Regularity results for non-linear Young equations and applications

Abstract

In this paper we provide sufficient conditions which ensure that the non-linear equation dy(t)=Ay(t)dt+σ(y(t))dx(t), t∈(0,T], with y(0)= and A being an unbounded operator, admits a unique mild solution which is classical, i.e., y(t)∈ D(A) for any t∈ (0,T], and we compute the blow-up rate of the norm of y(t) as t→ 0+. We stress that the regularity of y is independent on the smoothness of the initial datum , which in general does not belong to D(A). As a consequence we get an integral representation of the mild solution y which allows us to prove a chain rule formula for smooth functions of y and necessary conditions for the invariance of hyperplanes with respect to the non-linear evolution equation.

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