Range decreasing group homomorphisms and holomorphic maps between generalized loop spaces
Abstract
Let resp. be a positive dimensional Lie group resp. connected complex manifold without boundary and a finite dimensional compact connected manifold, possibly with boundary. Fix a smoothness class , H\"older or Sobolev . The space resp. of all maps resp. is a Banach/Fr\'echet Lie group resp. complex manifold. Let resp. be the component of resp. containing the identity resp. constants. A map from a domain to is called range decreasing if , . We prove that if , then any range decreasing group homomorphism is the pullback by a map . We also provide several sufficient conditions for a range decreasing holomorphic map to be a pullback operator. Then we apply these results to study certain decomposition of holomorphic maps . In particular, we identify some classes of holomorphic maps , including all automorphisms of .
Cite
@article{arxiv.2102.06157,
title = {Range decreasing group homomorphisms and holomorphic maps between generalized loop spaces},
author = {Ning Zhang},
journal= {arXiv preprint arXiv:2102.06157},
year = {2022}
}
Comments
26 pages