A minimal resolution for the Jacobian ideal of a generic curve arrangement
Abstract
We consider a nodal curve C in the complex projective plane whose irreducible components Ci are smooth. A minimal set of generators G for the first and second syzygy modules of the Jacobian ideal of C are described, using recent results by Th. Kahle, H. Schenck, B. Sturmfels and M. Wiesmann on the likelihood correspondence. The elements of G have explicit formulas in terms of the equations fi=0 of the irreducible components Ci of C. Similar results, including extensions to hypersurfaces arrangements in Pn were obtained by R. Burity, Z. Ramos, A. Simis and St. Toh aneanu with a genericity assumption which may not be easy to test in practice.
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