(Hokkaido University)

Slides:

Advertisements

Similar presentations

1. 2 SUPERSYMMETRY Most popular solution to the hierarchy problem. Symmetry between fermions, and bosons With same mass and quantum number 3.

Advertisements

　Symmetries and vanishing couplings in string-derived low-energy effective field theory 　　　　　　　　　　　　 Tatsuo Kobayashi １．Introduction.

Summing planar diagrams

Gauge/gravity duality ・ Strongly coupled gauge theory ( in large N limit ) ・ String theory gravity in a curved space AdS/CFT [1997, Maldacena] D-brane.

8/1(Thu), 2013 Parallel talk (Theoretical development) Daisuke Kadoh (KEK) D.K. and Syo Kamata, in preparation TexPoint fonts used in.

Lattice Spinor Gravity Lattice Spinor Gravity. Quantum gravity Quantum field theory Quantum field theory Functional integral formulation Functional integral.

1 Lattice Formulation of Topological Field theory Tomohisa Takimi (NCTU) Ref) K. Ohta, T.T Prog.Theor. Phys. 117 (2007) No2 [hep-lat / ] (Too simple)

Boundaries in Rigid and Local Susy Dmitry V. Belyaev and Peter van Nieuwenhuizen.

Lecture 4. Before Christmas… 1.2 SUSY Algebra (N=1) From the Haag, Lopuszanski and Sohnius extension of the Coleman-Mandula theorem we need to introduce.

String Field Theory Non-Abelian Tensor Gauge Fields and Possible Extension of SM George Savvidy Demokritos National Research Center Athens Phys. Lett.

1 Superstring vertex operators in type IIB matrix model Satoshi Nagaoka (KEK) with Yoshihisa Kitazawa (KEK & Sokendai) String Theory and Quantum Field.

Fun with Computational Physics: Non-commutative Geometry on the Lattice Alberto de Campo 1, Wolfgang Frisch 2, Harald Grosse 3, Natascha Hörmann 2, Harald.

Happy 120 th birthday. Mimeograph Constraining Goldstinos with Constrained Superfields Nathan Seiberg IAS Confronting Challenges in Theoretical Physics.

Effective field theories for QCD with rooted staggered fermions Claude Bernard, Maarten Golterman and Yigal Shamir Lattice 2007, Regensburg.

On-Shell Methods in Field Theory David A. Kosower International School of Theoretical Physics, Parma, September 10-15, 2006 Lecture III.

1 Lattice Formulation of Two Dimensional Topological Field Theory Tomohisa Takimi (RIKEN,Japan) K. Ohta, T.T Prog.Theor. Phys. 117 (2007) No2 [hep-lat.

Supersymmetry in Particle Physics

Putting M theory on computer Jun Nishimura KEK & Graduate University for Advanced Studies (SOKENDAI) based on collaboration with Konstantinos Anagnostopoulos.

Kirill Polovnikov* Anton Galajinsky* Olaf Lechtenfeld** Sergey Krivonos*** * Laboratory of Mathematical Physics, Tomsk Polytechnic University ** Institut.

LATTICE Regensburg1 Lattice Formulation of N=4 D=3 Twisted Super Yang-Mills Kazuhiro NAGATA Dept. of Phys., Indiana Univ. A. D’Adda INFN Torino,

Jan KalinowskiSupersymmetry, part 1 SUSY 1 Jan Kalinowski.

1 Lattice Formulation of Two Dimensional Topological Field Theory Tomohisa Takimi ( 基研、理研 ) K. Ohta, T.T Prog.Theor. Phys. 117 (2007) No2 hep-lat

Exact Supersymmetry on the Lattice Noboru Kawamoto (Hokkaido University) CFT and Integrability In memory of Alexei Zamolodchikov Dec.18, Seoul.

Higher Derivative Scalars in Supergravity Jean-Luc Lehners Max Planck Institute for Gravitational Physics Albert Einstein Institute Based on work with.

Exact Results for perturbative partition functions of theories with SU(2|4) symmetry Shinji Shimasaki (Kyoto University) JHEP1302, 148 (2013) (arXiv: [hep-th])

S. Bellucci a S. Krivonos b A.Shcherbakov a A.Sutulin b a Istituto Nazionale di Fisica Nucleare, Laboratori Nazionali di Frascati, Italy b Bogoliubov Laboratory.

