Limiting behaviour of intrinsic semi-norms in fractional order Sobolev spaces

Abstract

We collect and extend results on the limit of σ1-k(1-σ)k |v|l+σ,p,p as σ tends to 0+ or 1-, where is Rn or a smooth bounded domain, k is 0 or 1, l is a nonnegative integer, p∈[1,∞), and |.|l+σ,p, is the intrinsic semi-norm of order l+σ in the Sobolev space Wl+σ,p(). In general, the above limit is equal to c[v]p, where c and [.] are, respectively, a constant and a semi-norm that we explicitly provide. The particular case p=2 for =Rn is also examined and the results are then proved by using the Fourier transform.