Young equations with singularities
Abstract
In this paper we prove existence and uniqueness of a mild solution to the Young equation dy(t)=Ay(t)dt+σ(y(t))dx(t), t∈[0,T], y(0)=. Here, A is an unbounded operator which generates a semigroup of bounded linear operators (S(t))t≥ 0 on a Banach space X, x is a real-valued η-H\"older continuous. Our aim is to reduce, in comparison to [4] and [1] (see also [2,5]) in the bibliography, the regularity requirement on the initial datum eventually dropping it. The main tool is the definition of a sewing map for a new class of increments which allows the construction of a Young convolution integral in a general interval [a,b]⊂ R when the Xα-norm of the function under the integral sign blows up approaching a and Xα is an intermediate space between X and D(A).
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