Persistence probabilities of MA(1) sequences with Laplace innovations and $q$-deformed zigzag numbers

Frank Aurzada; Kilian Raschel

Paper

Persistence probabilities of MA(1) sequences with Laplace innovations and $q$-deformed zigzag numbers

Abstract

We study the persistence probabilities of a moving average process of order one with innovations that follow a Laplace distribution. The persistence probabilities can be computed fully explicitly in terms of classical combinatorial quantities like certain

-Pochhammer symbols or

-deformed analogues of Euler's zigzag numbers, respectively. Similarly, the generating functions of the persistence probabilities can be written in terms of

-analogues of the exponential function or the

-sine/

-cosine functions, respectively.