Reproducing Kernels of Sobolev Spaces on Rd and Applications to Embedding Constants and Tractability

Abstract

The standard Sobolev space Ws2(Rd), with arbitrary positive integers s and d for which s>d/2, has the reproducing kernel Kd,s(x,t)=∫RdΠj=1d(2π\,(xj-tj)uj) 1+Σ0<|α|1 sΠj=1d(2π\,uj)2αj\, du for all x,t∈Rd, where xj,tj,uj,αj are components of d-variate x,t,u,α, and |α|1=Σj=1dαj with non-negative integers αj. We obtain a more explicit form for the reproducing kernel K1,s and find a closed form for the kernel Kd, ∞. Knowing the form of Kd,s, we present applications on the best embedding constants between the Sobolev space Ws2(Rd) and L∞(Rd), and on strong polynomial tractability of integration with an arbitrary probability density. We prove that the best embedding constants are exponentially small in d, whereas worst case integration errors of algorithms using n function values are also exponentially small in d and decay at least like n-1/2. This yields strong polynomial tractability in the worst case setting for the absolute error criterion.