The Gieseker-Petri locus GP g is defined as the locus inside M g consisting of curves which violate the Gieseker-Petri Theorem. It is known that GP g has always some divisorial components and it has been conjectured that it is of pure codimension 1 inside M g We prove that this holds true for genus up to 13. © 2011 Springer Science+Business Media B.V.
Lelli-Chiesa, M. (2012). The Gieseker-Petri divisor in M g for g ≤ 13. GEOMETRIAE DEDICATA, 158(1), 149-165 [10.1007/s10711-011-9626-8].
The Gieseker-Petri divisor in M g for g ≤ 13
Lelli-Chiesa M.
2012-01-01
Abstract
The Gieseker-Petri locus GP g is defined as the locus inside M g consisting of curves which violate the Gieseker-Petri Theorem. It is known that GP g has always some divisorial components and it has been conjectured that it is of pure codimension 1 inside M g We prove that this holds true for genus up to 13. © 2011 Springer Science+Business Media B.V.File in questo prodotto:
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