A Two-Stage Procedure for Microwave Imaging of a Buried Dielectric along with the Randomly Rough Surface above It Tolga

A two-stage microwave imaging procedure based on the contrast source inversion (CSI) is proposed for the determination of a buried dielectric along with the rough surface above it. It was previously shown that, the CSI, is very effective for the determination of a dielectric buried under a known rough surface. However, for an unknown surface, the application of the CSI to the entire region containing both the object and the roughnesswill yield significantly inaccurate dielectric property values and, thus, determination of objects will be almost impossible especially when they are small in size or low in contrast.Thus, we propose to construct a reference model for the background without the object by preimaging the entire region in a frequency-hopping scheme and imposing the a priori known property values to the approximately determined morphology of the background. In the second stage, the CSI is performed at single frequency, assuming the constructed reference model as the background. In this case, by taking the advantage of nonlinear inversion and without a restrictive assumption about the characteristics of the rough surface, the proposed approach yields qualitatively satisfactory results even for multiple objects buried under a surface having a high frequency or large roughness.


Introduction
The use of microwaves for detection or imaging of buried objects in remote sensing applications such as geophysical exploration, mine detection, and medical imaging, has been the subject of various research studies.In practice, in most of these remote sensing applications, the object to be determined is a dielectric and the surface above it is rough.However, despite its practical importance, very few studies deal with the imaging of dielectrics buried under a rough surface and among them [1][2][3][4], assuming the surface above the object to be known.Only a couple of studies are intended to determine both the object and the rough surface above it by using the same data [5][6][7][8].On the other hand, these studies are based on some assumptions related to the rough surface and/or the buried object and thus are subject to the limits of these assumptions.More precisely [5] is based on the small perturbations theory which severely limits the size of the rough surface that can be determined.In [6,7] the rough surface is assumed to be represented as a sum of B-splines and a buried object can be imaged together with relatively lowfrequency and small or moderate roughness above it.Despite its extra computational burden, a fully nonlinear inversion algorithm such as the contrast source inversion (CSI) [9] and the distorted born iterative method (DBIM) [10], in general, sufficiently reconstructs inhomogeneous dielectric properties of scatterers which are relatively large in size and high in contrast by preserving the nonlinear characteristics of the problem.We previously proposed an approach which enables application of the CSI for the determination of a buried dielectric under a known rough surface [4].Now in this paper, we suggest the use of the CSI also for the detection of the rough surface above the object.However, in most cases, although it is one of the most successful nonlinear inversion techniques, applying the CSI alone in a single step is not sufficient for accurately reconstructing the property values of the entire region that hosts both the object and the rough background.Thus, we propose a two-stage International Journal of Antennas and Propagation procedure whose first stage is dedicated to the construction of a reference model without the object.For this purpose, the CSI is first applied in a frequency hopping scheme similar to the one given in [11] to the entire region that hosts both the rough surface and the object.The dielectric property values reconstructed in this step may be far from the actual ones, and in this case, determination of objects will be almost impossible especially when they are small in size or low in contrast.On the other hand, in the applications given in the literature, it is consistently observed that the results achieved via the CSI enable discrimination of nonzero contrasts from the zero contrasts, that is, the scatterer from the background in a feasible accuracy, even if the contrast values are not reconstructed accurately [12].Accordingly, the rough surface between two half-spaces can be approximately distinguished despite the inaccurate values of the reconstructed dielectric parameters.Then a reference model without the object is constructed by assigning the a priori known effective permittivity and conductivity values of the ground to the region below the approximately determined rough surface.In the second stage, the CSI is performed at single frequency by choosing the constructed reference model as the background.In this case, the object and the differences of the assumed rough surface from the actual profile can be determined.As a final step, the region of interest can be narrowed to the union of a region around the approximate location observed in the preceding step and a band in the neighborhood of the assumed rough surface.This improves the quality of the results by both enabling application of any constraints about the contrast of the object and minimization of the reconstruction domain.Here, we should mention that we have not been able to attain quantitatively accurate results through the proposed approach even for a narrower domain.Instead, we have obtained results that give the approximate location and geometry of the buried scatterer.
It should also be noted that the retrieval of the rough surface in the first stage of the above procedure could be achieved through some inversion strategies based on high frequency approaches (e.g., geometrical optics).On the other hand, this would probably entail differences between the data acquisition processes of the two stages such as antennas working in different bands.However, in the proposed approach, the data collected through the same configuration can be used in both stages as shown in the numerical simulations.
The organization of the paper is as follows.The statement of the imaging problem is given in Section 2. Section 3 is devoted to some numerical results while conclusions are presented in Section 4.
Throughout the paper, the  (−it) time factor is suppressed and vectors are denoted by bold letters.

