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Filtered algebra : ウィキペディア英語版
Filtered algebra
In mathematics, a filtered algebra is a generalization of the notion of a graded algebra. Examples appear in many branches of mathematics, especially in homological algebra and representation theory.
A filtered algebra over the field k is an algebra (A,\cdot) over k which has an increasing sequence \ \subset F_0 \subset F_1 \subset \cdots \subset F_i \subset \cdots \subset A of subspaces of A such that
:A=\cup_,\qquad F_m\cdot F_n\subset F_.
==Associated graded algebra==
In general there is the following construction that produces a graded algebra out of a filtered algebra.
If A is a filtered algebra then the ''associated graded algebra'' \mathcal(A) is defined as follows: G_n\,,
where,
: G_0=F_0, and
: \forall n>0, \quad G_n=F_n/F_\,,
|2= the multiplication is defined by
: (x+F_)(y+F_)=x\cdot y+F_
for all x\in F_n and y\in F_m. (More precisely, the multiplication map \mathcal(A)\times \mathcal(A) \to \mathcal(A) is combined from the maps
: (F_n / F_) \times (F_m / F_) \to F_/F_, \ \ \ \ \ \left(x+F_,y+F_\right) \mapsto x\cdot y+F_
for all n\geq 0 and m\geq 0.)
}}
The multiplication is well defined and endows \mathcal(A) with the structure of a graded algebra, with gradation \_(A). Also if A is unital, such that the unit lies in F_0, then \mathcal(A) will be unital as well.
As algebras A and \mathcal(A) are distinct (with the exception of the trivial case that A is graded) but as vector spaces they are isomorphic.

抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)
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