1. ALGEBRAIC WAVELET TRANSFORM VIA QUANTICS TENSOR TRAIN DECOMPOSITION.
- Author
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OSELEDETS, IVAN V. and TYRTYSHNIKOV, EUGENE E.
- Subjects
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MATHEMATICAL forms , *WAVELETS (Mathematics) , *ALGORITHMS , *NUMERICAL analysis , *COMPUTER simulation - Abstract
In this paper we show that recently introduced quantics tensor train (QTT) decomposition call be considered as an algebraic wavelet transform with adaptively determined filters. The main algorithm for obtaining QTT decomposition can be reformulated as a method seeking "good subspaces" or "good bases" and considered as a parameterized transformation of an initial tensor into a sparse tensor. This interpretation allows us to introduce a modification of the tensor train-SVD (TT-SVD) algorithm to make it work in cases where the original algorithm does not work; it results in the new wavelet-like transforms called wavelet tensor train (WTT) transform. Properties of WTT transforms are studied numerically, and a theoretical conjecture on the number of vanishing moments is proposed. It is shown that WTT transforms are orthogonal by construction, and the efficiency of WTT is compared with and often outperforms Daubechies wavelet transforms on certain classes of function-related vectors and matrices. [ABSTRACT FROM AUTHOR]
- Published
- 2011
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