Weierstrass preparation theorem: Difference between revisions

Revision as of 11:42, 21 December 2008

In algebra, the Weierstrass preparation theorem describes a canonical form for formal power series over a complete local ring.

Let O be a complete local ring and f a formal power series in O''X''. Then f can be written uniquely in the form

f=(X^{n}+b_{n-1}X^{n-1}+\cdots +b_{0})u(x),\,

where the b_i are in the maximal ideal m of O and u is a unit of O''X''.

The integer n defined by the theorem is the Weierstrass degree of f.

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	In [[algebra]], the '''Weierstrass preparation theorem''' ~~described~~ a canonical form for [[formal power series]] over a [[complete local ring]].		In [[algebra]], the '''Weierstrass preparation theorem''' describes a canonical form for [[formal power series]] over a [[complete local ring]].

	Let ''O'' be a complete local ring and ''f'' a formal power series in ''O''[[''X'']]. Then ''f'' can be written uniquely in the form		Let ''O'' be a complete local ring and ''f'' a formal power series in ''O''[[''X'']]. Then ''f'' can be written uniquely in the form