Gr\"obner Bases for Increasing Sequences
Abstract
Let q,n ≥ 1 be integers, [q]=\1,…, q\, and F be a field with | F|≥ q. The set of increasing sequences I(n,q)=\(f1,f2, …, fn) ∈ [q]n:~ f1≤ f2≤·s ≤ fn \ can be mapped via an injective map i: [q]→ F into a subset J(n,q) of the affine space Fn. We describe reduced Gr\"obner bases, standard monomials and Hilbert function of the ideal of polynomials vanishing on J(n,q). As applications we give an interpolation basis for J(n,q), and lower bounds for the size of increasing Kakeya sets, increasing Nikodym sets, and for the size of affine hyperplane covers of J(n,q).
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