Cremona Groups and the Icosahedron

<p><strong>Cremona Groups and the Icosahedron</strong> focuses on the Cremona groups of ranks 2 and 3 and describes the beautiful appearances of the icosahedral group A5 in them. The book surveys known facts about surfaces with an action of A5 explores A5-equivariant geometry of the quintic del Pezzo threefold <i>V</i>5 and gives a proof of its A5-birational rigidity.</p><p>The authors explicitly describe many interesting A5-invariant subvarieties of <i>V</i>5 including A5-orbits low-degree curves invariant anticanonical <i>K</i>3 surfaces and a mildly singular surface of general type that is a degree five cover of the diagonal Clebsch cubic surface. They also present two birational selfmaps of <i>V</i>5 that commute with A5-action and use them to determine the whole group of A5-birational automorphisms. As a result of this study they produce three non-conjugate icosahedral subgroups in the Cremona group of rank 3 one of them arising from the threefold <i>V</i>5.</p><p>This book presents up-to-date tools for studying birational geometry of higher-dimensional varieties. In particular it provides readers with a deep understanding of the biregular and birational geometry of <i>V</i>5.</p>