Quadrantal symmetry associated with two-dimensional digital transfer functions
From MaRDI portal
Publication:4159269
DOI10.1109/TCS.1978.1084486zbMath0378.93042MaRDI QIDQ4159269
M. N. S. Swamy, P. Karivaratharajan
Publication date: 1978
Published in: IEEE Transactions on Circuits and Systems (Search for Journal in Brave)
Related Items (9)
Approximation of multivariable functions by M-D transfer functions with separable denominator ⋮ An efficient algorithm for the design of circular symmetric linear phase recursive digital filters with separable denominator transfer function ⋮ Unified theory of symmetry for two-dimensional complex polynomials using delta discrete-time operator ⋮ Maximally flat rational approximants in multidimensional filter design ⋮ Approximation of 2-D analog and digital transfer functions using doubly terminated cascade-separable network properties ⋮ Symmetry relations in multidimensional Fourier transform pairs ⋮ Design of two-dimensional digital filters on the basis of quadrantal and octagonal symmetry ⋮ Symmetrical decomposition and transformation ⋮ Design of two-dimensional half-plane recursive digital filters with octagonal symmetry
This page was built for publication: Quadrantal symmetry associated with two-dimensional digital transfer functions
