Traces of Besov spaces to regular subsets of metric measure spaces: the limiting case

Abstract

Let (X,d,μ) be a metric measure space whose measure μ is uniformly locally doubling and which supports a local weak (1,p)-Poincaré inequality for some p∈[1,∞). Given θ∈(0,p) and an Ahlfors--David codimension-θ regular subset E⊂ X, we provide a complete intrinsic description of the trace-space of the Besov space Bθ/pp,1(X) to E. More precisely, we show that the trace operator is well defined and bounded from Bθ/pp,1(X) to Lp(E, HθE). We also show that the upper estimate in the Ahlfors--David codimension-θ regularity condition is necessary for such boundedness under the local weak Poincaré inequality. Conversely, assuming that E is Ahlfors--David codimension-θ regular, we construct a bounded nonlinear extension operator from Lp(E, HθE) to Bθ/pp,1(X). Thus the trace-space is identified intrinsically with Lp(E, HθE). This extends the classical limiting case of the trace theorem obtained by Burenkov and Gol'dman. Finally, we apply the general theory to K-regular trees, K 1, for which we additionally derive a necessary and sufficient criterion for the existence of traces.