Rigidity of maps between configuration spaces

Abstract

Let n≥5 and m≥3. Let Φnm be a homomorphism of braid groups. We prove that if the image of Φ is irreducible and not cyclic, then m=n and Φ agrees with an automorphism modulo the center Z(Bm). This resolves in the affirmative a conjecture of Chen, Kordek, and Margalit. It also provides a partial resolution to a problem on the K3 problem list. As a consequence, we prove that every holomorphic map UConfn(C)m(C) for n≥5 and m≥3 is affine equivalent to either a constant map or the identity map. This resolves a conjecture of Farb for n≠4.

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