# On $T$-coercive interior transmission eigenvalue problems on compact   manifolds with smooth boundary

**Authors:** Naotaka Shoji

arXiv: 1703.01743 · 2017-03-14

## TL;DR

This paper investigates interior transmission eigenvalues on two compact Riemannian manifolds with smooth boundary, establishing their discreteness and existence of regions free of eigenvalues using the T-coercivity method.

## Contribution

It extends the analysis of interior transmission eigenvalues to non-diffeomorphic manifolds with anisotropic metrics and boundary conditions, introducing new existence and discreteness results.

## Key findings

- Set of interior transmission eigenvalues is infinite and discrete.
- Existence of eigenvalue-free regions established.
- Method employs T-coercivity for non-diffeomorphic manifolds with anisotropic metrics.

## Abstract

In this paper, we consider an interior transmission eigenvalue problem on two compact Riemannian manifolds with common smooth boundary.   We suppose that a couple of these manifolds is equipped with locally anisotropic type Riemannian metric tensors, i.e., these two tensors are not equivalent in a neighborhood of common boundary.   Here we note that we do not assume that these manifolds are diffeomorphic.   In addition, we impose some conditions of the refractive indices in a neighborhood of common boundary.   Then we prove that the set of ITEs form infinite discrete set and the existence of ITE-free region.   In order to prove our results, we employ so-called the $T$-coercivity method.

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Source: https://tomesphere.com/paper/1703.01743