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Kipriyanov–Beltrami Operator with Negative Dimension of theBessel Operators and the Singular Dirichlet Problem for the $$B$$-Harmonic Equation

L. N. Lyakhov, Е. Л. Санина

2020Differential Equations19 citationsDOI

Abstract

For the Kipriyanov operator $$\Delta _B$$ written in the form of the sum of singular differential Bessel operators with, generally speaking, negative parameters, we obtain a representation in spherical coordinates (the Kipriyanov–Beltrami operator). The operator $$\Delta _B$$ on the sphere and the corresponding spherical functions ( $$B $$ -harmonics) are introduced. The main properties of the operator $$ \Delta _B$$ on the sphere and the differential equation of $$B $$ -harmonics are provided. A solution of the inner singular Dirichlet problem in a ball centered at the origin in $$\mathbb {R}^n $$ is given. The solution is obtained by the Fourier method in the form of Laplace series in $$B$$ -harmonics. The solution is bounded only in the case where all parameters of the Bessel operators occurring in $$\Delta _B $$ belong to the interval $$(-1,2/n-1) $$ , $$n\in \mathbb {N}$$ , $$n\geq 3 $$ .

Topics & Concepts

MathematicsBessel functionMathematical analysisOperator (biology)Spherical harmonicsBounded functionDifferential operatorDirichlet problemBall (mathematics)Cylindrical harmonicsPure mathematicsBoundary value problemOrthogonal polynomialsTranscription factorGegenbauer polynomialsChemistryClassical orthogonal polynomialsRepressorGeneBiochemistryDifferential Equations and Boundary ProblemsAlgebraic and Geometric AnalysisSpectral Theory in Mathematical Physics
Kipriyanov–Beltrami Operator with Negative Dimension of theBessel Operators and the Singular Dirichlet Problem for the $B$-Harmonic Equation | Litcius