Title :
A generalized non-separable 2-D discrete Gabor expansion for image representation and compression
Author_Institution :
Dept. of Math., Maryland Univ., College Park, MD, USA
Abstract :
We present a theory of generalized non-separable two dimensional (2-D) discrete Gabor expansions (DGE). We show that a DGE is essentially a general frame decomposition. Using this theory, we show that a non-separable 2-D analysis sequence can also be the translation and modulation of a single 2-D function γ. A novel algorithm for computing all possible nonseparable 2-D γ is also derived. The non-separable 2-D DGE scheme is useful, e.g., in applications where the orientation of the 2-D Gabor analysis window is important
Keywords :
data compression; image coding; image representation; transforms; Gabor analysis window orientation; general frame decomposition; generalized nonseparable 2D discrete Gabor expansion; image compression; image representation; modulation; translation; Algorithm design and analysis; Books; Concrete; Educational institutions; Hilbert space; Image coding; Image representation; Mathematics; Time frequency analysis; Two dimensional displays;
Conference_Titel :
Image Processing, 1994. Proceedings. ICIP-94., IEEE International Conference
Conference_Location :
Austin, TX
Print_ISBN :
0-8186-6952-7
DOI :
10.1109/ICIP.1994.413427
