We prove that for a diffusion process the first-passage-time p.d.f. through a continuous-time function with bounded derivative satisfies a Volterra integral equation of the second kind whose kernel and right-hand term are probability currents. For the case of the standard Wiener process this equation is solved in closed form not only for the class of boundaries already introduced by Park and Paranjape [15] but also for all boundaries of the type S(t)=a+bt1/p (p ≥ 2, a, b ∈ R)) for which no explicit analytical results have previously been available.
On an integral equation for first-passage-time probability densities / Ricciardi, LUIGI MARIA; L., Sacerdote; S., Sato. - In: JOURNAL OF APPLIED PROBABILITY. - ISSN 0021-9002. - STAMPA. - 21:2(1984), pp. 302-314. [10.2307/3213641]
On an integral equation for first-passage-time probability densities
RICCIARDI, LUIGI MARIA;
1984
Abstract
We prove that for a diffusion process the first-passage-time p.d.f. through a continuous-time function with bounded derivative satisfies a Volterra integral equation of the second kind whose kernel and right-hand term are probability currents. For the case of the standard Wiener process this equation is solved in closed form not only for the class of boundaries already introduced by Park and Paranjape [15] but also for all boundaries of the type S(t)=a+bt1/p (p ≥ 2, a, b ∈ R)) for which no explicit analytical results have previously been available.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
