Equations For Parseval's Frame Wavelets In L2(d) With Compact Supports
Abstract
Let d≥ 1 be a natural number and A0 be a d× d expansive integral matrix with determinant 2. Then A0 is integrally similar to an integral matrix A with certain additional properties. A finite solution to the system of equations associated with the matrix A will result in an iterated sequence \k [0,1)d\ that converges to a function A in L2(d)-norm. With this (scaling) function A, we will construct the Parseval's wavelet function with compact support associated with matrix A0.
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