Title :
Asymptotic stability of linear shift-invariant two-dimensional digital filters
Author :
Kamen, Edward W.
fDate :
12/1/1980 12:00:00 AM
Abstract :
A theory of asymptotic stability is developed for a large class of linear shift-invariant half-plane 2-D digital filters. The theory is based on a spatial-domain representation consisting of a 1-D difference equation with coefficients in an algebra of 1-D functions. Various necessary and sufficient conditions are derived for asymptotic stability. In particular, it Is shown that stability testing for both quarter- and half-plane 2-D filters reduces to determining the invertibility of a matrix whose entries are in an algebra of 1-D functions. These results are related to existing frequencydomain criteria for stability.
Keywords :
Asymptotic stability; Digital filter stability; General circuits and systems; Multidimensional digital filters; Algebra; Asymptotic stability; Convolution; Difference equations; Digital filters; Stability criteria; Sufficient conditions; Testing; Transfer functions; Two dimensional displays;
Journal_Title :
Circuits and Systems, IEEE Transactions on
DOI :
10.1109/TCS.1980.1084772
