Is Lorentz symmetry broken if SUSY is broken?Multiple vacua vs. vev's in qftIs broken supersymmetry compatible with a small cosmological constant?Why must SUSY be broken?Lorentz transformation of the vacuum stateSupersymmetric background and fermion variationsVacuum energy and supersymmetryCan Poincare representations be embedded in non-standard Lorentz representations?What does soft symmetry breaking physically mean?SUSY vacuum has 0 energy?What does Lorentz index structure say about a full-fledged correlator?

How badly should I try to prevent a user from XSSing themselves?

Is it inappropriate for a student to attend their mentor's dissertation defense?

Why are electrically insulating heatsinks so rare? Is it just cost?

What exploit are these user agents trying to use?

How can I make my BBEG immortal short of making them a Lich or Vampire?

What is going on with Captain Marvel's blood colour?

Were any external disk drives stacked vertically?

Could gravitational lensing be used to protect a spaceship from a laser?

What reasons are there for a Capitalist to oppose a 100% inheritance tax?

Is it unprofessional to ask if a job posting on GlassDoor is real?

Watching something be written to a file live with tail

Is the Joker left-handed?

Fully-Firstable Anagram Sets

Can a rocket refuel on Mars from water?

Theorems that impeded progress

AES: Why is it a good practice to use only the first 16bytes of a hash for encryption?

Can a virus destroy the BIOS of a modern computer?

Does a druid starting with a bow start with no arrows?

Is it legal for company to use my work email to pretend I still work there?

prove that the matrix A is diagonalizable

Has there ever been an airliner design involving reducing generator load by installing solar panels?

I Accidentally Deleted a Stock Terminal Theme

Stopping power of mountain vs road bike

Twin primes whose sum is a cube



Is Lorentz symmetry broken if SUSY is broken?


Multiple vacua vs. vev's in qftIs broken supersymmetry compatible with a small cosmological constant?Why must SUSY be broken?Lorentz transformation of the vacuum stateSupersymmetric background and fermion variationsVacuum energy and supersymmetryCan Poincare representations be embedded in non-standard Lorentz representations?What does soft symmetry breaking physically mean?SUSY vacuum has 0 energy?What does Lorentz index structure say about a full-fledged correlator?













4












$begingroup$


I have seemingly convinced myself that the entire Poincare group is spontaneously broken if one of the supersymmetric charges is spontaneously broken.



We know that if one of the supersymmetric charges is spontaneously broken, then a vacuum with zero three-momentum MUST have a nonzero energy. There is no way to re-scale the Hamiltonian since the supersymmetry algebra provides an absolute scale. Let's suppose the vacuum is an eigenstate of $P^mu$, then we have



$$P^mu|Omegarangle=p^0delta^mu_0|Omegarangle$$



If we lorentz transform this equation with the unitary operator $U(Lambda)$, we find that a new state $U(Lambda)|Omegarangle$ solves the eigenvalue equation:



$$P^muU(Lambda)|Omegarangle=(Lambda^-1)^mu_0p^0U(Lambda)|Omegarangle$$



Since $U(Lambda)P^muU^-1(Lambda)=Lambda^mu_nuP^nu$.



Therefore we have a whole family of vacua which are orthogonal and related by a lorentz transformation.



Is there something I am missing here? Is this even a bad thing?










share|cite|improve this question









$endgroup$
















    4












    $begingroup$


    I have seemingly convinced myself that the entire Poincare group is spontaneously broken if one of the supersymmetric charges is spontaneously broken.



    We know that if one of the supersymmetric charges is spontaneously broken, then a vacuum with zero three-momentum MUST have a nonzero energy. There is no way to re-scale the Hamiltonian since the supersymmetry algebra provides an absolute scale. Let's suppose the vacuum is an eigenstate of $P^mu$, then we have



    $$P^mu|Omegarangle=p^0delta^mu_0|Omegarangle$$



    If we lorentz transform this equation with the unitary operator $U(Lambda)$, we find that a new state $U(Lambda)|Omegarangle$ solves the eigenvalue equation:



    $$P^muU(Lambda)|Omegarangle=(Lambda^-1)^mu_0p^0U(Lambda)|Omegarangle$$



    Since $U(Lambda)P^muU^-1(Lambda)=Lambda^mu_nuP^nu$.



    Therefore we have a whole family of vacua which are orthogonal and related by a lorentz transformation.



