# The Asymptotic Behaviour of the Sum of Negative Eigenvalues of a   Self-Adjoint Operator Given in Semi-Axis

**Authors:** Ozlem Baksi

arXiv: 1904.05622 · 2019-04-12

## TL;DR

This paper derives asymptotic formulas for the sum of negative eigenvalues of a specific self-adjoint differential operator on a semi-axis, providing insights into spectral properties relevant to mathematical physics.

## Contribution

It introduces new asymptotic formulas for the sum of negative eigenvalues of a class of self-adjoint operators defined by differential expressions on the semi-axis.

## Key findings

- Derived asymptotic formulas for eigenvalue sums
- Analyzed spectral behavior of differential operators
- Extended understanding of eigenvalue distribution in semi-infinite domains

## Abstract

In this work, we find the asymptotic formulas for the sum of the negative eigenvalues smaller than $-\varepsilon$ $(\varepsilon >0)$ of a self-adjoint operator $L$ which is defined by the following differential expression $$\ell(y)=-(p(x)y'(x))'-Q(x)y(x)$$ with the boundary condition $y(0) = 0$ in the space in the space $L_{2}(0,\infty ;H)$.

## Full text

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## References

12 references — full list in the complete paper: https://tomesphere.com/paper/1904.05622/full.md

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Source: https://tomesphere.com/paper/1904.05622