Subject: question for the toplist Date: Tue, 11 Feb 2003 21:04:02 +0000 (GMT) From: Andrey Lazarev It is well-known that any connected commutative differential graded algebra admits a minimal model. Around 1978 Neisendorfer and, perhaps, others showed that a connected differential graded Lie algebra also has a minimal model. It was conjectured then by Neisendorfer that a (not necessarily connected) dglie algebra admits a minimal model provided its homology Lie algebra is nilpotent. Does anyone know whether this conjecture has been proved since then? Andrey