Statement of the Imaging Problem
In this study, assuming that the geometry is uniform along the  3 -direction, the problem of imaging an unknown object along with the rough surface above it will be treated as a 2D problem on the  1  2 plane as shown in Figure 1.Here, two homogeneous half-spaces with constitutive parameters  1 ,  1 and  2 ,  2 are separated by a locally rough interface Γ whose coordinates are ( Γ 1 , ( Γ 1 )) with  defined as where  is a real-valued function and subset  ⊂ R is the finite interval over which the interface deviates from a flat surface.Note that  may exhibit jump discontinuities particularly in geological applications where reconstruction of a faulted surface is a common problem.In the lower halfspace, an infinitely long cylindrical object having a crosssection  with the  1  2 plane is located.The dielectric permittivity and the conductivity of the object are   (x) and   (x) respectively, where x = ( 1 ,  2 ) is the position vector in R 2 .The magnetic permeabilities of all materials are equal to the vacuum permeability  0 .Region , in which both the object and the rough surface are known to lie, is illuminated individually by a set of time-harmonic line sources located at the points z  ,  = 1, 2, . . ., , on line  and, for each illumination, the electromagnetic field that arises from the interaction of the incident field with the object and with the lower half-space is measured on line .
The two-stage imaging procedure given here can be summarized as follows.In the first stage, the rough surface is determined in a frequency-hopping scheme in which the contrast source inversion (CSI) is consecutively performed at  equally spaced frequencies in a frequency band by assuming the results of the previous inversion as the background.Then a reference model without the object is constructed by properly modifying the results achieved at the th frequency.In the second stage, the buried object is imaged, by using the constructed reference model as the background at an appropriate ( + 1)th frequency.The details of the procedure are given below.
In line with the procedure outlined in above, each source illuminates the region at angular frequencies  () ,  = 1, 2, . . ., , ( + 1).The electric field vector of each incident wave is E ()   (x; z  ) =  ()  (x; z  )e 3 where e 3 is the unit vector in the  3 -direction.Then the problem is reduced to a scalar one in terms of the field function  ()   (x) which represents the total electric field vector E (m) (x; z  ) =  (m) (x; z  )e 3 in R 2 for the illumination of the th source at the th frequency.Both the rough surface and the object are attended to be determined by using the same data, namely, the measured field  ()   (x) for x ∈ .This field can be expressed as  ()   (x) =  () , (x) +  () , (x) where  ()  , (x) is the background field due to a background model and  ()  , (x) is the scattered field due to the differences between the background model and the actual profile. ()  , (x) can be synthetically generated for any assumed background model.Then the imaging problem can be expressed as the extraction of  ()   (x) from the following system of integral equations: which are the well-known object and data equations, respectively [9].Here  ()  (x; x  ) is Green's function of the assumed background for the th frequency whose computation is briefly given in a subsection below.The function  ()   (x) is the contrast function and is defined by where  () (x) and  ()  (x) are the wave-numbers corresponding to the actual dielectric profile and the assumed background, respectively.The squares of the wave-numbers are given by with (x) and σ(−1)  (x) denote the dielectric properties in region  of the assumed background and they are extracted from χ(−1)  (x), namely, the contrast reconstructed in the previous frequency step.The contrast function  ()   (x) cannot be extracted from (2) exactly since it is an ill-posed and nonlinear problem.Instead, an estimated contrast χ()  (x) can be achieved through an iterative inversion algorithm.We here propose to use the standard CSI method which is an efficient nonlinear inversion algorithm summarized in a subsection below.
The above process is carried out for  ∈ [1, ] choosing the dielectric properties in region  of the initial background, that is, the background for  = 1, as ε0  (x) =  1 and σ0 Although this frequency-hopping scheme significantly improves the performance of the CSI, in most applications, the results achieved at the th step will not be sufficient to determine the buried object, especially in relatively large domains that host objects small in size or low in contrast.On the other hand, an approximate rough surface Γ between two half-spaces can be determined using ε()  (x) and σ()  (x) profiles despite their incorrect values.This could be achieved even by visual interpretation or by using some edge detection approaches.In the final step of the first stage, a reference model with dielectric properties  ,ref (x) and  ,ref (x) is constructed by assigning the a priori known effective permittivity and conductivity values of the upper and lower half-spaces, that is  1 ,  1 and  2 ,  2 , to the regions above and below the approximately determined rough surface, respectively.
In the second stage, the buried object is imaged by using the constructed reference model as the background at an appropriate ( + 1)th frequency which may but does not have to be in the frequency range of the first stage.More precisely, χ(+1) As an additional step, the reconstruction domain can be narrowed to D =  1 ∪  2 where  1 is a region around the approximate location of the object which may be determined through the interpretation of the results of the preceding step and  2 is a band in the neighborhood of the approximate rough surface Γ. Thiswill improve the quality of the results by both enabling application of some constraints such as positivity of the contrast associated with the object separately and minimization of the reconstruction domain.
Note that the change of the dielectric property values of the materials with the frequencies used throughout the given procedure is assumed to be negligible.The flowchart of the overall imaging strategy is given in Figure 2.
The integral operators  ()  and  ()  in symbolically given ( 6) and ( 7) are In the standard CSI, the contrast sources and the contrast function that minimize a cost functional are sought iteratively in an alternating manner without applying an extra regularization.This cost functional consists of two terms: sums of the residual norms in both object equation (6) and data equation (7) for each illumination.The explicit expression of the cost functional is where ‖ ⋅ ‖ 2  and ‖ ⋅ ‖ 2  denote the norms on  2 () and  2 (), respectively.We refer the reader to [9] for the details of the iterative process.

