Fast and accurate computation of two-dimensional non-separable quadratic-phase integrals

Abstract: We report a fast and accurate algorithm for numerical computation of two-dimensional non-separable linear canonical transforms (2D-NS-LCTs). Also known as quadratic-phase integrals, this class of integral transforms represents a broad class of optical systems including Fresnel propagation in free space, propagation in gradedindex media, passage through thin lenses, and arbitrary concatenations of any number of these, including anamorphic/astigmatic/non-orthogonal cases. The general two-dimensional non-separabl… Show more

“…The 2D-NS-LCT can represent a wide variety of non-orthogonal, non-axially symmetric and anamorphic systems [21][22][23][24][25][26][27][28][29][30][31][32][33][34][35][36][37][38][39][40] . Among its special cases are the FT, FRT, and FST, gyrator transform, chirp transform, homogeous coordinate/affine transform (including e.g.…”

“…rotation transform, and shearing (interferometer) transform). The continuous 2D-NS-LCT of a signal is defined as 22 , ,…”

“…The number of independent parameters in the matrix M is ten 22 . One of the most important properties of the continuous 2D-NS-LCT is the unitary property, i.e., they are always invertible as follows 40 , .…”

“…It however is widely accepted that the security of any encryption system depends on the keys used and therefore the larger the key-space the more the security will be 5 . In addition to these approaches, in this paper, for the first time, a novel 2D-NS-LCT [21][22][23][24][25][26][27][28][29][30][31][32][33][34][35][36][37][38][39] based optical DRPE system is proposed. This proposed system offers encrypting information in multiple (10) degrees of freedom (see Table 1).…”

2D non-separable linear canonical transform (2D-NS-LCT) based cryptography

“…The 2D-NS-LCT can represent a wide variety of non-orthogonal, non-axially symmetric and anamorphic systems [21][22][23][24][25][26][27][28][29][30][31][32][33][34][35][36][37][38][39][40] . Among its special cases are the FT, FRT, and FST, gyrator transform, chirp transform, homogeous coordinate/affine transform (including e.g.…”

“…rotation transform, and shearing (interferometer) transform). The continuous 2D-NS-LCT of a signal is defined as 22 , ,…”

“…The number of independent parameters in the matrix M is ten 22 . One of the most important properties of the continuous 2D-NS-LCT is the unitary property, i.e., they are always invertible as follows 40 , .…”

“…It however is widely accepted that the security of any encryption system depends on the keys used and therefore the larger the key-space the more the security will be 5 . In addition to these approaches, in this paper, for the first time, a novel 2D-NS-LCT [21][22][23][24][25][26][27][28][29][30][31][32][33][34][35][36][37][38][39] based optical DRPE system is proposed. This proposed system offers encrypting information in multiple (10) degrees of freedom (see Table 1).…”

2D non-separable linear canonical transform (2D-NS-LCT) based cryptography

“…The continuous two dimensional non-separable linear canonical transform (2D-NS-LCT) of an input signal can be given by [1,2], where M is the transformation matrix of the LCT system, where are 2 2 sub-matrices, e.g. .…”

Constraints to solve parallelogram grid problems in 2D non separable linear canonical transform

Fast Algorithms for Digital Computation of Linear Canonical Transforms