The heat equation with inverse-square potential on both half-lines of ℝ is discussed in the presence of bridging boundary conditions at the origin. The problem is the lowest energy (zero-momentum) mode of the transmission of the heat flow across a Grushin-type cylinder, a generalisation of an almost-Riemannian structure with compact singularity set. This and related models are reviewed, and the issue is posed of the analysis of the dispersive properties for the heat kernel generated by the underlying positive self-adjoint operator. Numerical integration is shown that provides a first insight and relevant qualitative features of the solution at later times.
Heat Equation with Inverse-Square Potential of Bridging Type Across Two Half-Lines / M. Gallone, A. Michelangeli, E. Pozzoli (SPRINGER INDAM SERIES). - In: Qualitative Properties of Dispersive PDEs / [a cura di] V. Georgiev, A. Michelangeli, R. Scandone. - [s.l] : Springer-Verlag, 2022. - ISBN 9789811964336. - pp. 141-164 (( convegno Conference proceedings nel 2022 [10.1007/978-981-19-6434-3_7].
Heat Equation with Inverse-Square Potential of Bridging Type Across Two Half-Lines
M. Gallone;
2022
Abstract
The heat equation with inverse-square potential on both half-lines of ℝ is discussed in the presence of bridging boundary conditions at the origin. The problem is the lowest energy (zero-momentum) mode of the transmission of the heat flow across a Grushin-type cylinder, a generalisation of an almost-Riemannian structure with compact singularity set. This and related models are reviewed, and the issue is posed of the analysis of the dispersive properties for the heat kernel generated by the underlying positive self-adjoint operator. Numerical integration is shown that provides a first insight and relevant qualitative features of the solution at later times.
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