Green's Function of the Assumed Background.
Green's function of the assumed background,  ()  (x; x  ), can be obtained by separating it into two components as Here,  () 12 (x; x  ) is Green's function of the two-layered media with a planar interface.This function, in general, is expressed in terms of infinite integrals and a method based on the two-level Discrete Complex Images Method [13] is given in [4] for the efficient calculation of it.Then  ()  0 (x; x  ) can be considered as the scattered field due to the differences between the assumed background and the planarly layered media for a line source of unit strength located at point x  and satisfies the following integral equation: where the integral operator  () is defined by International Journal of Antennas and Propagation In (12),  () 12 (x) is the wave-number of the two-layered media with a planar interface and its square is given by Equation ( 11) can be solved for  () 0 (x; x  ) by applying the forward solution procedure given in [14].

Numerical Simulations
The proposed approach has been tested through several numerical simulations by using a regular PC with a CPU at 2.00 GHz and 4 GB RAM.In each simulation, considering the size of the roughness and the object, the penetration depth, and the computational size of the problem, the operating frequencies are chosen as  () = 50 + ( − 1) × 25,  = 1, 2, . . ., 9 MHz, in the first stage and, unless otherwise stated, the second stage is performed at  = 150 MHz.Note that the number of frequencies in the first stage has been empirically determined as 9, since it has been observed that increasing the number of frequencies does not significantly improve the results for the given examples.The sizes in the simulations are also given in terms of free space wavelength  at 150 MHz.Ten equally spaced line sources located on the line  2 = 1 m are used to illuminate the entire region and, for each illumination, the total field data are synthetically generated on the line  2 = 0.9 m at 40 equidistant points by solving the associated direct scattering problem via the finite element method (FEM).The total field is corrupted with 1% random noise by adding a random term |  | 2  , where  is the noise level and   is a uniformly distributed random variable between 0 and 1.The corresponding SNR is −20 log 10  = 40 dB.
In all simulations, the same reconstruction domain , whose dimensions are 6 m × 2 m, (3 × ), is discretized into 4800 cells of size 5 cm × 5 cm (0.005 × 0.005).At each frequency, the CSI, which is an iterative process with an error reducing nature, is stopped when the convergence criterion is satisfied; namely, the difference between the cost functionals of two consecutive iterations is smaller than 10 −7 .The maximum number of iterations is chosen as 1000 and the process is terminated when it is reached without satisfying the convergence criterion.The corresponding computational time for the entire procedure including the calculation of Green's functions and the iterative process is about 9 min at each frequency.
In the first simulation, as seen in Figure 3, two identical circular objects with radius 0.12 m (0.06) are buried under a rough surface, which is plotted in white.Here, the lower halfspace is composed of a low-loss material that may represent dry soil with relative permittivity  ,2 = 3.6 and conductivity  2 = 10 −5 S/m.Both objects, with depths of 1 m (0.5) and 0.76 m (0.38) below the surface  2 = 0, have relative permittivity of  , = 5 and conductivity of   = 0.05 which constitute a low contrast between the objects and the background.First of all, it is worth showing that applying the CSI alone is not sufficient for accurately reconstructing the property values of the entire region including both the objects and the rough background in a single step.As seen in Figure 1, the region outside domain  consists of two halfspaces with a planar interface.Thus, the natural choice of the background for the inversion procedure is the two-layered media with a planar interface.We have performed the CSI in different frequencies from 50 MHz to 200 MHz and could not be able to obtain any satisfactory results even for the rough surface.The reconstructed relative permittivity and conductivity distributions in the reconstruction domain  at 150 MHz are given in Figures 4(a) and 4(b), respectively.
