Applications of equivariant factorization homology
Aleksandar Miladinovi\'c
TL;DR
This paper explores the use of equivariant factorization homology, constructed via parametrized higher category theory, to unify and describe various results across multiple research papers.
Contribution
It introduces an equivariant version of factorization homology based on parametrized higher category theory, providing a new framework for understanding related mathematical results.
Findings
Demonstrates the applicability of equivariant factorization homology to existing results
Provides a unified categorical framework for equivariant topological theories
Shows how the new approach simplifies and generalizes previous work
Abstract
In this paper we use the equivariant version of factorization homology constructed using the parametrized higher category theory and show that it can be used to describe the results used in the series of papers.
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