Abstract
The product ϕ ${}_{λ}^{(α,β)}$ (t1)ϕ ${}_{λ}^{(α,β)}$ (t2) of two Jacobi functions is expressed as an integral in terms of ϕ ${}_{λ}^{(α,β)}$ (t3) with explicit non-negative kernel, when α≧β≧−1/2. The resulting convolution structure for Jacobi function expansions is studied. For special values of α and β the results are known from the theory of symmetric spaces.
Citation
Mogens Flensted-Jensen. Tom Koornwinder. "The convolution structure for Jacobi function expansions." Ark. Mat. 11 (1-2) 245 - 262, December 1973. https://doi.org/10.1007/BF02388521
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