When we apply the proposed procedure to the same configuration, the unmodified results given in Figures 5(a) and 5(b) are achieved at the end of the frequency-hopping scheme.Note that the boundary of the lower half-space, that is, the unknown rough surface, can be approximately determined while the objects are entirely undetectable.Although visually apparent boundary between two half-spaces can be properly distinguished by some edge detection algorithms, in the examples given here we empirically determined the approximate rough surface Γ by considering the regions whose relative permittivity values are lower than 1.5 to be free space and the others to be the ground.Then the piecewise-homogeneous reference model constructed using Γ, which is plotted in red in the figures, is taken as the background for the second stage.The results obtained at 150 MHz are given in Figures 5(c) and 5(d).Here the objects are barely detectable in the permittivity profile while they can be successfully distinguished in the conductivity profile although the values are underestimated.According to these results, the reconstruction domain has been narrowed to the union of two subregions whose boundaries are shown in  the dashed lines in Figures 5(e) and 5(f).These subregions consist of a rectangle with dimension of 1 × 2 m (0.5 × ) and a band whose width is about 0.55 m (0.28).Then the CSI has been performed by applying the positivity constraint for the part around the object.In this case, two close objects can be distinguished with higher property values in both permittivity and conductivity profiles.This improvement is considered to be due to the reduction of the size of the domain and the application of the positivity constraint for the object.
In order to test the effect of the size of the roughness, a larger rough surface is considered, and three circular objects with radius 0.12 m (0.06) are buried under it as shown in Figures 6(a) and 6(b).The dielectric property values of the objects are chosen as  , = 5 and   = 0.05 S/m for the one with depth of 1 m (0.5),  , = 6 and   = 0.06 S/m for the one with depth of 0.8 m (0.4), and  , = 7 and   = 0.07 S/m for the one with depth of 0.6 m (0.3).Similar to the previous example, the objects are undetectable while Although the buried objects are not apparent either in the permittivity or in the conductivity profiles, relatively high values that are concentrated around some specific points are observed on and under the approximate rough surface.Thus, the final inversion is repeated for a narrower domain which is the union of a rectangular region with dimension of 1.1×2.6 m (0.55×1.3) and a band whose width is averagely about 0.5-0.6 m (0.25-0.30).As seen from Figures 7(e) and 7(f), the quality of the results is significantly improved in this case, and three close objects are distinguished in both the permittivity and conductivity profiles although they are not accurately reconstructed.Note that, in the relative permittivity profile, the estimation errors of the approximate rough surface have been compensated in some degree.
A surface with a relatively high frequency roughness is considered in the third example as seen in Figure 8. Two identical circular objects having radius 0.12 m (0.06) are located in depth of 1 m (0.5) and 0.8 m (0.4).Note that, there are noticeable differences throughout the boundary, between the approximate and the actual surfaces given in Figures 9(a) and 9(b).Nevertheless, two objects, whose exact dielectric property values are  , = 6 and   = 0.06 S/m, can be determined in the results obtained in the entire region.For the narrower domain, although increased dielectric property values are achieved, the visual impact is slightly weakened especially in the conductivity profile.The reason of this weakening is the existence of some surface errors that lead to positive contrasts.When the domain is narrowed, to a region composed of a rectangle with dimension of 0.8 × 2.0 m (0.4 × ) and a band whose width changes between 0.4 m (0.2) and 1 m (0.5), the reconstructed values of these contrasts are also enhanced.On the other hand, if they are estimated to be slightly below their actual locations, incorrectly high values of dielectric properties on the lower neighborhood of the boundary will be observed.
In the final example, the lower half-space is considered to be composed of a more lossy material that may represent wet soil with constitutive parameters  ,2 = 10 and  2 = 10 −3 S/m and a thin bar with dimension of 0.1 × 1.2 m (/60 × /5) is buried into it as shown in Figure 10.This bar whose lower edge is in depth of 1 m (/6) has relative permittivity of  , = 25 and conductivity of   = 0.5.The above procedure is repeated but, in the second stage, the frequency is chosen as 50 MHz since penetration of the wave is not sufficient for the detection of the buried object at 150 MHz.Thus,  is assumed to be 6 m for this example.Satisfactory results given in Figure 11 are achieved for both the domain  and the narrower domain consisting of a rectangular region with dimension of 0.8 × 3.0 m (2/15 × /2) and a band with changing thickness between 0.4 m (/15) and 1 m (/6).Note that the estimation errors of the rough surface are successfully compensated especially when the reconstruction domain is narrowed.

