Asymptotics for the Green’s functions of a transient reflected Brownian motion in a wedge

Sandro Franceschi; Irina Kourkova; Maxence Petit

doi:10.1007/s11134-024-09925-y

Asymptotics for the Green’s functions of a transient reflected Brownian motion in a wedge

Sandro Franceschi, Irina Kourkova, Maxence Petit

Sorbonne Université

Research output: Contribution to journal › Article › peer-review

Abstract

We consider a transient Brownian motion reflected obliquely in a two-dimensional wedge. A precise asymptotic expansion of Green’s functions is found in all directions. To this end, we first determine a kernel functional equation connecting the Laplace transforms of the Green’s functions. We then extend the Laplace transforms analytically and study its singularities. We obtain the asymptotics applying the saddle point method to the inverse Laplace transform on the Riemann surface generated by the kernel.

Original language	English
Pages (from-to)	321-382
Number of pages	62
Journal	Queueing Systems
Volume	108
Issue number	3-4
DOIs	https://doi.org/10.1007/s11134-024-09925-y
Publication status	Published - 1 Dec 2024

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abstract = "We consider a transient Brownian motion reflected obliquely in a two-dimensional wedge. A precise asymptotic expansion of Green{\textquoteright}s functions is found in all directions. To this end, we first determine a kernel functional equation connecting the Laplace transforms of the Green{\textquoteright}s functions. We then extend the Laplace transforms analytically and study its singularities. We obtain the asymptotics applying the saddle point method to the inverse Laplace transform on the Riemann surface generated by the kernel.",

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AU - Kourkova, Irina

AU - Petit, Maxence

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PY - 2024/12/1

Y1 - 2024/12/1

N2 - We consider a transient Brownian motion reflected obliquely in a two-dimensional wedge. A precise asymptotic expansion of Green’s functions is found in all directions. To this end, we first determine a kernel functional equation connecting the Laplace transforms of the Green’s functions. We then extend the Laplace transforms analytically and study its singularities. We obtain the asymptotics applying the saddle point method to the inverse Laplace transform on the Riemann surface generated by the kernel.

AB - We consider a transient Brownian motion reflected obliquely in a two-dimensional wedge. A precise asymptotic expansion of Green’s functions is found in all directions. To this end, we first determine a kernel functional equation connecting the Laplace transforms of the Green’s functions. We then extend the Laplace transforms analytically and study its singularities. We obtain the asymptotics applying the saddle point method to the inverse Laplace transform on the Riemann surface generated by the kernel.

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DO - 10.1007/s11134-024-09925-y

M3 - Article

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VL - 108

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EP - 382

JO - Queueing Systems

JF - Queueing Systems

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ER -

Asymptotics for the Green’s functions of a transient reflected Brownian motion in a wedge

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