Endomorphisms of Artin groups of type D

Abstract

In this paper we determine a classification of the endomorphisms of the Artin group A [Dn] of type Dn for n 6. In particular we determine its automorphism group and its outer automorphism group. We also determine a classification of the homomorphisms from A[Dn] to the Artin group A [An-1] of type An-1 and a classification of the homomorphisms from A[An-1] to A[Dn] for n 6. We show that any endomorphism of the quotient A [Dn] / Z (A [Dn]) lifts to an endomorphism of A [Dn] for n 4. We deduce a classification of the endomorphisms of A [Dn] / Z (A [Dn]), we determine the automorphism and outer automorphism groups of A [Dn] / Z (A [Dn]), and we show that A [Dn] / Z (A [Dn]) is co-Hopfian, for n 6. The results are algebraic in nature but the proofs are based on topological arguments (curves on surfaces and mapping class groups).