The structure of maximally supersymmetric Yang-Mills theory: constraining higher-order corrections

TL;DR

This paper derives algebraic conditions on ten-dimensional supersymmetric Yang-Mills theory fields by solving superspace Bianchi identities without constraints, constraining higher-order corrections relevant to string theory and D-branes.

Contribution

It provides a novel algebraic framework for understanding higher-order corrections in maximally supersymmetric Yang-Mills theory using superspace methods.

Findings

Constraints on higher-order F^2 and beyond terms

Control over field redefinitions and physical relevance of corrections

Application to effective gauge theories on D-branes

Abstract

We solve the superspace Bianchi identities for ten-dimensional supersymmetric Yang-Mills theory without imposing any kind of constraints apart from the standard conventional one. In this way we obtain a set of algebraic conditions on certain fields which in the on-shell theory are constructed as composite ones out of the physical fields. These conditions must hence be satisfied by any kind of theory in ten dimensions invariant under supersymmetry and some, abelian or non-abelian, gauge symmetry. Deformations of the ordinary SYM theory (as well as the fields) are identified as elements of a certain spinorial cohomology, giving control over field redefinitions and the distinction between physically relevant higher-order corrections and those removable by field redefinitions. The conditions derived severely constrain theories involving F^2-level terms plus higher-order corrections, as for instance those derived from open strings as effective gauge theories on D-branes.