1207.2096 (J. S. Dowker)
J. S. Dowker
As is known, the free heat-kernel on the integers (a modified Bessel function) is turned into the periodic free heat-kernel on the discrete circle by factoring, giving a pre-image sum. I generalise existing treatments by making the functions periodic up to a phase, thus introducing an extra parameter into the analysis. Identifying the classical paths form with the conventional eigenfunction expression, I find a combinatorial trace identity which allows various Bessel identities to be extracted, such as a generalisation of the Jacobi-Anger expansion.The free Dirichlet, Neumann and hybrid Dirichlet-Neumann heat-kernels on a discrete interval are constructed using both modes and images. The Neumann imaging mirror has to be placed at a half-integer.
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http://arxiv.org/abs/1207.2096
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