A nonlinear Lazarev-Lieb theorem: L2-orthogonality via motion planning

Abstract

Lazarev and Lieb showed that finitely many integrable functions from the unit interval to C can be simultaneously annihilated in the L2 inner product by a smooth function to the unit circle. Here we answer a question of Lazarev and Lieb proving a generalization of their result by lower bounding the equivariant topology of the space of smooth circle-valued functions with a certain W1,1-norm bound. Our proof uses a relaxed notion of motion planning algorithm that instead of contractibility yields a lower bound for the Z/2-coindex of a space.