Loop Integrals, R Functions and their Analytic Continuation

· 1993 · hep-th · arXiv hep-th/9307055

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abstract

To entirely determine the resulting functions of one-loop integrals it is necessary to find the correct analytic continuation to all relevant kinematical regions. We argue that this continuation procedure may be performed in a general and mathematical accurate way by using the ${\cal R}$ function notation of these integrals. The two- and three-point cases are discussed explicitly in this manner.

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Numerical analytical continuation of multivariate hypergeometric functions

math-ph · 2026-05-29 · unverdicted · novelty 4.0

A general numerical framework is described for high-precision evaluation and analytic continuation of multivariate hypergeometric functions via Pfaffian systems and the Frobenius method.

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Numerical analytical continuation of multivariate hypergeometric functions math-ph · 2026-05-29 · unverdicted · none · ref 14 · internal anchor
A general numerical framework is described for high-precision evaluation and analytic continuation of multivariate hypergeometric functions via Pfaffian systems and the Frobenius method.

Loop Integrals, R Functions and their Analytic Continuation

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