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In mathematics, especially [[ring theory]], the class of '''Frobenius rings''' and their generalizations are the extension of work done on [[Frobenius algebra]]s.  Perhaps the most important generalization is that of '''quasi-Frobenius rings''' (QF rings), which are in turn generalized by right '''pseudo-Frobenius rings''' (PF rings) and right '''finitely pseudo-Frobenius rings''' (FPF rings). Other diverse generalizations of quasi-Frobenius rings include '''QF-1''', '''QF-2''' and '''QF-3''' rings.
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These types of rings can be viewed as descendants of algebras examined by [[Georg Frobenius]]. A partial list of pioneers in quasi-Frobenius rings includes [[Richard Brauer|R. Brauer]], [[Kiiti Morita|K. Morita]], [[Tadashi Nakayama (mathematician)|T. Nakayama]], [[Cecil J. Nesbitt|C. J. Nesbitt]], and [[Robert M. Thrall|R. M. Thrall]].
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==Definitions==
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For the sake of presentation, it will be easier to define quasi-Frobenius rings first. In the following characterizations of each type of ring, many properties of the ring will be revealed.


A ring ''R'' is '''quasi-Frobenius''' if and only if ''R'' satisfies any of the following equivalent conditions:
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# ''R'' is [[noetherian ring|Noetherian]] on one side and [[injective module#Self-injective rings|self-injective]] on one side.
# ''R'' is [[Artinian ring|Artinian]] on a side and self-injective on a side.
# All right (or all left) ''R'' modules which are [[projective module|projective]] are also [[injective module|injective]].
# All right (or all left) ''R'' modules which are injective are also projective.


A '''Frobenius ring''' ''R'' is one satisfying any of the following equivalent conditions.  Let ''J''=J(''R'') be the [[Jacobson radical]] of ''R''.
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# ''R'' is quasi-Frobenius and the [[Socle (mathematics)|socle]] <math>\mathrm{soc}(R_R)\cong R/J</math> as right ''R'' modules.
#''R'' is quasi-Frobenius and <math>\mathrm{soc}(_R R)\cong R/J</math> as left ''R'' modules.
# As right ''R'' modules <math>\mathrm{soc}(R_R)\cong R/J</math>, and as left ''R'' modules <math>\mathrm{soc}(_R R)\cong R/J</math>.


For a commutative ring ''R'', the following are equivalent:
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# ''R'' is Frobenius
# ''R'' is QF
# ''R'' is a finite direct sum of [[local ring|local]] artinian rings which have unique [[minimal ideal]]s.  (Such rings are examples of "zero-dimensional [[Gorenstein ring|Gorenstein local rings]]".)
 
A ring ''R'' is '''right pseudo-Frobenius''' if any of the following equivalent conditions are met:
# Every [[faithful module|faithful]] right ''R'' module is a [[generator (category theory)|generator]] for the category of right ''R'' modules.
# ''R'' is right self-injective and is a [[Injective cogenerator|cogenerator]] of Mod-''R''.
# ''R'' is right self-injective and is [[finitely generated module|finitely cogenerated]] as a right ''R'' module.
# ''R'' is right self-injective and a right [[Kasch ring]].
# ''R'' is right self-injective, [[semilocal ring|semilocal]] and the socle soc(''R''<sub>''R''</sub>) is an [[essential submodule]] of ''R''.
# ''R'' is a cogenerator of Mod-''R'' and is a left Kasch ring.
 
A ring ''R'' is '''right finitely pseudo-Frobenius''' if and only if every [[Finitely generated module|finitely generated]] faithful right ''R'' module is a generator of Mod-''R''.
 
==Thrall's QF-1,2,3 generalizations==
In the seminal article {{harv|Thrall|1948}}, R. M. Thrall focused on three specific properties of (finite dimensional) QF algebras and studied them in isolation.  With additional assumptions, these definitions can also be used to generalize QF rings.  A few other mathematicians pioneering these generalizations included [[Kiiti Morita|K. Morita]] and H. Tachikawa.
 
Following {{harv|Anderson|Fuller|1992}}, let ''R'' be a left or right Artinian ring:
*''R'' is QF-1 if all faithful left modules and faithful right modules are [[balanced module]]s. 
*''R'' is QF-2 if each indecomposable projective right module and each indecomposable projective left module has a unique minimal submodule. (I.e. they have simple socles.)
*''R'' is QF-3 if the [[injective hull]]s E(''R''<sub>''R''</sub>) and E(<sub>''R''</sub>''R'') are both projective modules.
 
The numbering scheme does not necessarily outline a hierarchy. Under more lax conditions, these three classes of rings may not contain each other.  Under the assumption that ''R'' is left or right Artinian however, QF-2 rings are QF-3.  There is even an example of a QF-1 and QF-3 ring which is not QF-2.
 
