非摂動くりこみ群によるカイラル対称性の破れの解析

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非摂動くりこみ群によるカイラル対称性の破れの解析

著者青木健一

著者別表示 Aoki Kenichi

雑誌名平成16(2004)年度科学研究費補助金基盤研究(B) 研究成果報告書

巻 2001‑2004

ページ 4p.

発行年 2006‑03‑10

URL http://hdl.handle.net/2297/47247

Creative Commons : 表示 ‑ 非営利 ‑ 改変禁止 http://creativecommons.org/licenses/by‑nc‑nd/3.0/deed.ja

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研究発表

(1)学会誌等

1.Non‑PerturbativeRenormalizationGroupAnalisysinQuantumMechanics K‑I・Aoki,A.Horikoshi,M.｢IhniguchiandH､nrao

Prog.Theor.Phys.108‑3(2002)571‑590

2．Nonpeturbativerenormalizationgroupapproachfbrquantumdissipativesystems

K‑I・AokiandA・Horikoshi

Pllys.Rev.A66(2002)042105‑1‑9

3

3.Non‑perturbativerenormalizatoingroupanalysisoftheOhmicquantumdissipation

K‑I.AokiandA.Horikoshi

Pllys.Lett.A314(2003)177‑183

4．Non‑perturbativerenormalizationgroupapproachtothedynamicalchiralsymme‑

trybreaking

K‑I・Aoki

Proceedingsofthe20021nternationalWorkshoponStrongCouplingGaugeTheo‑

riesandEffectiveFieldTheories(SCGTO2),ed.M.Harada,Y.KikukawaandH.

Yamawaki,WorldScienti丘c,2003,284‑290

5．Non‑perturbativeRenormalizationGroupAnalysisfbrDynamicalChiralSymmetry BreakingninQCD

K‑I.Aoki

Proceedingsof''In力ernationalConferenceonColorCo血nementandHadronsin QuantumChromodynamics"ed.H.Suganuma,N.Ishii,M.Oka,H.Enyo,T.Hatsuda, T.Kunihiro,K・Yazaki,WorldSciemific,2004,176‑182

6.EntropyofspatialmonopolecurrentsinpureSU(2)QCDatfinitetemperature M.N.Chernodub,K・IshiguroandT.Suzuki

Phys.Rev.D71,094506(2005)

7.ThedualMeissnereffectandmagneticdisplacememcurrents TsuneoSuzuki,Katsuyalshiguro,YoshihiroMoriandTbruSekido P h y s . R e v . L e t t . 9 4 , 1 3 2 0 0 1 ( 2 0 0 5 )

8.DeterminationofmonopolecondensatefrommonopoleactioninquenchedSU(2) Q C D

M.N.Chernodub,Katsuyalshiguro,TsuneoSuzuki Phys.Rev.D69(2004)094508

9.AdetailedstudyoftheAbelian‑projectedSU(2)fluxtubeanditsdualGinzburg‑

Landauanalysis

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N u c l . P l l y s . P r o c . S u p p l . 1 4 0 : 3 4 1 ‑ 3 4 3 , 2 0 0 5 A l s o i n * B a t a v i a 2 0 0 4 , L a t t i c e 且 e l d t h e o r y *

341‑343

10.HADRONSPECTRUMANDDECAYCONSTANTFROMN(F)=2DOMAIN WALLQCD

R B C C o l l a b o r a t i o n ( T B k u l z u b u c h i f b r t h e c o l l a b o r a t i o n )

N u c l ・ P h y s ・ P r o c . S u p p l . 1 4 0 : 2 3 7 ‑ 2 3 9 , 2 0 0 5 A l s o i n * B a t a v i a 2 0 0 4 , L a t t i c e 丘 e l d t h e o r y *

237‑239

11.SCALARMESONINDYNAMICALANDPARTIALLYQUENCHEDTWO‑FLAVOR QCD:LATTICERESUIﾉrSANDCHIRALLOOPS.