    Is there something I am missing here? Is this even a bad thing?










    share|cite|improve this question









    $endgroup$














      4












      4








      4


      2



      $begingroup$


      I have seemingly convinced myself that the entire Poincare group is spontaneously broken if one of the supersymmetric charges is spontaneously broken.



      We know that if one of the supersymmetric charges is spontaneously broken, then a vacuum with zero three-momentum MUST have a nonzero energy. There is no way to re-scale the Hamiltonian since the supersymmetry algebra provides an absolute scale. Let's suppose the vacuum is an eigenstate of $P^mu$, then we have



      $$P^mu|Omegarangle=p^0delta^mu_0|Omegarangle$$



      If we lorentz transform this equation with the unitary operator $U(Lambda)$, we find that a new state $U(Lambda)|Omegarangle$ solves the eigenvalue equation:



      $$P^muU(Lambda)|Omegarangle=(Lambda^-1)^mu_0p^0U(Lambda)|Omegarangle$$



      Since $U(Lambda)P^muU^-1(Lambda)=Lambda^mu_nuP^nu$.



      Therefore we have a whole family of vacua which are orthogonal and related by a lorentz transformation.



      Is there something I am missing here? Is this even a bad thing?










      share|cite|improve this question









      $endgroup$




      I have seemingly convinced myself that the entire Poincare group is spontaneously broken if one of the supersymmetric charges is spontaneously broken.



      We know that if one of the supersymmetric charges is spontaneously broken, then a vacuum with zero three-momentum MUST have a nonzero energy. There is no way to re-scale the Hamiltonian since the supersymmetry algebra provides an absolute scale. Let's suppose the vacuum is an eigenstate of $P^mu$, then we have



      $$P^mu|Omegarangle=p^0delta^mu_0|Omegarangle$$



      If we lorentz transform this equation with the unitary operator $U(Lambda)$, we find that a new state $U(Lambda)|Omegarangle$ solves the eigenvalue equation:



      $$P^muU(Lambda)|Omegarangle=(Lambda^-1)^mu_0p^0U(Lambda)|Omegarangle$$



      Since $U(Lambda)P^muU^-1(Lambda)=Lambda^mu_nuP^nu$.



      Therefore we have a whole family of vacua which are orthogonal and related by a lorentz transformation.



      Is there something I am missing here? Is this even a bad thing?







      quantum-field-theory special-relativity supersymmetry lorentz-symmetry symmetry-breaking






      share|cite|improve this question













      share|cite|improve this question











      share|cite|improve this question




      share|cite|improve this question










      asked 3 hours ago









      LucashWindowWasherLucashWindowWasher

      1819




      1819




















          1 Answer
          1






          active

          oldest

          votes


















          3












          $begingroup$

          No, Lorentz symmetry is not broken if SUSY is broken. All you have to do is add a constant to the energy; then the four-momentum of the vacuum is zero, as it must be. This is a completely standard thing to do. For instance, it's how we subtract out the divergent vacuum energy contribution around the second week of a first quantum field theory course.



          I can hear you complaining that this messes up the SUSY algebra since $Q, Q sim H$, but who cares? The fact that SUSY is broken means there does not exist a set of operators satisfying the SUSY algebra and annihilating the vacuum. Now forget about SUSY; does there exist a set of operators satisfying the Poincare algebra and annihilating the vacuum? Yes, by adding a constant to $H$. So Lorentz symmetry is not broken here.






          share|cite|improve this answer









          $endgroup$












          • $begingroup$
            That makes so much sense!
            $endgroup$
            – LucashWindowWasher
            1 hour ago











          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: "151"
          ;
          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: false,
          noModals: true,
          showLowRepImageUploadWarning: true,
          reputationToPostImages: null,
          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%2fphysics.stackexchange.com%2fquestions%2f470609%2fis-lorentz-symmetry-broken-if-susy-is-broken%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









          3












          $begingroup$

          No, Lorentz symmetry is not broken if SUSY is broken. All you have to do is add a constant to the energy; then the four-momentum of the vacuum is zero, as it must be. This is a completely standard thing to do. For instance, it's how we subtract out the divergent vacuum energy contribution around the second week of a first quantum field theory course.



