Dirichlet type boundary value problem for an elliptic equation with three singular coefficients in the first octant
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Karagandy University of the name of academician E.A. Buketov
Abstract
The paper investigates a Dirichlet-type boundary value problem for a three-dimensional elliptic equation
with three singular coefficients in the first octant. The uniqueness of the solution within the class of regular
solutions is established using the energy integral method. To prove the existence of a solution, the Hankel
integral transform method is employed. The use of the Hankel transform is particularly appropriate when
the variables in the equation range from zero to infinity. This transform is an effective method for obtaining
solutions to such problems. In three-dimensional space, to derive the image equation, the Hankel integral
transform is applied to the original equation with respect to the variables x and y. As a result, a boundary
value problem for an ordinary differential equation in the variable z arises. By solving this problem, a
solution to the original boundary value problem is constructed in the form of a double improper integral
involving Bessel functions of the first kind and Macdonald functions. To justify the uniform convergence
of the improper integrals, asymptotic estimates of the Bessel functions of the first kind and Macdonald
functions are utilized. Based on these estimates, bounds for the integrands are obtained, which ensure the
convergence of the resulting double improper integral, that is, the solution to the original boundary value
problem and its derivatives up to second order, inclusively, as well as the theorem of existence within the
class of regular solutions.
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Karimov K.T. Dirichlet type boundary value problem for an elliptic equation with three singular coefficients in the first octant / A K.T. Karimov, M.R. Murodova // Bulletin of the Karaganda University. Mathematics Series. – 2025. – № 3(119). – pp. 164-175.