==Examples==
*Every Frobenius ''k'' algebra is a Frobenius ring.
*Every [[semisimple ring]] is clearly quasi-Frobenius, since all modules are projective and injective.  Even more is true however: semisimple rings are all Frobenius.  This is easily verified by the definition, since for semisimple rings <math>\mathrm{soc}(R_R)=\mathrm{soc}(_R R)=R</math> and ''J''&nbsp;=&nbsp;rad(''R'')&nbsp;=&nbsp;0.
*The [[quotient ring]] <math>\frac{ \mathbb{Z} }{ n \mathbb{Z} }</math> is QF for any positive integer ''n''>1.
*Commutative Artinian [[serial module|serial rings]] are all Frobenius, and in fact have the additional property that every quotient ring ''R''/''I'' is also Frobenius.  It turns out that among commutative Artinian rings, the serial rings are exactly the rings whose (nonzero) quotients are all  Frobenius.
*Many exotic PF and FPF rings can be found as examples in {{harv|Faith|1984}}
 
==See also==
*[[Quasi-Frobenius Lie algebra]]
 
==Notes==
The definitions for QF, PF and FPF are easily seen to be categorical properties, and so they are preserved by [[Morita equivalence]],  however being a Frobenius ring ''is not'' preserved.
 
For one-sided Noetherian rings the conditions of left or right PF both coincide with QF, but FPF rings are still distinct.
 
A finite dimensional algebra ''R'' over a field ''k'' is a Frobenius ''k''-algebra if and only if ''R'' is a Frobenius ring.
 
QF rings have the property that all of their modules can be embedded in a [[free module|free]] ''R'' module. This can be seen in the following way.  A module ''M'' embeds into its [[injective hull]] ''E''(''M''), which is now also projective.  As a projective module, ''E''(''M'') is a summand of a free module ''F'', and so ''E''(''M'') embeds in ''F'' with the inclusion map.  By composing these two maps, ''M'' is embedded in ''F''.
 
==Textbooks==
*{{Citation | last1=Anderson | first1=Frank Wylie | last2=Fuller | first2=Kent R | title=Rings and Categories of Modules | url=http://books.google.com/?id=PswhrD_wUIkC  | publisher=[[Springer-Verlag]] | location=Berlin, New York | isbn=978-0-387-97845-1 | year=1992}}
*{{Citation | last1=Faith| first1=Carl| last2=Page| first2=Stanley  | title=FPF Ring Theory: Faithful modules and generators of Mod-$R$| publisher=Cambridge University Press | series=London Mathematical Society Lecture Note Series No. 88 | isbn=0-521-27738-8 | id={{MathSciNet|id=0754181}} | year=1984}}
*{{Citation | last1=Lam | first1=Tsit-Yuen | title=Lectures on modules and rings | publisher=[[Springer-Verlag]] | location=Berlin, New York | series=Graduate Texts in Mathematics No. 189 | isbn=978-0-387-98428-5 | id={{MathSciNet|id=1653294}} | year=1999}}
*{{Citation | last1=Nicholson | first1=W. K. | last2=Yousif | first2=M. F. | title=Quasi-Frobenius rings |  publisher=Cambridge University Press | isbn=0-521-81593-2
| year=2003}}
 
==References==
 
For QF-1, QF-2, QF-3 rings:
*{{citation
  |author=Morita, Kiiti
  |title=On algebras for which every faithful representation is its own second commutator
  |journal=Math. Z.
  |volume=69
  |year=1958
  |pages=429–434
  |issn=0025-5874
  }}
*{{citation
  |author=Ringel, Claus Michael
  |author=Tachikawa, Hiroyuki
  |title=${\rm QF}-3$ rings
  |journal=J. Reine Angew. Math.
  |volume=272
  |year=1974
  |pages=49–72
  |issn=0075-4102
  }}
*{{citation
  |author=Thrall, R. M.
  |title=Some generalization of quasi-Frobenius algebras
  |journal=Trans. Amer. Math. Soc.
  |volume=64
  |year=1948
  |pages=173–183
  |issn=0002-9947
  }}
 
[[Category:Module theory]]
[[Category:Ring theory]]

Latest revision as of 00:39, 14 March 2014

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Also, take your time!! This is often a important phase while typically need to twist up. The main aspect is employing the best prepare touch to suit your submission. During event, this tool involved an appropriate 10 mins in order to prepare through simple sink (perhaps your 1/4" fullness) and also the touch is completely worthless once I got through the surface. This basically means, I just managed to get. In addition, should not worried to get an vision eye dropper or even tacker shed drinking water within the ditch because you're boring.
It may help the particular bit not to spend thus smooth. As soon as the gap is in fact drilled to your enjoying, observe the example regarding collecting each appliance considering the touch and additionally initiate this tool.	 	I did some researching and also have always been pleased I gathered this product. The system put in at home to setup; really the only confusing character is literally affixing some of the tap since it is hidden right behind some of the nonsense disposer.
(I lent its own wrench after a associate that fixed the challenge). The most significant object is the fact my wife (who is fairly particular pertaining to a h2o) thinks the inclinations stunning. Furthermore- looks like a great organization (e.e. socially trustworthy) that manufactures in the United States Of America (the product is potentially done). In order to make issues better, most of us use  gold watches to come with a service exchange the exact filter systems with the older technique and additionally nowadays we are able to change it out yourself at a significant cost savings.

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