S . P r e l o v s e k ( L j u b l j a n a U . & S t e f a n l n s t . , L j u b l j a n a ) , C . D a w s o n ( R I K E N B N L ) , T.Izubuchi(RIKENBNL&KanazawaU.,Inst.Theor.Phys.),K.Orginos(MIT, LNS),A.Soni(Brookhaven)

非摂動くりこみ群によるカイラル対称性の破れの解 析

非摂動くりこみ群によるカイラル対称性の破れの解 析

1.Non‑PerturbativeRenormalizationGroupAnalisysinQuantumMechanics K‑I・Aoki,A.Horikoshi,M.｢IhniguchiandH､nrao

Prog.Theor.Phys.108‑3(2002)571‑590

2．Nonpeturbativerenormalizationgroupapproachfbrquantumdissipativesystems

Pllys.Rev.A66(2002)042105‑1‑9

3.Non‑perturbativerenormalizatoingroupanalysisoftheOhmicquantumdissipation

Pllys.Lett.A314(2003)177‑183

4．Non‑perturbativerenormalizationgroupapproachtothedynamicalchiralsymme‑

trybreaking

Proceedingsofthe20021nternationalWorkshoponStrongCouplingGaugeTheo‑

riesandEffectiveFieldTheories(SCGTO2),ed.M.Harada,Y.KikukawaandH.

Yamawaki,WorldScienti丘c,2003,284‑290

5．Non‑perturbativeRenormalizationGroupAnalysisfbrDynamicalChiralSymmetry BreakingninQCD

Proceedingsof''In力ernationalConferenceonColorCo血nementandHadronsin QuantumChromodynamics"ed.H.Suganuma,N.Ishii,M.Oka,H.Enyo,T.Hatsuda, T.Kunihiro,K・Yazaki,WorldSciemific,2004,176‑182

6.EntropyofspatialmonopolecurrentsinpureSU(2)QCDatfinitetemperature M.N.Chernodub,K・IshiguroandT.Suzuki

Phys.Rev.D71,094506(2005)

7.ThedualMeissnereffectandmagneticdisplacememcurrents TsuneoSuzuki,Katsuyalshiguro,YoshihiroMoriandTbruSekido P h y s . R e v . L e t t . 9 4 , 1 3 2 0 0 1 ( 2 0 0 5 )

8.DeterminationofmonopolecondensatefrommonopoleactioninquenchedSU(2) Q C D

M.N.Chernodub,Katsuyalshiguro,TsuneoSuzuki Phys.Rev.D69(2004)094508

9.AdetailedstudyoftheAbelian‑projectedSU(2)fluxtubeanditsdualGinzburg‑

Landauanalysis

N u c l . P l l y s . P r o c . S u p p l . 1 4 0 : 3 4 1 ‑ 3 4 3 , 2 0 0 5 A l s o i n * B a t a v i a 2 0 0 4 , L a t t i c e 且 e l d t h e o r y *

10.HADRONSPECTRUMANDDECAYCONSTANTFROMN(F)=2DOMAIN WALLQCD

R B C C o l l a b o r a t i o n ( T B k u l z u b u c h i f b r t h e c o l l a b o r a t i o n )

N u c l ・ P h y s ・ P r o c . S u p p l . 1 4 0 : 2 3 7 ‑ 2 3 9 , 2 0 0 5 A l s o i n * B a t a v i a 2 0 0 4 , L a t t i c e 丘 e l d t h e o r y *

11.SCALARMESONINDYNAMICALANDPARTIALLYQUENCHEDTWO‑FLAVOR QCD:LATTICERESUIﾉrSANDCHIRALLOOPS.

S . P r e l o v s e k ( L j u b l j a n a U . & S t e f a n l n s t . , L j u b l j a n a ) , C . D a w s o n ( R I K E N B N L ) , T.Izubuchi(RIKENBNL&KanazawaU.,Inst.Theor.Phys.),K.Orginos(MIT, LNS),A.Soni(Brookhaven)

Pllys.Rev.D70:094503,2004

非摂動くりこみ群によるカイラル対称性の破れの解析

非摂動くりこみ群によるカイラル対称性の破れの解析