Conclusions
We propose a two-stage procedure based on the contrast source inversion (CSI) for the determination of a buried dielectric together with the locally rough surface above it.Despite its extra computational burden, by taking the advantage of nonlinear inversion, the proposed approach yields qualitatively satisfactory results even for multiple objects buried under a surface having a high frequency or large roughness.
Here, we have considered a relatively simple background that consists of two homogeneous half-spaces with known dielectric properties.As a future work, the implementation of the idea of constructing a reference model by preimaging

Figure 1 :
Figure 1: Geometry of the problem.

ForFigure 2 :
Figure 2: The flowchart of the two-stage imaging procedure.

Figure 3 :
Figure 3: (a) The exact relative permittivity and (b) conductivity profiles of two circular objects and the background.

Figure 4 :
Figure 4: (a) Reconstructed permittivity and (b) conductivity profiles for the direct application of the CSI on a planarly layered background at 150 MHz.

Figure 5 :
Figure 5: (a) Reconstructed permittivity and (b) conductivity profiles and the determination of the rough surface after the first stage.Final results of permittivity and conductivity profiles ((c)-(d)) for the entire domain and ((e)-(f)) for the narrowed domain.

Figure 6 :Figure 7 :
Figure 6: (a) The exact relative permittivity and (b) conductivity profiles of three circular objects and the background having a large roughness.

Figure 8 :Figure 9 :
Figure 8: (a) The exact relative permittivity and (b) conductivity profiles of two circular objects and the background having a high frequency roughness.

Figure 10 :Figure 11 :
Figure 10: (a) The exact relative permittivity and (b) conductivity profiles of a thin bar and the lossy background.