Cuspidal plane curves, syzygies and a bound on the MW-rank

Abstract

Let C=Z(f) be a reduced plane curve of degree 6k, with only nodes and ordinary cusps as singularities. Let I be the ideal of the points where C has a cusp. Let S(-bi) S(-ai) S S/I be a minimal resolution of I. We show that bi≤ 5k. From this we obtain that the Mordell-Weil rank of the elliptic threefold W:y2=x3+f equals 2#\i bi=5k\. Using this we find an upper bound for the Mordell-Weil rank of W, which is 1/18 (125+73-2302-10673)k+l.o.t. and we find an upper bound for the exponent of (t2-t+1) in the Alexander polynomial of C, which is 1/36(125+73-2302-10673)k+l.o.t.. This improves a recent bound of Cogolludo and Libgober almost by a factor 2.