Evolutional equations with singularities in generalized Stepanov spaces (Q941246)

Let \(S^\pm_{p,l,k}\) denotes the generalized Stepanov space of functions \(f\) on \(\mathbb{R}\) with finite norms \[ \sup_{t\in\mathbb{R}}[\frac 1l \int^l_0k(s)|f(s\pm t)|^p ds]^{\frac 1p}, \] where \(l>0\), \(p\geq 1\), the function \(k(x)>0\) is differentiable on \((0,\infty)\) and \(\lim_{a\to 0} \int^l_ak(x)dx<\infty\). The authors consider the equation \(du/dt-Au(t)=f(t)\) for \(f\in S^-_{1,1,k}\). Assuming that \(A\) is the generating operator of some semigroup \(U(t)\) and further regularity conditions both on \(f\) and \(k\) they prove the unique solvability to the above equation and obtain the following representation of the solution \(u(t)=\int^t_{-\infty}U(t-s)f(s)ds\).