Hyperplane arrangements with non-formal Milnor fibers
Abstract
Each complex hyperplane arrangement A gives rise to a Milnor fibration of its complement. Building on work of Zuber, we give a combinatorial sufficient condition for the Milnor fiber F(A) to be non-1-formal, expressed in terms of the multinet structure on A, and use it to produce an infinite family of monomial arrangements A(3k,3k,3) with non-formal Milnor fibers. We also review the relevant background on cohomology jump loci, formality, and the topology of Milnor fibers of arrangements.
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