Keiji Oguiso
Published 2012-06-08, updated 2013-03-06Version 3
We prove that the automorphism group of an odd dimensional Calabi-Yau manifold of Picard number two is always a finite group. This makes a sharp contrast to the automorphism groups of K3 surfaces and hyperk\"ahler manifolds and birational automorphism groups, as we shall see. We also clarify the relation between finiteness of the automorphism group (resp. birational automorphism group) and the rationality of the nef cone (resp. movable cone) for a hyperk\"ahler manifold of Picard number two. We will also discuss a similar conjectual relation together with exsistence of rational curve, expected by the cone conjecture, for a Calabi-Yau threefold of Picard number two,
Comments: 17 printed pages, dedication is added, Proposition(5.1) due to the referee is added, The first part of proof of Proposition (6.1) is corrected and several typos are corrected
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