Yuya Sasai (Yukawa Institute for Theoretical Physics, Kyoto University) in collaboration with N. Sasakura (YITP) JHEP 0906, 013 (2009) [arXiv: ]

The Standard Model of Electroweak Physics Christopher T. Hill Head of Theoretical Physics Fermilab.

Wednesday, Apr. 23, 2003PHYS 5326, Spring 2003 Jae Yu 1 PHYS 5326 – Lecture #24 Wednesday, Apr. 23, 2003 Dr. Jae Yu Issues with SM picture Introduction.

D-term Dynamical Supersymmetry Breaking K. Fujiwara and, H.I. and M. Sakaguchi arXiv: hep-th/ , P. T. P. 113 arXiv: hep-th/ , N. P. B 723 H.

B EING F LAT W ITH N O S YMMETRIES arXiv: [hep-th] arXiv:15xx.xxxxx [hep-th] with Xi Dong and Daniel Z. Freedman Yue Zhao SITP, Stanford University.

Takaaki Nomura(Saitama univ) collaborators Joe Sato (Saitama univ) Nobuhito Maru (Chuo univ) Masato Yamanaka (ICRR) arXiv: (to be published on.

AdS 4 £ CP 3 superspace Dmitri Sorokin INFN, Sezione di Padova ArXiv: Jaume Gomis, Linus Wulff and D.S. SQS’09, Dubna, 30 July 2009 ArXiv:

Higher-Spin Geometry and String Theory Augusto SAGNOTTI Universita’ di Roma “Tor Vergata” QG05 – Cala Gonone, September, 2005 Based on: Francia, AS, hep-th/ ,, ,

Super Virasoro Algebras from Chiral Supergravity Ibaraki Univ. Yoshifumi Hyakutake Based on arXiv:1211xxxx + work in progress.

The Geometry of Moduli Space and Trace Anomalies. A.Schwimmer (with J.Gomis,P-S.Nazgoul,Z.Komargodski, N.Seiberg,S.Theisen)

Expanding (3+1)-dimensional universe from a Lorentzian matrix model for superstring theory in (9+1)-dimensions Talk at KEK for String Advanced Lectures,

Gauge invariant Lagrangian for Massive bosonic higher spin field Hiroyuki Takata Tomsk state pedagogical university(ТГПУ) Tomsk, Russia Hep-th

Quark Mass Matrix from Dimensional Deconstruction Academia Sinica Andrea Soddu Taipei November 17, 2004 National Taiwan University P.Q Hung, A.S., N.-K.

Lecture 6 TexPoint fonts used in EMF. Read the TexPoint manual before you delete this box.: A A AA.

Possible Enhancement of noncommutative EFFECTS IN gravity Objective Look for consequences of gravity on noncommutative (NC) space-time Chamseddine In particular,

Internal symmetry :SU(3) c ×SU(2) L ×U(1) Y standard model ( 標準模型 ) quarks SU(3) c leptons L Higgs scalar Lorentzian invariance, locality, renormalizability,

Two Fundamental Puzzles And Lattice SUSY S.Arianos, A.D’Adda, A.Feo, I.Kanamori, K.Nagata, J.Saito J.Kato, A.Miyake, T.Tsukioka, Y.Uchida,

1 1 An anisotropic hybrid non-perturbative formulation for N=2 4d non-commutative supersymmetric Yang-Mills theories. Tomohisa Takimi (TIFR) Ref) Tomohisa.

Wilsonian approach to Non-linear sigma models Etsuko Itou (YITP, Japan) Progress of Theoretical Physics 109 (2003) 751 Progress of Theoretical Physics.

Maximal super Yang-Mills theories on curved background with off-shell supercharges 総合研究大学院大学藤塚理史共同研究者：吉田豊氏 (KEK), 本多正純氏 ( 総研大 /KEK) based on M.

Takaaki Nomura(Saitama univ)

9/10/2007Isaac Newton Institute1 Relations among Supersymmetric Lattice Gauge Theories So Niels Bohr Institute based on the works arXiv:

Nobuchika Okada The University of Alabama Miami 2015, Fort Lauderdale, Dec , GeV Higgs Boson mass from 5D gauge-Higgs unification In collaboration.

