Concentration inequality for U-statistics of order two for uniformly ergodic Markov chains

Abstract: We prove a new concentration inequality for U-statistics of order two for uniformly ergodic Markov chains. Working with bounded π-canonical kernels, we show that we can recover the convergence rate of Arcones and Gine (1993) who proved a concentration result for U-statistics of independent random variables and canonical kernels. Our proof relies on an inductive analysis where we use martingale techniques, uniform ergodicity, Nummelin splitting and Bernstein's type inequality where the spectral gap of the chain… Show more