English

Multipliers for operator-valued Bessel sequences, generalized Hilbert-Schmidt and trace classes

Functional Analysis 2021-05-03 v2

Abstract

Let {λn}n(N)\{\lambda_n\}_n \in \ell^\infty(\mathbb{N}). In 1960, R. Schatten \cite{SCHATTEN} studied operators of the form n=1λn(xnynˉ)\sum_{n=1}^{\infty}\lambda_n (x_n\otimes \bar{y_n}), where {xn}n\{x_n\}_n, {yn}n\{y_n\}_n are orthonormal sequences in a Hilbert space. In 2007, P. Balazs \cite{BALAZS3} generalized this by replacing {xn}n\{x_n\}_n and {yn}n\{y_n\}_n by Bessel sequences. In this paper, we generalize this by studying the operators of the form n=1λn(AnxnBnynˉ)\sum_{n=1}^{\infty}\lambda_n (A^*_nx_n\otimes \bar{B^*_ny_n}), where {An}n\{A_n\}_n and {Bn}n\{B_n\}_n are operator-valued Bessel sequences and {xn}n\{x_n\}_n, {yn}n\{y_n\}_n are sequences in the Hilbert space such that {xnyn}n(N)\{\|x_n\|\|y_n\|\}_n \in \ell^\infty(\mathbb{N}). We next generalize the classes of Hilbert-Schmidt and trace class operators.

Keywords

Cite

@article{arxiv.1908.11059,
  title  = {Multipliers for operator-valued Bessel sequences, generalized Hilbert-Schmidt and trace classes},
  author = {K. Mahesh Krishna and P. Sam Johnson and R. N. Mohapatra},
  journal= {arXiv preprint arXiv:1908.11059},
  year   = {2021}
}

Comments

20 pages, no figures

R2 v1 2026-06-23T10:59:37.868Z