Litcius/Paper detail

Finite quasisimple groups acting on rationally connected threefolds

Jérémy Blanc, Ivan Cheltsov, Alexander Duncan, Yuri Prokhorov

2022Mathematical Proceedings of the Cambridge Philosophical Society12 citationsDOI

Abstract

Abstract We show that the only finite quasi-simple non-abelian groups that can faithfully act on rationally connected threefolds are the following groups: ${\mathfrak{A}}_5$ , ${\text{PSL}}_2(\textbf{F}_7)$ , ${\mathfrak{A}}_6$ , ${\text{SL}}_2(\textbf{F}_8)$ , ${\mathfrak{A}}_7$ , ${\text{PSp}}_4(\textbf{F}_3)$ , ${\text{SL}}_2(\textbf{F}_{7})$ , $2.{\mathfrak{A}}_5$ , $2.{\mathfrak{A}}_6$ , $3.{\mathfrak{A}}_6$ or $6.{\mathfrak{A}}_6$ . All of these groups with a possible exception of $2.{\mathfrak{A}}_6$ and $6.{\mathfrak{A}}_6$ indeed act on some rationally connected threefolds.

Topics & Concepts

Abelian groupCombinatoricsPSLSimply connected spacePhysicsMathematicsSimple (philosophy)Group (periodic table)Quantum mechanicsPhilosophyEpistemologyAlgebraic Geometry and Number TheoryFinite Group Theory ResearchAdvanced Algebra and Geometry
Finite quasisimple groups acting on rationally connected threefolds | Litcius