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Current Status of Exact Supersymmetry on the Lattice

Current Status of Exact Supersymmetry on the Lattice. Noboru Kawamoto (Hokkaido University) Supersymmetries and Quantum Symmetries 2013 Aug.3 Dubna. Why  Lattice SUSY  ?. Practical reason: discovery of SUSY particles ? lattice SUSY lattice QCD

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Current Status of Exact Supersymmetry on the Lattice

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  1. Current Status of Exact Supersymmetryon the Lattice Noboru Kawamoto (Hokkaido University) Supersymmetries and Quantum Symmetries 2013 Aug.3 Dubna

  2. Why LatticeSUSY ? Practicalreason: discovery of SUSY particles ? lattice SUSY lattice QCD N=D=4 lattice super Yang-Mills (string) What makes exact lattice SUSY regularization difficult ? exact lattice SUSY regularization possible ? connection with lattice chiralfermion problem ? clue for SUSY breaking mechanism ? super gravity ?

  3. Exact SUSY on the Lattice A bit of history: More than 30 years unsuccessful: Dondi&Nicolai (1977) Many theoretical and numerical investigations No realization of exact SUSY on the lattice untill 2003 Later developments: Exact lattice SUSY was realized only for nilpotent super charge: Kaplan, Katz, Unsal, Cohen (2003), Sugino, Catterall…. No-Go theorem for Leibniz rule of difference operator Kato, Sakamoto and So (2008) Link approach: noncommutative D’Adda, Kanamori, N.K. Nagata.(2005,6,8) Hopf algebra invariance : D’adda, N.K. Saito (2010) B) Super doubler approach: nonlocal D’Adda, Feo, Kanamori, N.K. Saito (2011,12) New approaches for exact SUSY on the lattice 10 years of Sapporo-Torino collaboration

  4. Let’s consider the simplest lattice SUSY algebra: (0) Loss of Poincare invariance: discrete invariance ? (1) Difference operator does not satisfy Leibniz rule. (2) Species doublers of lattice chiralfermion copies appear: unbalance of d.o.f. between bosons and fermions Two major difficulties for lattice SUSY

  5. difference operator symmetric cancelation Link nature breakdown of Leibniz rule Modified Leibniz rule forward

  6. Masslessfermion species doublers (2) Species doublers of lattice chiralfermion copies appear: unbalance of d.o.f. between bosons and fermions Continuum: doubling of fermions 0

  7. How do we solve these two fundamental problems ? • Link Approach: twisted SUSY, shifted Leibniz rule for super charges Dirac-Kaehler (Ivanenko-Landau) fermions B) Super doubler approach: lattice momentum conservation Leibniz rule is satisfied under product non-local field theory Our proposals doublers = super partners for A) and B) No chiralfermion problem

  8. A)Link Approach: N=D=2 SUSY Dirac-Kaehler Twist Dirac-Kaehler fermion N=D=2 Twisted SUSY Continuum Lattice: on a Lattice

  9. New Ansatz: We need a modified Leibniz rule for too ! Compatibility of Shifts

  10. Symm. Choice Asymm. Choice Cond. for Twisted N=D=2 Solutions Twisted N=D=2 Lattice SUSY Algebra Equivalent to orbifold construction: by Kaplan et.al.

  11. Gauge trans. N=D=2 Twisted Super Yang-Mills Introduce Bosonic & Fermionic Link variables Scalar fields in SYM multiplet

  12. N=D=2 Twisted Lattice SUSY Algebra for SYM “Shifted” Anti-commutator …

  13. Jacobi Identities … Define fermionic link components … Auxiliary Field

  14. Twisted SUSY Algebra closes off-shell Twisted N=2 Lattice SUSY Transformation Shifts of Fields

  15. Twisted N=2 Super Yang-Mills Action Off-shell SUSY invariance for all twisted super charges. Action has twisted SUSY exact form.

  16. Bosonic part of the Action

  17. Fermionic part of the Action … (1) … (2) (1) (2)

  18. Higer dimensional extension is possible: 3 dimensions 3-dim. N=4 super Yang-Mills

  19. Noncommutativity needed for link approach Bruckmann Kok “inconsistency ?” When but if we introduce the following “mild non-commutativity”: then In general

  20. Algebraic consistency of Link Approach 1) Modified Leibniz rule: 2) Shifted anti-commutators 3) non-commutativity Hopf algebraic consistency (D’Adda, N.K., Saito, 2009)

  21. B) Super doubler approach Solutions Difficulties (1) No Leibniz rule in coordinate space algebraic construction with lattice momentum new * product Leibniz rule on *product Doublers as super partners (2) doublers of chiralfermion No chiralfermion problem !

  22. Basic Idea The simplest example (D=N=1) translation generator of half translation generator role of supercoordinate

  23. D=1 N=2 Lattice SUSY alternating sign species doubler N=2lattice SUSY algebra

  24. Lattice super derivative Chiral lattice SUSY algebra (D=1,N=2) No influence to the cont. limit

  25. Chiral conditions truncation of species doub. d.o.f. chiral rescaled field ! meaning ? anti-chiral

  26. Exact Lattice SUSY action for N=2 D=1 Super charge exact form exact lattice SUSY invariant lattice momentum conservation

  27. New*product and Leibniz rule(coordinate rep.) New star * product Leibniz rule in lattice momentum space Leibniz rule on*product (coordinate rep.)

  28. N=2 Wess-Zumino model in two dimensions N=D=2 algebra: Light cone coordinate 2-dim. = (1 dim. ) x (1 dim.)

  29. has 4 species doublers truncation needed chiral conditions

  30. rescaling of fields

  31. D=N=2 lattice SUSY transformation Chiral Anti-chiral

  32. Wess-Zumino action in two dimensions Super charge exact form exact lattice SUSY inv. Kinetic term Interaction term

  33. N=2 Wess-Zumino actions in coordinate product actions in two dimensions Kinetic term Interaction term SUSY algebra with Leibniz rule is satisfied on product !

  34. Summary of B) Super doubler approach • Exact lattice SUSY is realized. • Lattice Leibniz rule works for new product. • Species doublers are super partners: no lattice chiralfermion problem for D=1,2, N=2; D=3,4, N=4 BUT Interaction is nonlocal. Translational invariance is lost. Exact lattice SUSY at the quantum level ?

  35. Exact lattice SUSY at the quantum level Asaka, D’Adda, N.K. Kondo (2013) One loop Ward-Takahashi Identity: Example: one loop W.I. tree W.I.

  36. Can we generalize this formulation to super Yang-Mills ? • Breakdown of associativity: (A) (B)

  37. Since SUSY transformation is linear Wess-Zuminomodels have no problems. Extention to super Yang-Mills is not allowed in the current form. Generalization to super Yang-Mills and extention to higer dimensions by super doubler approach is under investigation.

  38. Summary for Exact Lattice SUSY A) Link Approach: Hopf algebraic exact SUSY invariance Non-commutative super Yang-Mills theory B) Super doubler approach: Exact lattice SUSY on a new star product Non-local field theory Nochiralfermion problem: Species doublers are super partners. Higer dimensions, gauge extension of B) What is the relation between A) and B) ?

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