Conditions for Generic Initial Ideals to be Almost Reverse Lexicographic

Abstract

Let I be a homogeneous Artinian ideal in a polynomial ring R=k[x1,...,xn] over a field k of characteristic 0. We study an equivalent condition for the generic initial ideal (I) with respect to reverse lexicographic order to be almost reverse lexicographic. As a result, we show that Moreno-Socias conjecture implies Fr\"oberg conjecture. And for the case I 3, we show that R/I has the strong Lefschetz property if and only if (I) is almost reverse lexicographic. Finally for a monomial complete intersection Artinian ideal I=(x1d1,...,xndn), we prove that (I) is almost reverse lexicographic if di > Σj=1i-1 dj - i + 1 for each i 4. Using this, we give a positive partial answer to Moreno-Socias conjecture, and to Fr\"oberg conjecture.