geometries in bipolar coordinates. Opt Lett 2009; 34: 2649–2651.
Lai Y, Ng J, Chen HY, Han DZ, Xiao JJ et al. Illusion optics: the optical transformation of an object into another object. Phys Rev Lett 2009; 102: 253902.
Zheng HH, Xiao JJ, Lai Y, Chan CT . Exterior optical cloaking and illusions by using active sources: A boundary element perspective. Phys Rev B 2010; 81: 195116.
Milton GW, Nicorovici NAP . On the cloaking effects associated with anomalous localized resonance. Proc R Soc A 2006; 462: 3027–3059.
Nicorovici NAP, Milton GW, McPhedran RC, Botten LC . Quasistatic cloaking of two-dimensional polarizable discrete systems by anomalous resonance. Opt Express 2007; 15: 6314–6323.
Han TC, Qiu CW, Tang XH . An arbitrarily shaped cloak with nonsingular and homogeneous parameters designed using a twofold transformation. J Opt 2010; 12: 095103.
Rudolph SM, Pfeiffer C, Grbic A . Design and free-space measurements of broadband, low-loss negative-permeability and negative-index media. IEEE T Antenn Propag 2011; 59: 2989–2997.
Pendry JB, O’Brien S . Very-low-frequency magnetic plasma. J Phys: Condens Matter 2002; 14: 7409–7416.
Smith DR, Padilla WJ, Vier DC, Nemat-Nasser SC, Schultz S . Composite medium with simultaneously negative permeability and permittivity. Phys Rev Lett 2000; 84: 4184–4187.
Lapine M, Shadrivov IV, Kivshar Y . Wide-band negative permeability of nonlinear metamaterials. Sci Rep 2012; 2: 412.
Wuestner S, Pusch A, Tsakmakidis KL, Hamm JM, Hess O . Overcoming losses with gain in a negative refractive index metamaterial. Phys Rev Lett 2010; 105: 127401.
Ye DX, Chang KH, Ran LX, Xin H . Microwave gain medium with negative refractive index. Nat Commun 2014; 5: 5841.
Acknowledgements
The authors thank P. Rebusco for critical reading and editing of the manuscript. This work was sponsored by the National Natural Science Foundation of China under Grants No. 61625502, No. 61322501, No. 61574127, No. 61575174, No. 61601408, No. 61550110245 and No. 61275183, the Top-Notch Young Talents Program of China, the Program for New Century Excellent Talents (NCET-12-0489) in University, the Fundamental Research Funds for the Central Universities and the Innovation Joint Research Center for Cyber-Physical-Society System. B. Zheng acknowledges the support of the Postdoctoral Science Foundation of China under Grant No. 2015M581930.
Author information
Authors and Affiliations
Corresponding authors
Additional information
Note: Supplementary Information for this article can be found on the Light: Science & Applications’ website .
Supplementary information
Rights and permissions
This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike 4.0 International License. The images or other third party material in this article are included in the article’s Creative Commons license, unless indicated otherwise in the credit line; if the material is not included under the Creative Commons license, users will need to obtain permission from the license holder to reproduce the material. To view a copy of this license, visit http://creativecommons.org/licenses/by-nc-sa/4.0/
About this article
Cite this article
Zheng, B., Madni, H., Hao, R. et al. Concealing arbitrary objects remotely with multi-folded transformation optics. Light Sci Appl 5, e16177 (2016). https://doi.org/10.1038/lsa.2016.177
Received:
Revised:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1038/lsa.2016.177
Keywords
This article is cited by
-
Shrinking-shifting and amplifying-shifting device using transformation optics
Optical and Quantum Electronics (2022)
-
Non-closed acoustic cloaking devices enabled by sequential-step linear coordinate transformations
Scientific Reports (2021)
-
High gain, wide-angle QCTO-enabled modified Luneburg lens antenna with broadband anti-reflective layer
Scientific Reports (2020)
-
Electromagnetic time-harmonic and static field polygonal rotator with homogeneous materials
Scientific Reports (2019)
-
Direct current remote cloak for arbitrary objects
Light: Science & Applications (2019)