On the definite integral of two confluent hypergeometric functions related to the Kamp\'e de F\'eriet double series
Abstract
The Kamp\'e de F\'eriet double series F1:1;11:1;1 is studied through the solution to the associated first-order nonhomogeneous differential equation. It is shown that the integral of tβ+lM(·;β;λ t)M(·;β;-λ t) over t∈[0,T], T≥0, l=0,1,…, β+l>-1, is a linear combination of functions F1:1;11:1;1. The integral is a generalization of a class of so-called Coulomb integrals involving regular Coulomb wave functions.
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