          I can hear you complaining that this messes up the SUSY algebra since $Q, Q sim H$, but who cares? The fact that SUSY is broken means there does not exist a set of operators satisfying the SUSY algebra and annihilating the vacuum. Now forget about SUSY; does there exist a set of operators satisfying the Poincare algebra and annihilating the vacuum? Yes, by adding a constant to $H$. So Lorentz symmetry is not broken here.






          share|cite|improve this answer









          $endgroup$












          • $begingroup$
            That makes so much sense!
            $endgroup$
            – LucashWindowWasher
            1 hour ago















          3












          $begingroup$

          No, Lorentz symmetry is not broken if SUSY is broken. All you have to do is add a constant to the energy; then the four-momentum of the vacuum is zero, as it must be. This is a completely standard thing to do. For instance, it's how we subtract out the divergent vacuum energy contribution around the second week of a first quantum field theory course.



          I can hear you complaining that this messes up the SUSY algebra since $Q, Q sim H$, but who cares? The fact that SUSY is broken means there does not exist a set of operators satisfying the SUSY algebra and annihilating the vacuum. Now forget about SUSY; does there exist a set of operators satisfying the Poincare algebra and annihilating the vacuum? Yes, by adding a constant to $H$. So Lorentz symmetry is not broken here.






          share|cite|improve this answer









          $endgroup$












          • $begingroup$
            That makes so much sense!
            $endgroup$
            – LucashWindowWasher
            1 hour ago













          3












          3








          3





          $begingroup$

          No, Lorentz symmetry is not broken if SUSY is broken. All you have to do is add a constant to the energy; then the four-momentum of the vacuum is zero, as it must be. This is a completely standard thing to do. For instance, it's how we subtract out the divergent vacuum energy contribution around the second week of a first quantum field theory course.



          I can hear you complaining that this messes up the SUSY algebra since $Q, Q sim H$, but who cares? The fact that SUSY is broken means there does not exist a set of operators satisfying the SUSY algebra and annihilating the vacuum. Now forget about SUSY; does there exist a set of operators satisfying the Poincare algebra and annihilating the vacuum? Yes, by adding a constant to $H$. So Lorentz symmetry is not broken here.






          share|cite|improve this answer









          $endgroup$



          No, Lorentz symmetry is not broken if SUSY is broken. All you have to do is add a constant to the energy; then the four-momentum of the vacuum is zero, as it must be. This is a completely standard thing to do. For instance, it's how we subtract out the divergent vacuum energy contribution around the second week of a first quantum field theory course.



          I can hear you complaining that this messes up the SUSY algebra since $Q, Q sim H$, but who cares? The fact that SUSY is broken means there does not exist a set of operators satisfying the SUSY algebra and annihilating the vacuum. Now forget about SUSY; does there exist a set of operators satisfying the Poincare algebra and annihilating the vacuum? Yes, by adding a constant to $H$. So Lorentz symmetry is not broken here.







          share|cite|improve this answer












          share|cite|improve this answer



          share|cite|improve this answer










          answered 2 hours ago









          knzhouknzhou

          46.1k11124222




          46.1k11124222











          • $begingroup$
            That makes so much sense!
            $endgroup$
            – LucashWindowWasher
            1 hour ago
















          • $begingroup$
            That makes so much sense!
            $endgroup$
            – LucashWindowWasher
            1 hour ago















          $begingroup$
          That makes so much sense!
          $endgroup$
          – LucashWindowWasher
          1 hour ago




          $begingroup$
          That makes so much sense!
          $endgroup$
          – LucashWindowWasher
          1 hour ago

















          draft saved

          draft discarded
















































          Thanks for contributing an answer to Physics 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%2fphysics.stackexchange.com%2fquestions%2f470609%2fis-lorentz-symmetry-broken-if-susy-is-broken%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

          कुँवर स्रोत दिक्चालन सूची"कुँवर""राणा कुँवरके वंशावली"

          शेव्रोले वोल्ट अनुक्रम इतिहास इन्हे भी देखें चित्र दीर्घा संदर्भ दिक्चालन सूची

          चैत्य भूमि चित्र दीर्घा सन्दर्भ बाहरी कडियाँ दिक्चालन सूची"Chaitya Bhoomi""Chaitya Bhoomi: Statue of Equality in India""Dadar Chaitya Bhoomi: Statue of Equality in India""Ambedkar memorial: Centre okays transfer of Indu Mill land"चैत्यभमि