binomial edge ideals and rational normal scrolls
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abstract
let $x=left( begin{array}{llll} x_1 & ldots & x_{n-1}& x_n x_2& ldots & x_n & x_{n+1} end{array}right)$ be the hankel matrix of size $2times n$ and let $g$ be a closed graph on the vertex set $[n].$ we study the binomial ideal $i_gsubset k[x_1,ldots,x_{n+1}]$ which is generated by all the $2$-minors of $x$ which correspond to the edges of $g.$ we show that $i_g$ is cohen-macaulay. we find the minimal primes of $i_g$ and show that $i_g$ is a set theoretical complete intersection. moreover, a sharp upper bound for the regularity of $i_g$ is given.
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Journal title:
bulletin of the iranian mathematical societyPublisher: iranian mathematical society (ims)
ISSN 1017-060X
volume 41
issue 4 2015
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