Free and based path groupoids
We give an explicit description of the free path and loop groupoids in the Morita bicategory of translation topological groupoids. We prove that the free path groupoid of a discrete group acting on a topological space $X$ is a translation groupoid given by the same group acting on the topological path space $X^I$. We give a detailed description of based path and loop groupoids and show that both are equivalent to topological spaces. We also establish the notion of homotopy and fibration in this context.
PDF AbstractCategories
Algebraic Topology
Algebraic Geometry
Category Theory
55P35, 18B40, 58E40, 22A22 (Primary), 55R91, 58D19 (Secondary)
