HeunD - The Heun Doubleconfluent function
HeunDPrime - The derivative of the Heun Doubleconfluent function
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Parameters
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algebraic expression
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algebraic expression
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algebraic expression
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algebraic expression
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algebraic expression
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Description
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The HeunD function is the solution of the Heun Doubleconfluent equation. Following the first reference (at the end), the equation and the conditions at the origin satisfied by HeunD are
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FunctionAdvisor(definition, HeunD);
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FunctionAdvisor(identities, HeunD);
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Examples
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Heun's Doubleconfluent equation,
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can be transformed into another version of itself, that is, an equation with two irregular singularities located at -1 and 1 through transformations of the form
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where are new variables, and , . Under this transformation, the HeunD parameters transform according to = , = , = and = , where .
These transformations form a group of 32 elements and imply on identities, among which you have
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References
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Decarreau, A.; Dumont-Lepage, M.C.; Maroni, P.; Robert, A.; and Ronveaux, A. "Formes Canoniques de Equations confluentes de l'equation de Heun". Annales de la Societe Scientifique de Bruxelles. Vol. 92 I-II, (1978): 53-78.
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Ronveaux, A. ed. Heun's Differential Equations. Oxford University Press, 1995.
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Slavyanov, S.Y., and Lay, W. Special Functions, A Unified Theory Based on Singularities. Oxford Mathematical Monographs, 2000.
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