How likely are two independent recurrent events to occur simultaneously during a given time?

Abstract

We determine the probability P of two independent events A and B, which occur randomly nA and nB times during a total time T and last for tA and tB, to occur simultaneously at some point during T. Therefore we first prove the precise equation equation* P* = tA+tBT - tA2+tB22T2 equation* for the case nA = nB = 1 and continue to establish a simple approximation equation equation* P ≈ 1 - ( 1 - nA tA + tBT )nB equation* for any given value of nA and nB. Finally we prove the more complex universal equation equation* P = 1 - ( T+ - tA nA - tB nB )nA + nB ( T+ - tA nA )nA ( T+ - tB nB )nB E, equation* which yields the probability for A and B to overlap at some point for any given parameter, with T+ := T + tA + tB2 and a small error term E.