Compactly Supported Waveletsand Their Generalizations : An Algebraic ApproachRNDr

  • Radka Turcajov
  • Published 1995

Abstract

In a classical sense, a wavelet basis is an orthonormal basis formed by translates of dyadic dilates of a single function. Usually, such a wavelet basis is associated with a multiresolution analysis, a sequence of embedded approximation subspaces generated by translates of an appropriately dilated scaling function. This scheme can be generalized in various… (More)

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2 Figures and Tables