English

Operators for matrix-valued Riesz bases over LCA groups

Functional Analysis 2026-01-27 v1

Abstract

The image of a given orthonormal basis for a separable Hilbert space H\mathcal{H} under a bijective, bounded, and linear operator acting on H\mathcal{H} is called a Riesz basis of H\mathcal{H}. Contrary to what happens with Riesz bases (in the usual sense) in separable Hilbert spaces, it is not true in general that the image of a matrix-valued orthonormal basis under a bounded, linear, and bijective operator on L2(G,Cs×r)L^2(G, \mathbb{C}^{s\times r}) is also a basis and frame for the space L2(G,Cs×r)L^2(G, \mathbb{C}^{s\times r}), where GG is a σ\sigma-compact and metrizable locally compact abelian (LCA) group. We give some classes of operators for the construction of matrix-valued Riesz bases from orthonormal bases of the space L2(G,Cs×r)L^2(G, \mathbb{C}^{s\times r}). Motivated by a result due to Holub, we show that a bounded, linear, and bijective operator acting on L2(G,Cs×r)L^2(G, \mathbb{C}^{s\times r}) which is adjointable with respect to the matrix-valued inner product is positive if and only if it maps a matrix-valued Riesz basis of the space L2(G,Cs×r)L^2(G, \mathbb{C}^{s\times r}) to its dual Riesz basis.

Keywords

Cite

@article{arxiv.2410.09446,
  title  = {Operators for matrix-valued Riesz bases over LCA groups},
  author = {Jyoti and Lalit Kumar Vashisht},
  journal= {arXiv preprint arXiv:2410.09446},
  year   = {2026}
}
R2 v1 2026-06-28T19:18:53.964Z