About Dirichlet boundary value problem for the heat equation in the infinite angular domain
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Boundary Value Problems
Abstract
In this paper it is established that in an infinite angular domain for Dirichlet problem of
the heat conduction equation the unique (up to a constant factor) non-trivial solution
exists, which does not belong to the class of summable functions with the found
weight. It is shown that for the adjoint boundary value problem the unique (up to a
constant factor) non-trivial solution exists, which belongs to the class of essentially
bounded functions with the weight found in the work. It is proved that the operator
of a boundary value problem of heat conductivity in an infinite angular domain in a
class of growing functions is Noetherian with an index which is equal to minus one.
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Jenaliyev М. About Dirichlet boundary value problem for the heat equation in the infinite angular domain/М. Jenaliyev, М. Kosmakova, М. Ramazanov//Boundary Value Problems. -2014.