Lieb-Thirring inequality on the four-dimensional sphere and torus

TL;DR

This paper establishes bounds for the Lieb-Thirring inequality constants on four-dimensional sphere and torus, advancing understanding of spectral inequalities in these geometries.

Contribution

It provides explicit bounds for the Lieb-Thirring inequality constants on the four-dimensional sphere and torus, which were previously unknown.

Findings

Bounds for the constant on the sphere: 0.0844 to 0.1728.

Bounds for the constant on the torus: 0.0190 to 0.1222.

Improved understanding of spectral inequalities in four-dimensional geometries.

Abstract

In this paper, we mainly study the Lieb-Thirring inequality for families of orthonormal scalar functions on the four-dimensional sphere $ \mathbb{S}^{4} $ and torus $ \mathbb{T}^{4} $. The bounds of all the constants involved are obtained. Specifically, we prove that the costant $ \mathcal{K}_{4}(\mathbb{S}^{4}) $ of the Lieb-Thirring inequality on the sphere $ \mathbb{S}^{4} $ satisfies $$ 0.0844 \leq \mathcal{K}_{4}(\mathbb{S}^{4})\leq 0.1728,$$ and the constant $ \mathcal{K}_{4}(\mathbb{T}^{4}) $ of the Lieb-Thirring inequality on the torus $ \mathbb{T}^{4} $ satisfies $$ 0.0190 \leq \mathcal{K}_{4}(\mathbb{T}^{4}) \leq 0.1222.$$