On the properties of rings of integro-differential operators and their corresponding equations (Q2170522)

Existence of solutions and a solution representation are studied for the following linear integro-differential system \[ \sum_{j=0}^m A_j(t)\left(\frac{d}{dt}\right)^jy+\int_{\alpha}^t K(t,s)y(s)\,ds +\sum_{j=0}^l B_j(t)y^{\{j\}}(\alpha) \]\[ +\lambda \int_{\alpha}^{\beta} G(t,s) y(s)\,ds,\ t\in [\alpha,\beta]. \] It is also shown that the ring of operators corresponding to these systems contains the semigroup of operators for which a left inverse operator from this ring is found.