On CR Paneitz operators and CR pluriharmonic functions

Abstract

Let (X,T1,0X) be a compact orientable embeddable three dimensional strongly pseudoconvex CR manifold and let P\, be the associated CR Paneitz operator. In this paper, we show that (I) P\, is self-adjoint and P\, has L2 closed range. Let N and be the associated partial inverse and the orthogonal projection onto Ker\, P\, respectively, then N and enjoy some regularity properties. (II) Let P and P0 be the space of L2 CR pluriharmonic functions and the space of real part of L2 global CR functions respectively. Let S be the associated Szeg\"o projection and let τ, τ0 be the orthogonal projections onto P and P0 respectively. Then, =S+ S+F0, τ=S+ S+F1, τ0=S+ S+F2, where F0, F1, F2 are smoothing operators on X. In particular, , τ and τ0 are Fourier integral operators with complex phases and P Ker\, P\,, P0P, P0 Ker\, P\, are all finite dimensional subspaces of C∞(X) (it is well-known that P0⊂P⊂ Ker\, P\,). (III) Spec\, P\, is a discrete subset of and for every λ∈ Spec\, P\,, λ≠0, λ is an eigenvalue of P\, and the associated eigenspace Hλ( P\,) is a finite dimensional subspace of C∞(X).