Partial spectral multipliers and partial Riesz transforms for degenerate operators

Abstract

We consider degenerate differential operators A = Σk,j=1d ∂k (akj ∂j) on L2(Rd) with real symmetric bounded measurable coefficients. Given a function ∈ Cb∞(Rd) (respectively, a bounded Lipschitz domain) and suppose that (akj) μ > 0 a.e.\ on (resp., a.e.\ on ). We prove a spectral multiplier type result: if F [0, ∞) C is such that t > 0 \| (.) F(t .) \|Cs < ∞ for some non-trivial function ∈ Cc∞(0,∞) and some s > d/2 then M F(I+A) M is weak type (1,1) (resp.\ P F(I+A) P is weak type (1,1)). We also prove boundedness on Lp for all p ∈ (1,2] of the partial Riesz transforms M ∇ (I + A)-1/2M . The proofs are based on a criterion for a singular integral operator to be weak type (1,1).