QCD Dirac Spectra and Random Matrix Theory: Recent Applications, Niels Bohr Institute, May 8, 2007 Eugene Kanzieper Department of Applied Mathematics H.I.T. - Holon Institute of Technology Holon 58102, Israel Applied Mathematics [ ] 30 arXiv: [cond-mat.dis-nn] in collaboration with Vladimir Al. Osipov Bosonic Replicas Chiral GUE and Chiral GUE & Bosonic Replicas
Applied Mathematics outline Nonperturbative description of disordered systems, preferably in presence of p-p interaction © A. M. Chang, Duke Univ [ ] 29 What is the problem and available theoretical tools ? Supersymmetry FT Replica FT Keldysh FT Chiral GUE & Bosonic Replicas [ Janik, Nowak, Papp & Zahed 1998; Osborn & Verbaarshot 1998; Guhr & Wilke 2001 ] © Guhr & Wilke QCD
Applied Mathematics [ ] 28 What is the problem and available theoretical tools ? Why replicas ? What are the replicas ? What does make them so different from other field theories ? Supersymmetry FT Replica FT Keldysh FT Continuous geometry of replica σ – models Discrete geometry of SUSY and Keldysh Supersymmetry FT Keldysh FT outline Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 27 What is the problem and available theoretical tools ? On the asymmetry in performance of fermionic and bosonic replicas and the continuous geometry of replica FTs: GUE Why replicas ? What are the replicas ? What does make them so different from other field theories ? Integrability of ( bosonic) replica field theories: Microscopic density of states in chGUE t - deformed replica partition function Bilinear identity Virasoro constraints KP hierarchy m-KP hierarchy Toda Lattice hierarchy Painlevé and Chazy equations Conclusions outline Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 26 Field Theoretic Approaches to Disordered Systems with p-p Interaction Efetov 1982; Schwiete, Efetov 2004 SUSY FT disorder e-e interaction non- equilibrium ♥ ♥ Replica FT non- equilibrium e-e interaction disorder Wegner 1979; Larkin, Efetov, Khmelnitskii 1980; Finkelstein 1982 ♠ ♠ Keldysh FT disorder e-e interaction non- equilibrium Horbach, Schön 1990, and Kamenev, Andreev 1999 ♣ ♣ Interplay between disorder and p-p interaction what is the problem and the tools ? What is the problem and available theoretical tools ? Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 25 Replica FT non- equilibrium e-e interaction disorder Wegner 1979; Larkin, Efetov, Khmelnitskii 1980; Finkelstein 1982 ♠ ♠ Replica FT is a viable tool to treat an interplay between disorder and the p-p interaction why replicas ? What is the problem and available theoretical tools ? Why replicas ? Quite a remote goal Sorting out controversies surrounding replica field theories in the RMT limit (interaction off) Field Theoretic Approaches to Disordered Systems with p-p Interaction Chiral GUE & Bosonic Replicas Random Matrices © NBI
Applied Mathematics [ ] 24 what are the replicas ? What is the problem and available theoretical tools ? Why replicas ? What are the replicas ? What does make them so different from other field theories ? What are the replicas? No p-p interaction Single particle picture Hamiltonian modelled by a random matrix Mean level density out of one-point Green function based on Edwards and Anderson 1975; Hardy, Littlewood and Pólya 1934 Replica partition function Reconstruct through the replica limit commutativity !! T: bosonic replicas: fermionic replicas: Word of caution: For more than two decades no one could rigorously implement the replica method (or trick?!) in mesoscopics Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 23 excursion through the time Bosonic Replicas Fermionic Replicas F. Wegner Larkin, Efetov & Khmelnitskii general framework & RG in the context of disordered systems 1985 First Critique (Random Matrices) Verbaarschot & Zirnbauer first attempt to treat replica FT (RMT) nonperturbatively fermionic and bosonic replicas brought different results for Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 22 Bosonic Replicas Fermionic Replicas F. Wegner Larkin, Efetov & Khmelnitskii 1985 First Critique (Random Matrices) Verbaarschot & Zirnbauer ill founded first attempt to treat replica FT (RMT) nonperturbatively fermionic and bosonic replicas brought different results for excursion through the time Chiral GUE & Bosonic Replicas ?
