FIR Filter Banks for Hexagonal Data Processing

Research output: Contribution to journalArticlepeer-review

Abstract

Images are conventionally sampled on a rectangular lattice. Thus, traditional image processing is carried out on the rectangular lattice. The hexagonal lattice was proposed more than four decades ago as an alternative method for sampling. Compared with the rectangular lattice, the hexagonal lattice has certain advantages which include that it needs less sampling points; it has better consistent connectivity and higher symmetry; the hexagonal structure is also pertinent to the vision process. In this paper we investigate the construction of symmetric FIR hexagonal filter banks for multiresolution hexagonal image processing. We obtain block structures of FIR hexagonal filter banks with 3-fold rotational symmetry and 3-fold axial symmetry. These block structures yield families of orthogonal and biorthogonal FIR hexagonal filter banks with 3-fold rotational symmetry and 3-fold axial symmetry. In this paper, we also discuss the construction of orthogonal and biorthogonal FIR filter banks with scaling functions and wavelets having optimal smoothness. In addition, we present a few of such orthogonal and biorthogonal FIR filters banks.
Original languageAmerican English
JournalIEEE Transactions on Image Processing
Volume17
DOIs
StatePublished - Sep 1 2008

Keywords

  • 3-fold axial symmetry
  • 3-fold rotational symmetry
  • Hexagonal lattice
  • hexagonal data
  • orthogonal and biorthogonal FIR hexagonal filter banks
  • orthogonal and biorthogonal hexagonal wavelets.

Disciplines

  • Mathematics
  • Applied Mathematics

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