Sobolev extensions over Cantor-cuspidal graphs
Abstract
For a continuous function f:R, define the corresponding graph by setting \[f := (x1, f(x1)) : x1∈R .\] In this paper, we study the Sobolev extension property for the upper and lower domains over the graph αc for αc(x1):=d(x1, C)α, where C is the classical ternary Cantor set in the unit interval and α∈(0, 1).
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