Meromorphic quotients for some holomorphic G-actions

Abstract

Using mainly tools from [B.13] and [B.15] we give a necessary and sufficient condition in order that a holomorphic action of a connected complex Lie group G on a reduced complex space X admits a strongly quasi-proper meromorphic quotient. We apply this characterization to obtain a result which assert that, when G = K.B \ with B a closed complex subgroup of G and K a real compact subgroup of G, the existence of a strongly quasi-proper meromorphic quotient for the B-action implies, assuming moreover that there exists a G-invariant Zariski open dense subset in X which is good for the B-action, the existence of a strongly quasi-proper meromorphic quotient for the G-action on X.