Stochastic motions of the two-dimensional many-body delta-Bose gas, II: Many-δ motions

Abstract

This paper is the second in a series devoted to constructing stochastic motions for the two-dimensional N-body delta-Bose gas for all integers N≥ 3 and establishing the associated Feynman-Kac-type formulas. The main results here construct and study the more general stochastic many-δ motions for N particles. They have the interpretation of independent two-dimensional Brownian motions conditioned to attain the contact interactions that realize multiple two-body δ-function potentials. For the construction, we transform the stochastic one-δ motions studied in [7] by Girsanov's theorem locally before a pair of particles with different initial conditions begins to contact each other. The strong Markov processes with lifetime thus obtained are concatenated by using the "no-triple-contacts" (NTC). This NTC phenomenon appears in the functional integral solutions of the two-dimensional many-body delta-Bose gas obtained earlier and is now proven at the pathwise level to a generalized degree.