Segev Shlomov, Avi Yaeli
CHI 2024
We construct biorthogonal multiwavelets (abbreviated to wavelets) in a weighted Hilbert space L2 (E, ρ) where E is a compact subset in ℝd. A recursive formula for biorthogonal wavelet construction is presented. The construction of the initial wavelets is reformulated as the solution of a certain matrix completion problem. A general solution of the matrix completion problem is identified and expressed conveniently in terms of any given particular solution. Several particular solutions are proposed. Reconstruction and decomposition algorithms are developed for the biorthogonal wavelets. Special results for the univariate case E = [0, 1] are obtained.
Segev Shlomov, Avi Yaeli
CHI 2024
Joxan Jaffar
Journal of the ACM
Barry K. Rosen
SWAT 1972
Seung Gu Kang, Jeff Weber, et al.
ACS Fall 2023