The Basso-Dixon Formula and Calabi-Yau Geometry

TL;DR

This paper explores the connection between Calabi-Yau geometry and four-point fishnet integrals, revealing determinant formulas and geometric structures that underpin the Basso-Dixon formula in two dimensions.

Contribution

It demonstrates that the Picard-Fuchs operators for fishnet integrals are exterior powers of ladder integral operators, linking Calabi-Yau periods to known integral formulas.

Findings

Picard-Fuchs operators for fishnet integrals are exterior powers of ladder integral operators

Periods of Calabi-Yau varieties can be expressed as determinants of ladder integral periods

The geometric monodromy group influences the structure of these periods

Abstract

We analyse the family of Calabi-Yau varieties attached to four-point fishnet integrals in two dimensions. We find that the Picard-Fuchs operators for fishnet integrals are exterior powers of the Picard-Fuchs operators for ladder integrals. This implies that the periods of the Calabi-Yau varieties for fishnet integrals can be written as determinants of periods for ladder integrals. The representation theory of the geometric monodromy group plays an important role in this context. We then show how the determinant form of the periods immediately leads to the well-known Basso-Dixon formula for four-point fishnet integrals in two dimensions. Notably, the relation to Calabi-Yau geometry implies that the volume is also expressible via a determinant formula of Basso-Dixon type. Finally, we show how the fishnet integrals can be written in terms of iterated integrals naturally attached to the Calabi-Yau varieties.