Yu-Ting Chen
Published 2025-05-05Version 1
This paper is the third in a series devoted to constructing stochastic motions for the two-dimensional $N$-body delta-Bose gas for all integers $N\geq 3$ and establishing the associated Feynman-Kac-type formulas. The main results here prove the Feynman-Kac-type formulas by using the stochastic many-$\delta$ motions from [7] as the underlying diffusions. The associated multiplicative functionals show a new form and are derived from the analytic solutions of the two-dimensional $N$-body delta-Bose gas obtained in [4]. For completeness, the main theorem includes the formula for $N=2$, which is a minor modification of the Feynman--Kac-type formula proven in [5] for the relative motions.
Comments: Part of the second version of arXiv:2401.17243, 25 pages
Stochastic motions of the two-dimensional many-body delta-Bose gas, II: Many-$δ$ motions
Stochastic motions of the two-dimensional many-body delta-Bose gas, IV: Transformations of relative motions
Stochastic motions of the two-dimensional many-body delta-Bose gas, I: One-$δ$ motions
![QR code for arXiv:2505.03006 [math.PR]](http://oss.arxitics.com/images/favicon.svg)