Method of regions for dual conformal integrals
Abstract
We apply the method of regions to the evaluation of dual conformal integrals with small off-shellness. In contrast to conventional approach, where the separation of regions is performed via dimensional regularization which breaks the dual conformal invariance (DCI) of separate contributions, we use the regularization which is sufficiently generic combination of dimensional and analytic regularizations which preserves the DCI. Within this regularization, the contribution of each region becomes DCI. We show that our method dramatically simplifies the calculations. As a demonstration, we calculate a slightly off-shell DCI pentabox integral up to power corrections. The contributions of all 32 regions appear to be expressible in terms of $\Gamma$-functions thus giving, after removing the regularization, the final expression in terms of cross-ratios logarithms only. We have checked that our result for pentabox integral numerically agrees with the result of the recent Belitsky&Smirnov paper [arXiv:2508.14298] which has essentially more complicated form.