Projective stochastic equations and nonlinear long memory

Abstract

A projective moving average \Xt, t ∈ Z\ is a Bernoulli shift written as a backward martingale transform of the innovation sequence. We introduce a new class of nonlinear stochastic equations for projective moving averages, termed projective equations, involving a (nonlinear) kernel Q and a linear combination of projections of Xt on "intermediate" lagged innovation subspaces with given coefficients αi, βi,j. The class of such equations include usual moving-average processes and the Volterra series of the LARCH model. Solvability of projective equations is studied, including a nested Volterra series representation of the solution Xt. We show that under natural conditions on Q, αi, βi,j, this solution exhibits covariance and distributional long memory, with fractional Brownian motion as the limit of the corresponding partial sums process.