What algebraic structure does the set of endomorphisms of a ring have?

The name of the pictureThe name of the pictureThe name of the pictureClash Royale CLAN TAG#URR8PPP












3












$begingroup$


Let $R$ be a ring, and let $End(R)$ be the set of ring endomorphisms of $R$, i.e. the set of all ring homomorphisms form $R$ to $R$. Then we can define three binary operations on $End(R)$:




  1. $+$, defined by $(f+g)(x)=f(x)+g(x)$


  2. $cdot$, defined by $(fcdot g)(x)=f(g(x))$


  3. $*$, defiend by $(f*g)(x)=f(x)g(x)$

Now $(End(R),+,cdot)$ is a ring, being a subring of the endomorphism ring of the abelian group $(R,+)$. But my question is, what is the algebraic structure of $(End(R),+,cdot,*)$? Does this beast with three binary operations have a name?



Also, what algebraic structure does $(End(R),+,*)$ have? Is that also a ring?










share|cite|improve this question









$endgroup$







  • 1




    $begingroup$
    en.wikipedia.org/wiki/Composition_ring
    $endgroup$
    – Chris Culter
    Jan 15 at 20:56






  • 1




    $begingroup$
    @ChrisCulter Thanks, I guess that's the notion I was groping towards. I just posted a follow-up question: math.stackexchange.com/q/3075029/71829
    $endgroup$
    – Keshav Srinivasan
    Jan 15 at 21:56















3












$begingroup$


Let $R$ be a ring, and let $End(R)$ be the set of ring endomorphisms of $R$, i.e. the set of all ring homomorphisms form $R$ to $R$. Then we can define three binary operations on $End(R)$:




  1. $+$, defined by $(f+g)(x)=f(x)+g(x)$


  2. $cdot$, defined by $(fcdot g)(x)=f(g(x))$


  3. $*$, defiend by $(f*g)(x)=f(x)g(x)$

Now $(End(R),+,cdot)$ is a ring, being a subring of the endomorphism ring of the abelian group $(R,+)$. But my question is, what is the algebraic structure of $(End(R),+,cdot,*)$? Does this beast with three binary operations have a name?



Also, what algebraic structure does $(End(R),+,*)$ have? Is that also a ring?










share|cite|improve this question









$endgroup$







  • 1




    $begingroup$
    en.wikipedia.org/wiki/Composition_ring
    $endgroup$
    – Chris Culter
    Jan 15 at 20:56






  • 1




    $begingroup$
    @ChrisCulter Thanks, I guess that's the notion I was groping towards. I just posted a follow-up question: math.stackexchange.com/q/3075029/71829
    $endgroup$
    – Keshav Srinivasan
    Jan 15 at 21:56













3












3








3





$begingroup$


Let $R$ be a ring, and let $End(R)$ be the set of ring endomorphisms of $R$, i.e. the set of all ring homomorphisms form $R$ to $R$. Then we can define three binary operations on $End(R)$:




  1. $+$, defined by $(f+g)(x)=f(x)+g(x)$


  2. $cdot$, defined by $(fcdot g)(x)=f(g(x))$


  3. $*$, defiend by $(f*g)(x)=f(x)g(x)$

Now $(End(R),+,cdot)$ is a ring, being a subring of the endomorphism ring of the abelian group $(R,+)$. But my question is, what is the algebraic structure of $(End(R),+,cdot,*)$? Does this beast with three binary operations have a name?



Also, what algebraic structure does $(End(R),+,*)$ have? Is that also a ring?










share|cite|improve this question









$endgroup$




Let $R$ be a ring, and let $End(R)$ be the set of ring endomorphisms of $R$, i.e. the set of all ring homomorphisms form $R$ to $R$. Then we can define three binary operations on $End(R)$:




  1. $+$, defined by $(f+g)(x)=f(x)+g(x)$


  2. $cdot$, defined by $(fcdot g)(x)=f(g(x))$


  3. $*$, defiend by $(f*g)(x)=f(x)g(x)$

Now $(End(R),+,cdot)$ is a ring, being a subring of the endomorphism ring of the abelian group $(R,+)$. But my question is, what is the algebraic structure of $(End(R),+,cdot,*)$? Does this beast with three binary operations have a name?



