Linear space of spinor monomials and realization of the Nambu-Goldstone fermion in the Volkov-Akulov and Komargodski-Seiberg Lagrangians

TL;DR

This paper discusses an analytical algorithm for matching two formulations of the Nambu-Goldstone fermion, revealing a linear space of spinorial monomials that clarify their relations in the Volkov-Akulov and Komargodski-Seiberg models.

Contribution

The paper introduces a linear space of spinorial monomials to better understand the relation between VA and KS realizations of the NG fermion, supported by computer-assisted results.

Findings

Revealed a linear space of composite spinorial monomials satisfying scalar constraints.

Clarified relations between VA and KS realizations of the NG fermion.

Validated the analytical algorithm with computer assistance.

Abstract

The analytical algorithm previously proposed by the author for matching the Volkov-Akulov (VA) and Komargodski-Seiberg (KS) actions describing the Nambu-Goldstone (NG) fermion, is discussed. The essence of the algotithm is explained, its consistency is proved and the recent results obtained with computer assistance are reproduced, when the proper Fierz rearrangements for Majorana bispinors are taken into account. We reveal a linear space of composite spinorial monomials $\Delta_{m}$ which are the solutions of the scalar constraint $(\partial^{m}\bar\psi\Delta_{m})=0$. This space is used to clarify relations between the KS and VA realizations of the NG fermionic field $\psi$.