Applied Mathematics [ ] 21 Bosonic Replicas Fermionic Replicas F. Wegner Larkin, Efetov & Khmelnitskii 1985 First Critique (Random Matrices) Verbaarschot & Zirnbauer 1999 Kamenev & Mézard Replica Symmetry Breaking (RMT) first nonperturbative results Second Critique 1999 Zirnbauer ? “KM procedure is mathematically questionable …” Efetov’s SUSY FT Nonperturbative RMT results ! 40 : Exact Replicas EK fermionic replicas 2007 Exact Bosonic Replicas VO, EK 2003 SUSY Replicas Splittorff & Verbaarschot excursion through the time Chiral GUE & Bosonic Replicas 56 : 1
GUE Applied Mathematics [ ] 20 Why replicas ? What are the replicas ? What does make them so different from other field theories ? Fermionic replica FT: Bosonic replica FT: Chiral GUE & Bosonic Replicas what are the replicas ?
GUE Applied Mathematics [ ] 19 Why replicas ? What are the replicas ? What does make them so different from other field theories ? How to reconcile ? analytic continuation integration over matrices of noninteger dimensions Chiral GUE & Bosonic Replicas what are the replicas ?
Applied Mathematics [ ] 18 Why replicas ? What are the replicas ? What does make them so different from other field theories ? integration over matrices of noninteger dimensions Continuous geometry of replica σ – models Discrete geometry of SUSY/Keldysh σ – models continuous geometry Chiral GUE & Bosonic Replicas GUE
Applied Mathematics [ ] 17 outline reminder What is the problem and available theoretical tools ? On the asymmetry in performance of fermionic and bosonic replicas and continuous geometry of replica FTs Why replicas ? What are the replicas ? What does make them so different from other field theories ? Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 16 asymmetry, continuous geometry On the asymmetry in performance of fermionic and bosonic replicas and continuous geometry of replica FTs The equivalent saddles bring the same DoS without taking the replica limit The equivalent saddles bring totally different DoS in the replica limit Which saddle is correct ? No a-priori way to answer !! GUE: fermionic replicas a-la KM (DoS) The saddle point approach fails to accommodate the true, continuous geometry of fermionic replica field theories !! vs Chiral GUE & Bosonic Replicas EK, 2002 Exact Replicas !! Approximate Replicas
Applied Mathematics [ ] 15 On the asymmetry in performance of fermionic and bosonic replicas and continuous geometry of replica FTs The replica limit brings no oscillations in DoS GUE: bosonic replicas a-la KM (DoS) Bosonic replicas are deficient… (Asymmetry !!) Are Bosonic Replicas Faulty ? Chiral GUE & Bosonic Replicas asymmetry, continuous geometry Approximate Replicas
do not analytically continue from an approximate result !! Applied Mathematics [ ] 14 major fault On the asymmetry in performance of fermionic and bosonic replicas and continuous geometry of replica FTs Chiral GUE & Bosonic Replicas
do not analytically continue from an approximate result !! Applied Mathematics [ ] 13 On the asymmetry in performance of fermionic and bosonic replicas and continuous geometry of replica FTs (the major fault of Kamenev & Mezard treatment in 1999) major fault Chiral GUE & Bosonic Replicas
Applied Mathematics [ ] 12 What is the problem and available theoretical tools ? On the asymmetry in performance of fermionic and bosonic replicas and continuous geometry of replica FTs Why replicas ? What are the replicas ? What does make them so different from other field theories ? Integrability of (bosonic) replica field theories: Microscopic density of states in chGUE Chiral GUE & Bosonic Replicas outline reminder
Applied Mathematics [ ] 11 integrability of replicas: general theory Goal: Nonperturbative evaluation of this RPF Object: Replica partition function (RPF) Chiral GUE & Bosonic Replicas Dyson’s β = 2 symmetry multi(band) structure “Confinement” potential (allowed to depend on n ) accommodates physical parameters of the theory Result: Nonlinear differential equation for RPF containing the replica index as a parameter Method: “Deform and study !!” Date, Kashiwara, Jimbo & Miwa 1983 Mironov & Morozov 1990 Adler, Shiota & van Moerbeke 1995 Deform !! Study !! Project !! ! Nonlinear differential equation for RPF
