On the longest gap between power-rate arrivals
arXiv:1703.09424
Abstract
Let $L_t$ be the longest gap before time $t$ in an inhomogeneous Poisson process with rate function $λ_t$ proportional to $t^{α-1}$ for some $α\in(0,1)$. It is shown that $λ_tL_t-b_t$ has a limiting Gumbel distribution for suitable constants $b_t$ and that the distance of this longest gap from $t$ is asymptotically of the form $(t/\log t)E$ for an exponential random variable $E$. The analysis is performed via weak convergence of related point processes. Subject to a weak technical condition, the results are extended to include a slowly varying term in $λ_t$.
19 pages