A surprising threshold for the validity of the method of singular projection

Abstract

Given a compact manifold N embedded into R and a projection P that retracts R except a singular set of codimension onto N , we investigate the maximal range of parameters s and p such that the projection P can be used to turn an R -valued Ws,p map into an N -valued Ws,p map. Devised by Hardt and Lin with roots in the work of Federer and Fleming, the method of projection is known to apply in W1,p if and only if p < , and has been extended in some special cases to more general values of the regularity parameter s . As a first result, we prove in full generality that, when s ≥ 1 , the method of projection can be applied in the whole expected range sp < . When 0 < s < 1 , the method of projection was only known to be applicable when p < , a more stringent condition than sp < . As a second result, we show that, somehow surprisingly, the condition p < is optimal, by constructing, for every 0 < s < 1 and p ≥ , a bounded Ws,p map into R whose singular projections onto the sphere S-1 all fail to belong to Ws,p . As a byproduct of our method, a similar conclusion is obtained for the closely related method of almost retraction, devised by Haj asz, for which we also prove a more stringent threshold of applicability when 0 < s < 1 .