Applied Mathematics [ ] 10 integrability of replicas: general theory Object: Replica partition function (RPF) Chiral GUE & Bosonic Replicas Method: “Deform and study !!” Date, Kashiwara, Jimbo & Miwa 1983 Mironov & Morozov 1990 Adler, Shiota & van Moerbeke 1995 Study !! Describes response of the quantum system to an infinite dimensional perturbation that preserves the system symmetry – Integrable Hierarchies Reflect invariance of the tau-function under the change of integration variables – Loop Equations First ingredient: Bilinear identity Second ingredient: (Linear) Virasoro constraints Projection onto and Generates nonlinear differential equations and hierarchies for RPF in terms of physical parameters
Applied Mathematics [ ] 09 integrability of replicas: general theory Object: Replica partition function (RPF) Chiral GUE & Bosonic Replicas Method: “Deform and study !!” Describes response of the quantum system to an infinite dimensional perturbation that preserves the system symmetry – Integrable Hierarchies First ingredient: Bilinear identity Kadomtsev-Petviashvili hierarchy modified KP hierarchy multicomponent KP hierarchy Toda Lattice hierarchy First Equation of the KP Hierarchy in the t –space
Applied Mathematics [ ] 08 integrability of replicas: general theory Object: Replica partition function (RPF) Chiral GUE & Bosonic Replicas Method: “Deform and study !!” Describes response of the quantum system to an infinite dimensional perturbation that preserves the system symmetry – Integrable Hierarchies First ingredient: Bilinear identity Reflect invariance of the tau-function under the change of integration variables – Loop Equations Second ingredient: (Linear) Virasoro constraints more of an art Calculated in terms of
Applied Mathematics [ ] 07 integrability of replicas: general theory Object: Replica partition function (RPF) Chiral GUE & Bosonic Replicas Method: “Deform and study !!” Describes response of the quantum system to an infinite dimensional perturbation that preserves the system symmetry – Integrable Hierarchies First ingredient: Bilinear identity Reflect invariance of the tau-function under the change of integration variables – Loop Equations Second ingredient: (Linear) Virasoro constraints Projection onto and Generates nonlinear differential equations and hierarchies for RPF in terms of physical parameters t – Toda → Toda Lattice in physical parameters t – KP Eq → Painlevé-like in physical parameters
Applied Mathematics [ ] 06 example: microscopic density in chGUE The chGUE model Chiral GUE & Bosonic Replicas def: bosonic partition function bosonic partition function after replica mapping
Applied Mathematics [ ] 05 example: microscopic density in chGUE The chGUE model Chiral GUE & Bosonic Replicas bosonic partition function after replica mapping general theory applies
Applied Mathematics [ ] 04 example: microscopic density in chGUE The chGUE model Chiral GUE & Bosonic Replicas general theory applies Object: Replica partition function (RPF) Method: “Deform and study !!” Describes response of the quantum system to an infinite dimensional perturbation that preserves the system symmetry – Integrable Hierarchies First ingredient: Bilinear identity Reflect invariance of the tau-function under the change of integration variables – Loop Equations Second ingredient: (Linear) Virasoro constraints Projection onto and Generates nonlinear differential equations and hierarchies for RPF in terms of physical parameters t – Toda → Toda Lattice in physical parameters t – KP Eq → Painlevé-like in physical parameters First KP equation Virasoro constraints nonlinear differential equation for nonlinear differential
Applied Mathematics [ ] 03 example: microscopic density in chGUE The chGUE model Chiral GUE & Bosonic Replicas nonlinear differential equation for + boundary conditions chGUE bosonic partition function after replica mapping Bottom Line Bosonic replicas !!
Conclusions Applied Mathematics [ ] 02 conclusions Chiral GUE & Bosonic Replicas
Random Matrix Theory: Recent Applications, Niels Bohr Institute, May 8, 2007 Vladimir Al. Osipov Eugene Kanzieper Applied Mathematics [ ] 01 arXiv: [cond-mat.dis-nn] Bosonic Replicas Chiral GUE and Chiral GUE & Bosonic Replicas