On the module of derivations of a line arrangement
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To each multiple point $p$ in a line arrangement $ \mathcal A$ in the complex projective plane we associate a local derivation $\tilde D_p \in D_0( \mathcal A)$. We show first that these derivations span the graded module of derivations $D_0( \mathcal A)$ in all degrees $\geq d -3$, where $d$ is the number of lines in $ \mathcal A$, see Theorem 1.4 and Theorem 1.6. Then, to each local derivation $\tilde D_p \in D_0( \mathcal A)$ we associate a polynomial $g_p$ which seems to play a key role in the characterization of the freeness of $ \mathcal A$, see Theorem 1.10, as well as in the study of the position of the multiple points of $ \mathcal A$ with respect to unions of lines, see Corollary 1.13 and Conjecture 1.14. Corollary 1.9 gives a result of an independent interest, namely a lower bound for the maximal exponent of a plane curve having a line as an irreducible component.
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On Ziegler pairs of line arrangements: from non-existence to abundance
For d<9 line arrangements the intersection lattice determines the exponent data; six Ziegler pairs with d=10 share the same lattice, Jacobian degree and Milnor algebra Hilbert function but have different minimal grade...
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