Spin-Locality of Higher-Spin Theories and Star-Product Functional Classes

Abstract

The analysis of spin-locality of higher-spin gauge theory is formulated in terms of star-product functional classes appropriate for the β -∞ limiting shifted homotopy proposed recently in arXiv:1909.04876 where all ω2 C2 higher-spin vertices were shown to be spin-local. For the β -∞ limiting shifted contracting homotopy we identify the class of functions H+0, that do not contribute to the r.h.s. of HS field equations at a given order. A number of theorems and relations that organize analysis of the higher-spin equations are derived including extension of the Pfaffian Locality Theorem of arXiv:1805.11941 to the β-shifted contracting homotopy and the relation underlying locality of the ω2 C2 sector of higher-spin equations. Space-time interpretation of spin-locality of theories involving infinite towers of fields is proposed as the property that the theory is space-time local in terms of original constituent fields and their local currents J() of all ranks. Spin-locality is argued to be a proper substitute of locality for theories with finite sets of fields for which the two concepts are equivalent.