Commuting tuple of multiplication operators homogeneous under the unitary group

Authors

Soumitra Ghara, Indian Institute of Technology Kharagpur
Surjit Kumar, Indian Institute of Technology Madras
Gadadhar Misra, Indian Statistical Institute Bangalore
Paramita Pramanick, Indian Institute of Technology Kanpur

Article Type

Research Article

Publication Title

Journal of the London Mathematical Society

Abstract

Let (Formula presented.) be the group of (Formula presented.) unitary matrices. We find conditions to ensure that a (Formula presented.) -homogeneous (Formula presented.) -tuple (Formula presented.) is unitarily equivalent to multiplication by the coordinate functions on some reproducing kernel Hilbert space (Formula presented.), (Formula presented.). We describe this class of (Formula presented.) -homogeneous operators, equivalently, nonnegative kernels (Formula presented.) quasi-invariant under the action of (Formula presented.). We classify quasi-invariant kernels (Formula presented.) transforming under (Formula presented.) with two specific choice of multipliers. A crucial ingredient of the proof is that the group (Formula presented.) has exactly two inequivalent irreducible unitary representations of dimension (Formula presented.) and none in dimensions (Formula presented.), (Formula presented.). We obtain explicit criterion for boundedness, reducibility, and mutual unitary equivalence among these operators.

DOI

10.1112/jlms.12890

Publication Date

4-1-2024

Comments

Open Access; Green Open Access

Recommended Citation

Ghara, Soumitra; Kumar, Surjit; Misra, Gadadhar; and Pramanick, Paramita, "Commuting tuple of multiplication operators homogeneous under the unitary group" (2024). Journal Articles. 4661.
https://digitalcommons.isical.ac.in/journal-articles/4661