arXiv:1210.8171 Abstract | arXiv Analytics

arXiv:1210.8171 [math.AG]Abstract References Reviews Resources

Curvilinear schemes and maximum rank of forms

Published 2012-10-30, updated 2015-07-06Version 2

We define the \emph{curvilinear rank} of a degree $d$ form $P$ in $n+1$ variables as the minimum length of a curvilinear scheme, contained in the $d$-th Veronese embedding of $\mathbb{P}^n$, whose span contains the projective class of $P$. Then, we give a bound for rank of any homogenous polynomial, in dependance on its curvilinear rank.

Comments: Changed Questions 2 and 3. More detailed proofs

Categories: math.AG

Keywords: curvilinear scheme, maximum rank, span contains, minimum length, curvilinear rank

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