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Positive Markov processes in Laplace duality

Published 13 Jul 2025 in math.PR | (2507.09641v1)

Abstract: This article develops a general framework for Laplace duality between positive Markov processes in which the one-dimensional Laplace transform of one process can be represented through that of another. We show that a process admits a Laplace dual if and only if it satisfies a certain complete monotonicity condition. Moreover, we analyse how the conventions adopted for the values of $0 \cdot \infty$ and $\infty \cdot 0$ are reflected in the weak continuity/absorptivity properties of the processes in duality at the boundaries $0$ and $\infty$. A broad class of generators admitting Laplace duals is identified, and we provide sufficient conditions under which the associated martingale problems are well-posed, the solutions being in duality at the level of their semigroups. Laplace duality is shown to unify several generalizations of continuous-state branching processes, e.g. those with immigration or evolving in random environments. Along the way, a theorem originally due to Ethier and Kurtz -- connecting duality of generators to that of the associated semigroups -- is refined, and we provide a concise proof of the Courr`ege form for the generators of positive Markov processes whose pointwise domain includes the exponential functions. The latter leads naturally to the notion of the Laplace symbol, which is a parsimonious encoding of the infinitesimal dynamics of the process.

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