Parameter dependence of solutions of the Cauchy-Riemann equation on spaces of weighted smooth functions

Abstract

We study the inhomogeneous Cauchy-Riemann equation on spaces EV(,E) of weighted C∞-smooth E-valued functions on an open set ⊂R2 whose growth on strips along the real axis is determined by a family of continuous weights V where E is a locally convex Hausdorff space over C. We derive sufficient conditions on the weights V such that the kernel ker∂ of the Cauchy-Riemann operator ∂ in EV():=EV(,C) has the property () of Vogt. Then we use previous results and conditions on the surjectivity of the Cauchy-Riemann operator ∂()() and the splitting theory of Vogt for Fr\'echet spaces and of Bonet and Doma\'nski for (PLS)-spaces to deduce the surjectivity of the Cauchy-Riemann operator on the space EV(,E) if E:=Fb' where F is a Fr\'echet space satisfying the condition (DN) or if E is an ultrabornological (PLS)-space having the property (PA). As a consequence, for every family of right-hand sides (fλ)λ∈ U in EV() which depends smoothly, holomorphically or distributionally on a parameter λ there is a family (uλ)λ∈ U in EV() with the same kind of parameter dependence which solves the Cauchy-Riemann equation ∂uλ=fλ for all λ∈ U.