Citations:vanishing ideal

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• 1985, Ernst Kunz, Introduction to Commutative Algebra and Algebraic Geometry, Springer Science & Business Media (Template:ISBN), page 33:

  Under the hypotheses made in 5.1, just as in the affine case for a nonempty projective K-variety ${\displaystyle V\subset P^n(L)}$ we define the vanishing ideal ${\displaystyle \Im (V)\subset K[X_0,...,X_n]}$ as the set of all polynomials that vanish at all points of V.

• 2013, Grigoriy Blekherman, Pablo A. Parrilo, Rekha R. Thomas, Semidefinite Optimization and Convex Algebraic Geometry, SIAM (Template:ISBN), page 465:

  Given a variety ${\displaystyle W\subset k^n}$, its vanishing ideal,
  ${\displaystyle I(W):=\{f\in k[x]:f(p)=0\text{ for all }p\in W\}}$
  is the set of all polynomials in ${\displaystyle k[x]}$ that vanish on W. Check that ${\displaystyle I\subseteq I(V_k(I))}$ and that ${\displaystyle V_k(I(V_k(I)))=V_k(I)}$.

• 2013, Wolfram Decker, Gerhard Pfister, A First Course in Computational Algebraic Geometry, Cambridge University Press (Template:ISBN), page 19:

  Our next step in relating algebraic sets to ideals is to define some kind of inverse to the map V:
  Definition 1.16 If ${\displaystyle A\subset {𝔸}^n(K)}$ is any subset, the ideal
  ${\displaystyle I(A):=\{f\in K[x_1,...,x_n]|f(p)=0\text{ for all }p\in A\}}$ is called the vanishing ideal of A.