Topological aspects of brane fields: solitons and higher-form symmetries
Abstract
In this note, we classify topological solitons of n-brane fields, which are nonlocal fields that describe n-dimensional extended objects. We consider a class of n-brane fields that formally define a homomorphism from the n-fold loop space n XD of spacetime XD to a space En. Examples of such n-brane fields are Wilson operators in n-form gauge theories. The solitons are singularities of the n-brane field, and we classify them using the homotopy theory of En-algebras. We find that the classification of codimension k+1 topological solitons with k≥ n can be understood using homotopy groups of En. In particular, they are classified by πk-n(En) when n>1 and by πk-n(En) modulo a π1-n(En) action when n=0 or 1. However, for n>2, their classification goes beyond the homotopy groups of En when k< n, which we explore through examples. We compare this classification to n-form En gauge theory. We then apply this classification and consider an n-form symmetry described by the abelian group G(n) that is spontaneously broken to H(n)⊂ G(n), for which the order parameter characterizing this symmetry breaking pattern is an n-brane field with target space En = G(n)/H(n). We discuss this classification in the context of many examples, both with and without 't Hooft anomalies.
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