Lifting closed curves to finite covers of free groups

Abstract

In this article, we show that given any integer l≥ 2, every closed curve γ on the bouquet of n-circles , admits a lift to a finite l-sheeted normal covering of . Equivalently, identifying the free group Fn of n generators with the fundamental group of , this statement asserts that Fn is a union of l-index normal subgroups for any l≥ 2. The proof proceeds by explicitly constructing families of l-sheeted normal coverings of , together with a characterization, in terms of necessary and sufficient conditions, of when a closed curve γ on lifts to these covers.

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