# Exhaustive families of representations of $C^*$-algebras associated to   $N$-body Hamiltonians with asymptotically homogeneous interactions

**Authors:** Jeremy Mougel, Nicolas Prudhon

arXiv: 1812.06704 · 2018-12-18

## TL;DR

This paper studies the spectral properties of $N$-body Hamiltonians with asymptotically homogeneous interactions using algebraic methods, extending previous frameworks and providing Fredholm criteria for associated operators.

## Contribution

It introduces a comprehensive algebraic framework for analyzing $N$-body Hamiltonians with asymptotically homogeneous interactions, extending prior work and addressing open questions.

## Key findings

- Spectral analysis of $N$-body Hamiltonians with asymptotic homogeneity.
- Extension of algebraic methods to broader classes of operators.
- Fredholm conditions for elliptic operators in this context.

## Abstract

We continue the analysis of algebras introduced by Georgescu, Nistor and their coauthors, in order to study $N$-body type Hamiltonians with interactions. More precisely, let $Y$ be a linear subspace of a finite dimensional Euclidean space $X$, and $v_Y$ be a continuous function on $X/Y$ that has uniform homogeneous radial limits at infinity. We consider, in this paper, Hamiltonians of the form $H = - \Delta + \sum_{Y \in S} v_Y$, where the subspaces $Y$ belong to some given family S of subspaces. We prove results on the spectral theory of the Hamiltonian when $S$ is any family of subspaces and extend those results to other operators affiliated to a larger algebra of pseudo-differential operators associated to the action of $X$ introduced by Connes. In addition, we exhibit Fredholm conditions for such elliptic operators. We also note that the algebras we consider answer a question of Melrose and Singer.

## Full text

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## References

15 references — full list in the complete paper: https://tomesphere.com/paper/1812.06704/full.md

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Source: https://tomesphere.com/paper/1812.06704