On q-Runge domains

Abstract

In [2], Coltoiu gave an example of a domain D⊂6 which is 4-complete such that for every F∈ Coh(6) the restriction map H3(6,F) H3(D,F) has a dense image but D is not 4-Runge in 6. Here, we prove that for every integers n≥ 4 and 1≤ q≤ n there exists a domain D⊂ n which is not (q-1)-Runge in n but such that for any coherent analytic sheaf F on n the restriction map Hp(n,F) H3(D,F) has a dense image for all p≥ q-2 if q does not divide n, where q=n-[nq]+1 and [nq] denotes the integral part of nq.