On the persistent homology of almost surely C0 stochastic processes

Abstract

This paper investigates the propreties of the persistence diagrams stemming from almost surely continuous random processes on [0,t]. We focus our study on two variables which together characterize the barcode : the number of points of the persistence diagram inside a rectangle ]\!-\!∞,x]× [x+,∞[, Nx,x+ and the number of bars of length ≥ , N. For processes with the strong Markov property, we show both of these variables admit a moment generating function and in particular moments of every order. Switching our attention to semimartingales, we show the asymptotic behaviour of N and Nx,x+ as 0 and of N as ∞. Finally, we study the repercussions of the classical stability theorem of barcodes and illustrate our results with some examples, most notably Brownian motion and empirical functions converging to the Brownian bridge.