Linear Volterra integral equations as the limit of discrete systems (Q705047)

The authors study existence of continuous solutions to a linear Volterra integral equation \[ x(t)+(*)\int_{\mathbb{R}_t}\alpha(\tau)x(\tau)\,d\tau=f(t)\, , \quad t\in\mathbb{R} \] as the limit of discrete Styltjes-type systems of triangular operators. The functions are Banach space valued and the integral is either Bochner-Lebesgue or Henstock type. \(\mathbb{R}_t\) is a subinterval of the real axis \(\mathbb{R}\) depending on the variable \(t\), mostly \(\mathbb{R}_t=(a,t]\). Results on existence of continuous solutions are proved.