Factorization of abstract operators into two second degree operators and its applications to integro-differential equations

Authors

  • I.N. Parasidis
  • E. Providas

DOI:

https://doi.org/10.31489/2024m1/149-161

Keywords:

correct operator, bijective operator, factorization (decomposition) of linear operators, Fredholm integro-differential equations, boundary value problems, exact solutions

Abstract

Boundary value problem B1x = f with an abstract linear operator B1, corresponding to an Fredholm integro-differential equation with ordinary or partial differential operator is researched. An exact solution to B1x = f in the case when a bijective operator B1 has a factorization of the form B1 =BB0 where B and B0 are two linear more simple than B1 second degree abstract operators, received. Conditions for factorization of the operator B1 and a criterion for bijectivity of B1 are found.

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Published

2024-03-29

Issue

Section

MATHEMATICS