Lie group structures on groups of smooth and holomorphic maps on non-compact manifolds

We study Lie group structures on groups of the form C(infinity)(M, K), where M is a non-compact smooth manifold and K is a, possibly infinite-dimensional, Lie group. First we prove that there is at most one Lie group structure with Lie algebra C(infinity)(M, t) for which the evaluation map is smooth. We then prove the existence of such a structure if the universal cover of K is diffeomorphic to a locally convex space and if the image of the left logarithmic derivative in Omega(1) (M, t) is a smooth submanifold, the latter being the case in particular if M is one-dimensional. We also obtain analogs of these results for the group O(M, K) of holomorphic maps on a complex manifold with values in a complex Lie group K. We further show that there exists a natural Lie group structure on O(M, K) if K is Banach and M is a non-compact complex curve with finitely generated fundamental group.