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http://dx.doi.org/10.4134/BKMS.2005.42.1.157

SPACES OF CONJUGATION-EQUIVARIANT FULL HOLOMORPHIC MAPS  

KAMIYAMA, YASUHIKO (Department of Mathematics, University of the Ryukyus)
Publication Information
Bulletin of the Korean Mathematical Society / v.42, no.1, 2005 , pp. 157-164 More about this Journal
Abstract
Let $RRat_k$ ($CP^n$) denote the space of basepoint-preserving conjugation-equivariant holomorphic maps of degree k from $S^2$ to $CP^n$. A map f ; $S^2 {\to}CP^n$ is said to be full if its image does not lie in any proper projective subspace of $CP^n$. Let $RF_k(CP^n)$ denote the subspace of $RRat_k(CP^n)$ consisting offull maps. In this paper we determine $H{\ast}(RF_k(CP^2); Z/p)$ for all primes p.
Keywords
rational function; full map;
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