1 A non-perturbative study of Supersymmetric Lattice Gauge Theories Tomohisa Takimi ( 基研 )

A.Sako S.Kuroki T.Ishikawa Graduate school of Mathematics, Hiroshima University Graduate school of Science, Hiroshima University Higashi-Hiroshima ,Japan.

Monday, Apr. 7, 2003PHYS 5326, Spring 2003 Jae Yu 1 PHYS 5326 – Lecture #20 Monday, Apr. 7, 2003 Dr. Jae Yu Super Symmetry Breaking MSSM Higgs and Their.

11 A non-perturbative analytic study of the supersymmetric lattice gauge theory Tomohisa Takimi (NCTU) Ref) K. Ohta, T.T Prog.Theor. Phys. 117 (2007) No2.

Three dimensional conformal sigma models Collaborated with Takeshi Higashi and Kiyoshi Higashijima (Osaka U.) Etsuko Itou (Kyoto U. YITP) hep-th/

Lecture 3. (Recap of Part 2) Dirac spinor 2 component Weyl spinors Raising and lowering of indices.

Supersymmetric three dimensional conformal sigma models Collaborated with Takeshi Higashi and Kiyoshi Higashijima (Osaka U.) Etsuko Itou (Kyoto U. YITP)

The nonperturbative analyses for lower dimensional non-linear sigma models Etsuko Itou (Osaka University) 1.Introduction 2.The WRG equation for NLσM 3.Fixed.

} } Lagrangian formulation of the Klein Gordon equation

1 1 A lattice formulation of 4 dimensional N=2 supersymmetric Yang-Mills theories Tomohisa Takimi (TIFR) Ref) Tomohisa Takimi arXiv: [hep-lat]

1 Lattice Formulation of Two Dimensional Topological Field Theory Tomohisa Takimi ( 理研、川合理論物理 ) K. Ohta, T.T Prog.Theor. Phys. 117 (2007) No2 [hep-lat.

Ramond-Ramond Couplings of D-branes Collaborators: Koji Hashimoto (Osaka Univ.) Seiji Terashima (YITP Kyoto) Sotaro Sugishita (Kyoto Univ.) JHEP1503(2015)077.

ArXiv: (hep-th) Toshiaki Fujimori (Tokyo Institute of Technology) Minoru Eto, Sven Bjarke Gudnason, Kenichi Konishi, Muneto Nitta, Keisuke Ohashi.

Bum-Hoon Lee Sogang University, Seoul, Korea D-branes in Type IIB Plane Wave Background 15th Mini-Workshop on Particle Physics May 14-15, 2006, Seoul National.

10/31/2006Joint Meeting of Pacific Region Particle Physics Communities 1 Lattice Formulation of N=4 D=3 Twisted Super Yang-Mills Kazuhiro NAGATA Dept.

Intro to SUSY II: SUSY QFT Archil Kobakhidze PRE-SUSY 2016 SCHOOL 27 JUNE -1 JULY 2016, MELBOURNE.

Syo Kamata Rikkyo University In collaboration with Hidekazu Tanaka.

The BV Master Equation for the Gauge Wilson Action

Takaaki Nomura(Saitama univ)

Current Status of Exact Supersymmetry on the Lattice

Domain wall solitions and Hopf algebraic translational symmetries

Presentation transcript:

(Hokkaido University) Exact Lattice Supersymmetry at the Quantum Level for N=2 Wess-Zumino Models in Lower Dimensions Noboru Kawamoto (Hokkaido University) In collaboration with K.Asaka, A.D’Adda and Y.Kondo D’Adda, Feo, Kanamori, N.K., Saito JHEP 1203 (2012) 043, JHEP 1009 (2010) 059

Major difficulties for lattice SUSY Let’s consider the simplest lattice SUSY algebra: (1) Difference operator does not satisfy Leibniz rule. (2) Species doublers of lattice chiral fermion copies appear: unbalance of d.o.f. between bosons and fermions

Proposal of solution for the difficulties Difficulties in lattice Solutions Leibniz rule in momentum space latt. mom. conservation (１) No Leibniz rule in coordinate space (２) Species doublers on lattice 　　unbalance of fermion and boson Doublers as super partners of extended SUSY No chiral fermion problem !

