Resumen de An integral equation for the distribution of the first exit time of a reflected brownian motion.
Víctor de la Peña, Gerardo Hernández del Valle, Carlos G. Pacheco González
Reflected Brownian motion is used in areas such as physiology, electrochemistry and nuclear magnetic resonance. We study the first-passage-time problem of this process which is relevant in applications; specifically, we find a Volterra integral equation for the distribution of the first time that a reflected Brownian motion reaches a nondecreasing barrier. Additionally, we note how a numerical procedure can be used to solve the integral equation.
