Abstract:
In this paper, on the basis of the theory of degenerate semigroups of operators and the contraction mapping theorem, we prove the local unique solvability of initial problems for a class of first-order linear differential operator equations with memory and with degenerate operator multiplying the derivative. The resulting abstract results are used to study initial boundary-value problems for partial integro-differential equations not solvable with respect to the time derivative.
Keywords:first-order linear differential operator equation with memory, degenerate semigroup of operators, partial integro-differential equation, contraction mapping theorem, $(L,p)$-radial operator, pseudoparabolic equation, Banach space.
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