Sobolev spaces on p.c.f. self-similar sets: boundary behavior and interpolation theorems

Abstract

We study the Sobolev spaces Hσ(K) and Hσ0(K) on p.c.f. self-similar sets in terms of the boundary behavior of functions. First, for σ∈ R+, we make an exact description of the tangents of functions in Hσ(K) at the boundary. Second, we characterize H0σ(K) as the space of functions in Hσ(K) with zero tangent of an appropriate order depending on σ. Last, we extend Hσ(K) to σ∈R, and obtain various interpolation theorems with σ∈R+ or σ∈R. We illustrate that there is a countable set of critical orders, that arises naturally in the boundary behavior of functions, such that Hσ0(K) presents a critical phenomenon if σ is critical. These orders will play a crucial role in our study. They are just the values in 12+Z+ in the classical case, but are much more complicated in the fractal case.