On Hankel-type operators with discontinuous symbols in higher dimensions

A.V.Sobolev

arXiv:1106.0131·math.SP·October 9, 2013

On Hankel-type operators with discontinuous symbols in higher dimensions

A.V.Sobolev

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TL;DR

This paper derives an asymptotic formula for the number of eigenvalues of certain Hankel-type pseudo-differential operators with discontinuous symbols in higher dimensions.

Contribution

It provides a new asymptotic formula for the spectral counting function of Hankel-type operators with discontinuous symbols in multiple dimensions.

Findings

01

Derived an asymptotic formula for the spectral counting function.

02

Extended analysis to higher-dimensional Hankel-type operators.

03

Addressed operators with discontinuous symbols.

Abstract

We obtain an asymptotic formula for the counting function of the discrete spectrum for Hankel-type pseudo-differential operators with discontinuous symbols.

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