Abstract
This is a sequel of our previous paper where we described an algorithm to find a solution of differential equations for master integrals in the form of an ϵ-expansion series with numerical coefficients. The algorithm is based on using generalized power series expansions near singular points of the differential system, solving difference equations for the corresponding coefficients in these expansions and using matching to connect series expansions at two neighboring points. Here we use our algorithm and the corresponding code for our example of four-loop generalized sunset diagrams with three massive and tw massless propagators, in order to obtain new analytical results. We analytically evaluate the master integrals at threshold, p2 = 9m2, in an expansion in ϵ up to ϵ1. With the help of our code, we obtain numerical results for the threshold master integrals in an ϵ-expansion with the accuracy of 6000 digits and then use the PSLQ algorithm to arrive at analytical values. Our basis of constants is build from bases of multiple polylogarithm values at sixth roots of unity.
Highlights
JHEP07(2018)102 detailed description of their properties and the possibility to evaluate them numerically are concerned
Smirnovc aBudker Institute of Nuclear Physics, 630090 Novosibirsk, Russia bResearch Computing Center, Moscow State University, 119992 Moscow, Russia cSkobeltsyn Institute of Nuclear Physics of Moscow State University, 119992 Moscow, Russia dInstitut fur Theoretische Teilchenphysik, KIT, 76128 Karlsruhe, Germany E-mail: roman.n.lee@gmail.com, asmirnov80@gmail.com, smirnov@theory.sinp.msu.ru. This is a sequel of our previous paper where we described an algorithm to find a solution of differential equations for master integrals in the form of an ǫ-expansion series with numerical coefficients
With the help of our code, we obtain numerical results for the threshold master integrals in an ǫ-expansion with the accuracy of 6000 digits and use the PSLQ algorithm to arrive at analytical values
Summary
JHEP07(2018)102 detailed description of their properties and the possibility to evaluate them numerically are concerned. With the help of our code, we obtain numerical results for the threshold master integrals in an ǫ-expansion with the accuracy of 6000 digits and use the PSLQ algorithm to arrive at analytical values. With the current version of DESS, we have obtained numerical results for the threshold master integrals in an ǫ-expansion up to ǫ2 with the accuracy of 6000 digits for the corresponding coefficients.
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