Sobolev spaces and trace theorem on the Sierpinski gasket

Abstract

On the Sierpinski gasket SG, we consider Sobolev spaces L2σ(SG) associated with the standard Laplacian with order σ≥ 0. When σ∈Z+, L2σ(SG) consists of functions equipped with L2 norms of the function itself and its Laplacians up to σ order; when σ Z+, we fill up the gaps between integer orders by using complex interpolation. Let L2σ, D(SG)=(I-D)-σL2(SG) where D is the Dirichlet Laplacian associated with . Let \pn\n≥ 0 be a collection of countably many points located along one of the symmetrical axes of SG. We make a full characterization of the trace spaces of L2σ(SG) and L2σ,D(SG) to \pn\n≥ 0. Using this, we get a full description of the relationship between L2σ(SG) and L2σ,D(SG) for σ≥ 0. The result indicates that when σ- 325∈ Z+, L2σ, D(SG) is not closed in L2σ(SG) and has an infinite codimension. Otherwise, L2σ, D(SG) is closed in L2σ(SG) with a finite codimension. Similar result holds for the Neumann case. Another consequence of the trace result is that the Sobolev spaces L2σ(SG) are stable under complex interpolation for σ≥ 0 although they are defined by piecewise interpolation between integer orders.