On Laplace's linear differential equation of general order |
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| Affiliation: | 1. Department of Mathematics, University of Victoria, Victoria, British Columbia, Canada;2. Department of Mathematics, University of Salford, Salford, Lancashire, U.K. |
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| Abstract: | This paper discusses certain contour integral solutions of the Laplace linear differential equation of order n. It is shown, to quote one of the observations made here, how these solutions can be expressed in terms of confluent forms of Lauricella's hypergeometric function FD(n−1) of n−1 variables. |
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