Talk:Hadamard's lemma

This article has not yet been rated on Wikipedia's content assessment scale.

Nullstellensatz

Latest comment: 11 years ago1 comment1 person in discussion

One direction to follow up on is possible ties to Hilbert's Nullstellensatz (weak version): a maximal ideal in the ring of polynomials in the variables ${\displaystyle x_{1},x_{2},\dotsc ,x_{n}}$  (over an algebraically closed field) has the form ${\displaystyle \langle x_{1}-a_{1},x_{2}-a_{2},\dotsc ,x_{n}-a_{n}\rangle }$ . This yields a conclusion similar to Haramard's lemma as follows. Let ${\displaystyle f}$  be a polynomial and ${\displaystyle a}$  an arbitrary point. Since ${\displaystyle f(x)-f(a)}$  has a zero at ${\displaystyle a}$ , the ideal it generates cannot be the whole polynomial ring, and hence ${\displaystyle f(x)-f(a)}$  must be contained in some maximal ideal ${\displaystyle \langle x_{1}-a_{1},x_{2}-a_{2},\dotsc ,x_{n}-a_{n}\rangle }$ . This is equivalent to there being polynomials ${\displaystyle g_{1},g_{2},\dotsc ,g_{n}}$  such that

${\displaystyle f(x)-f(a)=\sum _{i=1}^{n}(x_{i}-a_{i})g_{i}(x)}$  identically for all ${\displaystyle x}$ ,

which is the same relation as in the Hadamard lemma. 130.239.235.159 (talk) 17:03, 5 November 2012 (UTC)Reply