Music and mathematics: Difference between revisions
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The '''Latimer–MacDuffee theorem''' is a [[theorem]] in [[abstract algebra]], a branch of [[mathematics]]. | |||
Let <math>f</math> be a [[monic polynomial|monic]], [[irreducible polynomial]] of degree <math>n</math>. The Latimer–MacDuffee theorem gives a one-to-one correspondence between <math>\mathbb{Z}</math>-[[matrix similarity|similarity classes]] of <math>n\times n</math> [[matrix (mathematics)|matrices]] with [[characteristic polynomial]] <math>f</math> and the [[ideal class]]es in the [[Order (ring theory)|order]] | |||
:<math>\mathbb{Z}[x]/(f(x)). \, </math> | |||
where ideals are considered equivalent if they are equal up to an overall (nonzero) rational scalar multiple. (Note that this order need not be the full ring of integers, so nonzero ideals need not be invertible.) Since an order in a number field has only finitely many ideal classes (even if it is not the maximal order, and we mean here ideals classes for all nonzero ideals, not just the invertible ones), it follows that there are only finitely many [[conjugacy class]]es of matrices over the integers with characteristic polynomial <math>f(x)</math>. | |||
==References== | |||
* [[Claiborne Latimer|Claiborne G. Latimer]] and [[Cyrus Colton MacDuffee|C. C. MacDuffee]], "A Correspondence Between Classes of Ideals and Classes of Matrices", ''[[Annals of Mathematics]]'', 1933. | |||
{{DEFAULTSORT:Latimer-MacDuffee theorem}} | |||
[[Category:Theorems in abstract algebra]] | |||
{{algebra-stub}} | |||
Revision as of 18:05, 23 January 2014
The Latimer–MacDuffee theorem is a theorem in abstract algebra, a branch of mathematics.
Let be a monic, irreducible polynomial of degree . The Latimer–MacDuffee theorem gives a one-to-one correspondence between -similarity classes of matrices with characteristic polynomial and the ideal classes in the order
where ideals are considered equivalent if they are equal up to an overall (nonzero) rational scalar multiple. (Note that this order need not be the full ring of integers, so nonzero ideals need not be invertible.) Since an order in a number field has only finitely many ideal classes (even if it is not the maximal order, and we mean here ideals classes for all nonzero ideals, not just the invertible ones), it follows that there are only finitely many conjugacy classes of matrices over the integers with characteristic polynomial .
References
- Claiborne G. Latimer and C. C. MacDuffee, "A Correspondence Between Classes of Ideals and Classes of Matrices", Annals of Mathematics, 1933.