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i have just started to learn some algebraic geometry and there is a statement in the notes i am following that i do not understand: "Subvector spaces of $\mathbb{A}^n$ are algebraic sets. They are of the form $Z(f_1,\ldots,f_n)$ where $f_i$ are polynomials of degree 1." (from notes by Lothar Goettsche: http://users.ictp.it/~gottsche/)

My problem with this statement is the following: For every point $a =(a_1,\ldots, a_n)$ in $A^n$ i can give a set $S$ of polynomials such that their common zero set ist $\{a\}$: $S = \{x_1-a_1, \ldots, x_n - a_n\}$. But how can i find a set of polynomials that vanishes on a whole vector space ? Of course one can take the zero polynomial, but that would not be of degree one ?

Thank you for advice

readingframe

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    I thought affine space wasn't equipped with a vector space structure? The definition I'm used to is that $\mathbb A_k^n = k^n $ as sets, and that the structure we place on $\mathbb A_k^n $ is a topological one and, in particular, there is no 'distinguished point' i.e. no origin.2012-03-09

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A sub vector space is an intersection of hyperplanes. Every hyperplane is the zero set of a linear form (hence a polynomial of degree 1). The common zero set of all these linear forms (which by definition is an algebraic set) is you sub vector space.

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    @readingframe: oui.2012-03-09