On the distance between homotopy classes in W1/p,p( S1; S1)

Abstract

For every p∈(1,∞) there is a natural notion of topological degree for maps in W1/p,p( S1; S1) which allows us to write that space as a disjoint union of classes, W1/p,p( S1; S1)=d∈ ZEd. For every pair d1,d2∈ Z, we show that the distance DistW1/p,p( Ed1, Ed2):=f∈ Ed1\ ∈fg∈ Ed2\ dW1/p,p(f, g) equals the minimal W1/p,p-energy in Ed1-d2. In the special case p=2 we deduce from the latter formula an explicit value: DistW1/2,2( Ed1, Ed2)=2π|d2-d1|1/2.