Trace operator on von Koch's snowflake

Abstract

We study properties of the boundary trace operator on the Sobolev space W11(). Using the density result by Koskela and Zhang, we define a surjective operator Tr: W11(K)→ X(K), where K is von Koch's snowflake and X(K) is a trace space with the quotient norm. Since K is a uniform domain whose boundary is Ahlfors-regular with an exponent strictly bigger than one, it was shown by L. Mal\'y that there exists a right inverse to Tr, i.e. a linear operator S: X(K) → W11(K) such that Tr S= IdX(K). In this paper we provide a different, purely combinatorial proof based on geometrical structure of von Koch's snowflake. Moreover we identify the isomorphism class of the trace space as 1. As an additional consequence of our approach we obtain a simple proof of the Peetre's theorem about non-existence of the right inverse for domain with regular boundary, which explains Banach space geometry cause for this phenomenon.