Also, what algebraic structure does $(End(R),+,*)$ have? Is that also a ring?







abstract-algebra ring-theory modules terminology ring-homomorphism






share|cite|improve this question













share|cite|improve this question











share|cite|improve this question




share|cite|improve this question










asked Jan 15 at 20:54









Keshav SrinivasanKeshav Srinivasan

2,10311443




2,10311443







  • 1




    $begingroup$
    en.wikipedia.org/wiki/Composition_ring
    $endgroup$
    – Chris Culter
    Jan 15 at 20:56






  • 1




    $begingroup$
    @ChrisCulter Thanks, I guess that's the notion I was groping towards. I just posted a follow-up question: math.stackexchange.com/q/3075029/71829
    $endgroup$
    – Keshav Srinivasan
    Jan 15 at 21:56












  • 1




    $begingroup$
    en.wikipedia.org/wiki/Composition_ring
    $endgroup$
    – Chris Culter
    Jan 15 at 20:56






  • 1




    $begingroup$
    @ChrisCulter Thanks, I guess that's the notion I was groping towards. I just posted a follow-up question: math.stackexchange.com/q/3075029/71829
    $endgroup$
    – Keshav Srinivasan
    Jan 15 at 21:56







1




1




$begingroup$
en.wikipedia.org/wiki/Composition_ring
$endgroup$
– Chris Culter
Jan 15 at 20:56




$begingroup$
en.wikipedia.org/wiki/Composition_ring
$endgroup$
– Chris Culter
Jan 15 at 20:56




1




1




$begingroup$
@ChrisCulter Thanks, I guess that's the notion I was groping towards. I just posted a follow-up question: math.stackexchange.com/q/3075029/71829
$endgroup$
– Keshav Srinivasan
Jan 15 at 21:56




$begingroup$
@ChrisCulter Thanks, I guess that's the notion I was groping towards. I just posted a follow-up question: math.stackexchange.com/q/3075029/71829
$endgroup$
– Keshav Srinivasan
Jan 15 at 21:56










1 Answer
1






active

oldest

votes


















14












$begingroup$

Of your three operations, only $cdot$ is actually a valid operation. In general, if $f$ and $g$ are ring endomorphisms, then your $f+g$ and $f*g$ are not ring endomorphisms: $f+g$ will typically not preserve multiplication and $f*g$ typically will not preserve addition (or multiplication, if $R$ is not commutative).



The natural structure that $operatornameEnd(R)$ has under the composition operation $cdot$ is a monoid: composition is associative and has an identity element (the identity map). This is not special to rings but is true of the set of endomorphisms of pretty much any kind of mathematical object.






share|cite|improve this answer









$endgroup$












    Your Answer





    StackExchange.ifUsing("editor", function ()
    return StackExchange.using("mathjaxEditing", function ()
    StackExchange.MarkdownEditor.creationCallbacks.add(function (editor, postfix)
    StackExchange.mathjaxEditing.prepareWmdForMathJax(editor, postfix, [["$", "$"], ["\\(","\\)"]]);
    );
    );
    , "mathjax-editing");

    StackExchange.ready(function()
    var channelOptions =
    tags: "".split(" "),
    id: "69"
    ;
    initTagRenderer("".split(" "), "".split(" "), channelOptions);

    StackExchange.using("externalEditor", function()
    // Have to fire editor after snippets, if snippets enabled
    if (StackExchange.settings.snippets.snippetsEnabled)
    StackExchange.using("snippets", function()
    createEditor();
    );

    else
    createEditor();

    );

    function createEditor()
    StackExchange.prepareEditor(
    heartbeatType: 'answer',
    autoActivateHeartbeat: false,
    convertImagesToLinks: true,
    noModals: true,
    showLowRepImageUploadWarning: true,
    reputationToPostImages: 10,
    bindNavPrevention: true,
    postfix: "",
    imageUploader:
    brandingHtml: "Powered by u003ca class="icon-imgur-white" href="https://imgur.com/"u003eu003c/au003e",
    contentPolicyHtml: "User contributions licensed under u003ca href="https://creativecommons.org/licenses/by-sa/3.0/"u003ecc by-sa 3.0 with attribution requiredu003c/au003e u003ca href="https://stackoverflow.com/legal/content-policy"u003e(content policy)u003c/au003e",
    allowUrls: true
    ,
    noCode: true, onDemand: true,
    discardSelector: ".discard-answer"
    ,immediatelyShowMarkdownHelp:true
    );



