A discrete approach to Rough Parabolic Equations

Abstract

By combining the formalism of RHE with a discrete approach close to the considerations of Davie, we interpret and solve the rough partial differential equation dyt=A yt \, dt+Σi=1m fi(yt) \, dxit (t∈ [0,T]) on a compact domain O of n, where A is a rather general elliptic operator of Lp(O) (p>1), fi()():=fi(()) and x is the generator of a 2-rough path. The (global) existence, uniqueness and continuity of a solution is established under classical regularity assumptions for fi. Some identification procedures are also provided in order to justify our interpretation of the problem.