On Ziegler pairs of line arrangements: from non-existence to abundance
Abstract
We study Ziegler pairs of line arrangements from both numerical and homological perspectives. First, we show that for arrangements of d<9 lines the intersection lattice determines the exponent data considered here. Then we list six distinct Ziegler pair with d=10. In particular, we construct higher-degree examples with the same intersection lattice, the same minimal degree of a Jacobian relation, and the same Hilbert function of the Milnor algebra, but with different minimal graded free resolutions.
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