    );













    draft saved

    draft discarded


















    StackExchange.ready(
    function ()
    StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fmath.stackexchange.com%2fquestions%2f3074950%2fwhat-algebraic-structure-does-the-set-of-endomorphisms-of-a-ring-have%23new-answer', 'question_page');

    );

    Post as a guest















    Required, but never shown

























    1 Answer
    1






    active

    oldest

    votes








    1 Answer
    1






    active

    oldest

    votes









    active

    oldest

    votes






    active

    oldest

    votes









    14












    $begingroup$

    Of your three operations, only $cdot$ is actually a valid operation. In general, if $f$ and $g$ are ring endomorphisms, then your $f+g$ and $f*g$ are not ring endomorphisms: $f+g$ will typically not preserve multiplication and $f*g$ typically will not preserve addition (or multiplication, if $R$ is not commutative).



    The natural structure that $operatornameEnd(R)$ has under the composition operation $cdot$ is a monoid: composition is associative and has an identity element (the identity map). This is not special to rings but is true of the set of endomorphisms of pretty much any kind of mathematical object.






    share|cite|improve this answer









    $endgroup$

















      14












      $begingroup$

      Of your three operations, only $cdot$ is actually a valid operation. In general, if $f$ and $g$ are ring endomorphisms, then your $f+g$ and $f*g$ are not ring endomorphisms: $f+g$ will typically not preserve multiplication and $f*g$ typically will not preserve addition (or multiplication, if $R$ is not commutative).



      The natural structure that $operatornameEnd(R)$ has under the composition operation $cdot$ is a monoid: composition is associative and has an identity element (the identity map). This is not special to rings but is true of the set of endomorphisms of pretty much any kind of mathematical object.






      share|cite|improve this answer









      $endgroup$















        14












        14








        14





        $begingroup$

        Of your three operations, only $cdot$ is actually a valid operation. In general, if $f$ and $g$ are ring endomorphisms, then your $f+g$ and $f*g$ are not ring endomorphisms: $f+g$ will typically not preserve multiplication and $f*g$ typically will not preserve addition (or multiplication, if $R$ is not commutative).



        The natural structure that $operatornameEnd(R)$ has under the composition operation $cdot$ is a monoid: composition is associative and has an identity element (the identity map). This is not special to rings but is true of the set of endomorphisms of pretty much any kind of mathematical object.






        share|cite|improve this answer









        $endgroup$



        Of your three operations, only $cdot$ is actually a valid operation. In general, if $f$ and $g$ are ring endomorphisms, then your $f+g$ and $f*g$ are not ring endomorphisms: $f+g$ will typically not preserve multiplication and $f*g$ typically will not preserve addition (or multiplication, if $R$ is not commutative).



        The natural structure that $operatornameEnd(R)$ has under the composition operation $cdot$ is a monoid: composition is associative and has an identity element (the identity map). This is not special to rings but is true of the set of endomorphisms of pretty much any kind of mathematical object.







        share|cite|improve this answer












        share|cite|improve this answer



        share|cite|improve this answer










        answered Jan 15 at 20:58









        Eric WofseyEric Wofsey

        184k13212338




        184k13212338



























            draft saved

            draft discarded
















































            Thanks for contributing an answer to Mathematics Stack Exchange!


            • Please be sure to answer the question. Provide details and share your research!

            But avoid


            • Asking for help, clarification, or responding to other answers.

            • Making statements based on opinion; back them up with references or personal experience.

            Use MathJax to format equations. MathJax reference.


            To learn more, see our tips on writing great answers.




            draft saved


            draft discarded














            StackExchange.ready(
            function ()
            StackExchange.openid.initPostLogin('.new-post-login', 'https%3a%2f%2fmath.stackexchange.com%2fquestions%2f3074950%2fwhat-algebraic-structure-does-the-set-of-endomorphisms-of-a-ring-have%23new-answer', 'question_page');

            );

            Post as a guest















            Required, but never shown





















































            Required, but never shown














            Required, but never shown












            Required, but never shown







            Required, but never shown

































            Required, but never shown














            Required, but never shown












            Required, but never shown







            Required, but never shown






            Popular posts from this blog

            How to check contact read email or not when send email to Individual?

            Displaying single band from multi-band raster using QGIS

            How many registers does an x86_64 CPU actually have?