Plane Cremona maps: Saturation and regularity of the base ideal

Abstract: One studies plane Cremona maps by focusing on the ideal theoretic and homological properties of its homogeneous base ideal ("indeterminacy locus"). The leitmotiv driving a good deal of the work is the relation between the base ideal and its saturation. As a preliminary one deals with the homological features of arbitrary codimension 2 homogeneous ideals in a polynomial ring in three variables over a field which are generated by three forms of the same degree. The results become sharp when the saturation is not… Show more

“…The self duality of the graded S-module N(f ), see [22,30,34], and the Lefschetz type property mentioned above imply that n(f ) s = 0 exactly for s = σ(C), ..., T − σ(C). In other words, for a reduced curve C : f = 0, one has (1.5) indeg(N(f )) = σ(C) and end(N(f )) = T − σ(C).…”

“…in the notation from [22]. We set as in [1,7] ν(C) = max j {n(f ) j }, and introduce a new invariant for C, namely σ(C) = min{j : n(f ) j = 0}.…”

Saturation of Jacobian ideals: Some applications to nearly free curves, line arrangements and rational cuspidal plane curves

“…The self duality of the graded S-module N(f ), see [22,30,34], and the Lefschetz type property mentioned above imply that n(f ) s = 0 exactly for s = σ(C), ..., T − σ(C). In other words, for a reduced curve C : f = 0, one has (1.5) indeg(N(f )) = σ(C) and end(N(f )) = T − σ(C).…”

“…in the notation from [22]. We set as in [1,7] ν(C) = max j {n(f ) j }, and introduce a new invariant for C, namely σ(C) = min{j : n(f ) j = 0}.…”

Saturation of Jacobian ideals: Some applications to nearly free curves, line arrangements and rational cuspidal plane curves

“…for j = 1, ..., m − 2 and some integers ǫ j ≥ 1. Using the same approach as for the proof of Proposition 2.1, namely that one must have m(f ) k = τ (C) for all large k, or even better using [22,Formula (13)], it follows that one has (2.5)…”

“…Use [10, Theorem 1.2], with the remark that the equality in (1) We also consider the invariant σ(C) = min{j : n(f ) j = 0} = indeg(N(f )), in the notation from [22]. The self duality of the graded S-module N(f ), see [22,27,31], implies that 3d), where the leftmost map is the same as in the resolution (2.1). In particular,…”

“…Assume now that m > 3 and consider the resolution of N(f ) obtained from the resolution (2.3) by applying [22,Proposition 1.3], namely the resolution 3(d−1)).…”

Plane curves with three syzygies, minimal Tjurina curves, and nearly cuspidal curves

Deformations of plane curves and Jacobian syzygies