Harbourne, Schenck and Seceleanu's Conjecture
Abstract
In [HSS], Conjecture 5.5.2, Harbourne, Schenck and Seceleanu conjectured that, for r=6 and all r 8, the artinian ideal I=( 12,… ,lr+12)⊂ K[x1, … ,xr] generated by the square of r+1 general linear forms i fails the Weak Lefschetz property. This paper is entirely devoted to prove this Conjecture. It is worthwhile to point out that half of the Conjecture - namely, the case when the number of variables r is even - was already proved in [mmn], Theorem 6.1.
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