An integer sequence and standard monomials

Abstract: For an (oriented) graph [Formula: see text] on the vertex set [Formula: see text] (rooted at [Formula: see text]), Postnikov and Shapiro (Trans. Amer. Math. Soc. 356 (2004) 3109–3142) associated a monomial ideal [Formula: see text] in the polynomial ring [Formula: see text] over a field [Formula: see text] such that the number of standard monomials of [Formula: see text] equals the number of (oriented) spanning trees of [Formula: see text] and hence, [Formula: see text], where [Formula: see text] is the trunca… Show more

“…S of I S is an order monomial ideal for S = S n (132, 231), S n (123, 132) and S n (123, 132, 213) (see [7,8]). The minimal generators of I W (u) [un+c−1] correspond to elements of poset Σ n .…”

“…for S = S n (132, 231), S n (123, 132) and S n (123, 132, 213) are give in [7,8]. In this section, the monomial ideal I S and its Alexander dual I…”

“…[n] S for subsets S = S n (132, 231), S n (123, 132) and S n (123, 132, 213) are obtained in [7,8] Let W = S n (132, 312). The monomial ideal I W of R is called a hypercubic ideal in [6].…”

Integer Sequences and Monomial Ideals

“…S of I S is an order monomial ideal for S = S n (132, 231), S n (123, 132) and S n (123, 132, 213) (see [7,8]). The minimal generators of I W (u) [un+c−1] correspond to elements of poset Σ n .…”

“…for S = S n (132, 231), S n (123, 132) and S n (123, 132, 213) are give in [7,8]. In this section, the monomial ideal I S and its Alexander dual I…”

“…[n] S for subsets S = S n (132, 231), S n (123, 132) and S n (123, 132, 213) are obtained in [7,8] Let W = S n (132, 312). The monomial ideal I W of R is called a hypercubic ideal in [6].…”

Integer Sequences and Monomial Ideals

Integer sequences and monomial ideals