Ascending chain condition

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(Redirected from Descending chain condition)

The ascending chain condition (ACC) and descending chain condition (DCC) are finiteness properties satisfied by certain algebraic structures, most importantly, ideals in a commutative ring. These conditions played an important role in the development of the structure theory of commutative rings in the works of David Hilbert, Emmy Noether, and Emil Artin. The conditions themselves can be stated in an abstract form, so that they make sense for any partially ordered set. This point of view is useful in abstract algebraic dimension theory due to Gabriel and Rentschler.

[edit] Definition

A partially ordered set (poset) P is said to satisfy the ascending chain condition (ACC) if every ascending chain of elements eventually stabilizes. That is, given any sequence of elements of P

$a_1 \,\leq\, a_2 \,\leq\, a_3 \,\leq\, \cdots,$

there exists a positive integer n such that

$a_n = a_{n+1} = a_{n+2} = \cdots.$

Similarly, P is said to satisfy the descending chain condition (DCC) if every descending chain

$\cdots \,\leq\, a_3 \,\leq\, a_2 \,\leq\, a_1$

of elements of P is eventually stabilizes (that is, there is no infinite descending chain).

[edit] Comments

A subtly different and stronger condition than "containing no infinite ascending/descending chains" is "contains no arbitrarily long ascending/descending chains (optionally, 'based at a given element')". For instance, the disjoint union of the posets {0}, {0,1}, {0,1,2}, etc., satisfies both the ACC and the DCC, but has arbitrarily long chains. If one further identifies the 0 in all of these sets, then every chain is finite, but there are arbitrarily long chains based at 0.

The descending chain condition on P is equivalent to P being well-founded: every nonempty subset of P has a minimal element (also called the minimal condition).

Similarly, the ascending chain condition is equivalent to P being converse well-founded: every nonempty subset of P has a maximal element (the maximal condition).

Every finite poset satisfies both ACC and DCC.

A totally ordered set that satisfies the descending chain condition is called a well-ordered set.

[edit] See also

[edit] References

Atiyah, M. F., and I. G. MacDonald, Introduction to Commutative Algebra, Perseus Books, 1969, ISBN 0-201-00361-9

Ascending chain condition

From Wikipedia, the free encyclopedia

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[edit] Definition

[edit] Comments

[edit] See also

[edit] References

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