Fermionic trace relations and supersymmetric indices at finite $N$

TL;DR

This paper investigates fermionic matrix invariants under $U(N)$, revealing unique trace relations and a rank-independent supersymmetric index in a simplified model, with implications for algebraic structures and limits in supersymmetric theories.

Contribution

It introduces new trace relations for fermionic matrices, proves the rank-independence of a specific supersymmetric index, and explores algebraic structures and limits in supersymmetric gauge theories.

Findings

The $2N$th power of a Grassmann matrix vanishes, leading to new trace relations.

The supersymmetric index in a simple fermionic model is independent of $N$.

Patterns in the behavior of supersymmetric indices as a function of $N$ are identified.

Abstract

We study invariants of bosonic and fermionic (Grassmann-valued) matrices under the adjoint action of $U(N)$, weighted by the fermion number. Such models naturally appear as the supersymmetric indices of supersymmetric gauge theories and are captured by $U(N)$ matrix models. We discuss two features of the fermionic models that are qualitatively different from bosonic models. Firstly, the $2N^\text{th}$ power of a Grassmann matrix vanishes, which gives rise to many new trace relations. Secondly, trace relations in models involving fermions could cause an increase in the supersymmetric index as $N$ decreases, in contrast with purely bosonic models. We focus on a simple model involving one fermion and one derivative that corresponds to a $\frac14$-BPS supersymmetric index in $\mathcal{N}=4$ SYM theory, in which we find that the index is independent of $N$. We prove this rank-independence analytically, and experimentally study the cancellations between bosonic and fermionic trace relations that lead to it. Based on these observations, we make some conjectures on resulting algebraic structures, including the analogue of the polarized Cayley-Hamilton identities and the Second Fundamental Theorem of invariants in the presence of Grassmann matrices. Finally, we present various (smooth and singular) limits of the most general supersymmetric index in $\mathcal{N}=4$ SYM theory, and study some patterns in their behavior as a function of $N$.