Jumps in Besov spaces and fine properties of Besov and fractional Sobolev functions

Abstract

In this paper we analyse functions in Besov spaces B1/qq,∞(RN,Rd),q∈ (1,∞), and functions in fractional Sobolev spaces Wr,q(RN,Rd),r∈ (0,1),q∈ [1,∞). We prove for Besov functions u∈ B1/qq,∞(RN,Rd) the summability of the difference between one-sided approximate limits in power q, |u+-u-|q, along the jump set Ju of u with respect to Hausdorff measure HN-1, and establish the best bound from above on the integral ∫Ju|u+-u-|qdHN-1 in terms of Besov constants. We show for functions u∈ B1/qq,∞(RN,Rd),q∈ (1,∞) that equation 0+B(x) |u(z)-uB(x)|qdz=0 equation for every x outside of a HN-1-sigma finite set. For fractional Sobolev functions u∈ Wr,q(RN,Rd) we prove that equation 0+B(x)B(x) |u(z)-u(y)|qdzdy=0 equation for HN-rq a.e. x, where q∈[1,∞), r∈(0,1) and rq≤ N. We prove for u∈ W1,q(RN),1<q≤ N, that equation 0+B(x) |u(z)-uB(x)|qdz=0 equation for HN-q a.e. x∈ RN.