Tensor rank bounds and explicit QTT representations for the inverses of circulant matrices
Abstract
In this paper, we are concerned with the inversion of circulant matrices and their quantized tensor-train (QTT) structure. In particular, we show that the inverse of a complex circulant matrix A, generated by the first column of the form (a0,…,am-1,0,…,0,a-n,…, a-1) admits a QTT representation with the QTT ranks bounded by (m+n). Under certain assumptions on the entries of A, we also derive an explicit QTT representation of A-1. The latter can be used, for instance, to overcome stability issues arising when numerically solving differential equations with periodic boundary conditions in the QTT format.
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