Sharp estimate of global Coulomb gauge

Abstract

Let A be a W1,2-connection on a principle SU(2)-bundle P over a compact 4-manifold M whose curvature FA satisfies \|FA\|L2(M) . Our main result is the existence of a global section σ: M P with finite singularities on M such that the connection form σ*A satisfies the Coulomb equation d*(σ*A)=0 and admits a sharp estimate \|σ*A\|L4,∞(M) C(M,). Here L4,∞ is a new function space we introduce in this paper that satisfies L4(M)⊂neq L4,∞(M)⊂neq L4-ε(M) for all ε>0.