An exponential estimate for Hilbert space-valued Ornstein--Uhlenbeck processes

Abstract

Let Z be a H-valued Ornstein--Uhlenbeck process, b[0,1]× H → H and h[0,1] → H be a bounded, Borel measurable functions with \|b\|∞ ≤ 1 then E α | ∫01 b(t, Zt + h(t)) - b(t, Zt) \, d t |H2 ≤ C holds, where the constant C is an absolute constant and α>0 depends only on the eigenvalues of the drift term of Z and \|h\|∞, the norm of h, in an explicit way. Using this we furthermore prove a concentration of measure result and estimate the moments of the above integral.