Anisotropic Shubin operators and eigenfunctions expansions in Gelfand-Shilov spaces

Abstract

We derive new results on the characterization of Gelfand--Shilov spaces Sμ (n), μ, >0, μ+ ≥ 1 by Gevrey estimates of the L2 norms of iterates of (m,k) anisotropic globally elliptic Shubin (or ) type operators, (-)m/2 +| x |k with m,k∈ 2 being a model operator, and on the decay of the Fourier coefficients in the related eigenfunction expansions. Similar results are obtained for the spaces μ (n), μ, >0, μ+ > 1, cf. GSdef. In contrast to the symmetric case μ = and k=m (classical Shubin operators) we encounter resonance type phenomena involving the ratio :=μ/; namely we obtain a characterization of Sμ(n) and μ(n) in the case μ=kt/(k+m), = mt/(k+m), t ≥ 1, that is, when =k/m ∈ .