On weak solutions of linear coercive integral equations in spaces \(L^ 2(X,{\mathcal H}_ k)\) (Q909932)

Let (X,\({\mathcal A},\mu)\) be a complete \(\tau\)-finite measure space and let g: \(X\times X\to C\) be a square integrable function with respect to the measure \(\overline{\mu \times \mu}\). Existence results for the linear integral equation \(u(t)+A\int_{X}g(t,s)u(s)d\mu =f(t)\) a.e. in X are given where A is a maximal extension in the space \({\mathcal B}_{k,2}\) of a certain linear operator L: \(S\to S\) (S is the Schwartz space of infinitely differentiable rapidely decreasing functions on \(R^ n.)\).