Solution to (1): Coordinate: Momentum: Good: product is non-local Short comings: loss of translational invariance

Interpretation of (2): translation generator of half translation generator Brilliuon zone

Essense of Lattice SUSY transformation: D=N=1 species doublers

Two different modes (N=2) species doubers fermion boson auxiliary field

Truncation of d.o.f. (chiral condition: D=N=2) identification

N=2 Wess-Zumino model in two dimensions N=D=2 algebra: Light cone coordinate direct product

D=N=2 super symmetry on the lattice has 4 species doublers truncation needed chiral conditions

the meaning of

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

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

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 !

Ward Identity: SUSY exact in quantum level ? When lattice SUSY is exact: Suppose we choose:

Tree level Ward Identity Tree level W.I. is satisfied.

One loop Ward Identity: one loop W.I. tree W.I.

Two loop Ward Identity: two loop W.I. tree W.I.

Subtleties of integration domain equal ?

Summary of the formulation (non-gauge theory: D=N=2) Good: Exact lattice SUSY with correct Leibniz rule on the product, quantum level exactness No chiral fermion problems (species doublers are truncated by chiral conditions) Short comings: non-local field theory Loss of translational invariance (recover at ) super Yang-Mills ?

Breakdown of associativity Integration region (A) (B) Since and are different fields, associativity is broken

Even though the associativity is broken the following product is well defined. non-gauge lattice SUSY has exact symmetry In the formulation of lattice super Yang-Mills the breakdown of the associativity is problem. SUSY transformation is linear in fields while gauge transformation is non-linear.

Conclusions Exactly SUSY invariant formulation in mom. and coordinate space is found. A new star product is defined where exact lattice SUSY algebra is fulfilled. Another solution to chiral fermion problem Species doublers are physical

Momentum representation ＝ species doubler

SUSY transformation in momentum space (N=2 in 1-dim.) N=2　lattice SUSY algebra continuum momentum: species doubler

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

bi-local nature of SUSY transformation species doubler as supermultiplets N=2

Chiral conditions 1-dim. chiral anti-chiral truncation of species doub. d.o.f. 1-dim. rescaled field ! meaning ? chiral anti-chiral

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

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

D=N=2 Lattice SUSY transformation Chiral algebra

has 4 species doublers truncation needed chiral conditions

D=N=2 super covariant derivative

Chiral conditions for D=N=2 chiral fields

D=N=2 lattice SUSY transformation Chiral suffix (s,s) is omitted Anti-chiral suffix (a,a) is omitted

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

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 !

Conclusions Exactly SUSY invariant formulation in mom. and coordinate space is found. the first example A new star product is defined where exact lattice SUSY algebra is fulfilled. Another solution to chiral fermion problem Species doublers are physical Higer dimensions, gauge extension, quantum…

Symmetric difference operator No Leibniz rule Possible solutions: (1) Link approach: Hopf algebraic symmetry (2) New star product: Leibniz rule ?

but if we introduce the following “mild non-commutativity”: Two Problems Bruckmann Kok “inconsistency” When but if we introduce the following “mild non-commutativity”: then In general

Conjecture -product formulation and link approach are equivalent. non-locality non-commutativity

Chiral condition Anti-chiral condition

Lattice super covariant derivative

Species doublers as super multiplets in lattice supersymmetry : Exact supersymmetry with interactions for D=1 N=2 JHEP 016P 0710 (hep-lat:1006.2046) Extension to higher dimensions: D=N=2 Noboru KAWAMOTO Hokkaido University In collaboration with A. D’Adda, A. Feo, I. Kanamori and J. Saito

= ＬａｔｔｉｃｅＳＵＳＹｔｒａｎｓｆｏｒｍａｔｉoｎ half lattice shift translation (1dim.) + species doublers as supermultiplets alternating sign Exact SUSY in momentum space with New (commutative) star product in coordinate space Lebniz rule Link approach difference operator

role of supercoordinate Lattice superfield: SUSY transformation: hermiticity alternating sign key of the lattice SUSY

D=1 N=2 Lattice SUSY Fourier transform

Kinetic term Mass term Interaction term Lattice mom. conservation exact lattice SUSY invariance under and Momentum representation

Since difference operator does not satisfy Leibniz rule “ How can algebra be consistent ?”

Symmetric difference operator No Leibniz rule Possible solutions: (1) Link approach: Hopf algebraic symmetry (2) New star product: Leibniz rule ?

New star product in coordinate space: Lattice momentum: Leibniz rule in mom. New star product in coordinate space: commutative

star product Leibniz rule

Exact SUSY invariance in coordinate space on star product actions