Carleman Approximation of Maps into Oka Manifolds

Abstract

In this paper we obtain a Carleman approximation theorem for maps from Stein manifolds to Oka manifolds. More precisely, we show that under suitable complex analytic conditions on a totally real set M of a Stein manifold X, every smooth map X → Y to an Oka manifold Y satisfying the Cauchy-Riemann equations along M up to order k can be Ck -Carleman approximated by holomorphic maps X → Y . Moreover, if K is a compact O(X) -convex set such that K M is O(X) -convex, then we can Ck -Carleman approximate maps which satisfy the Cauchy-Riemann equations up to order k along M and are holomorphic on a neighbourhood of K , or merely in the interior of K if the latter set is the closure of a strongly pseudoconvex domain.