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7. Vector Manifestation. M.H. and K.Yamawaki, Phys. Rev. Lett. 86 , 757 (2001) M.H. and K.Yamawaki, Phys. Rev. Lett. 87 , 152001 (2001). 7.1. Vector Manifestation of Chiral Symmetry Restoration. ☆ Vector Manifestation. ・・・ Wigner realization of chiral symmetry.
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7. Vector Manifestation • M.H. and K.Yamawaki, Phys. Rev. Lett. 86, 757 (2001) • M.H. and K.Yamawaki, Phys. Rev. Lett. 87, 152001 (2001)
7.1. Vector Manifestation of Chiral Symmetry Restoration
☆ Vector Manifestation ・・・ Wigner realization of chiral symmetry ρ = chiral partner of π c.f. conventional linear-sigma model manifestation scalar meson = chiral partner of π
Quark Structure and Chiral representation coupling to currents and densities (S. Weinberg, 69’)
Chiral Restoration vector manifestation linear sigma model
7.2. Formulation of Vector Manifestation
◎ Π = Π is satisfied in OPE A V How do we realize Π = Π in hadronic picture ? A V ☆ Formulation of vector manifestation ◎ Chiral symmetry restoration is characterized by
When we approach to the critical point • from the broken phase, • Π・・・ dominated by the massless π • Π・・・ dominated by the massive ρ A • There exists a scale Λ around which • Π and Π are well described by the bare HLS. V A V ☆ Basic assumptions • The HLS can be matched with QCD around Λ.
◎ current correlators in the bare HLS Note : F (0) → 0 can occur by the dynamics of the HLS π ◎ Wilsonian matching ◎ VM conditions
◎ VM conditions + Wilsonian RGEs ☆ Vector Manifestation
7.3. Chiral Phase Transition in large flavor QCD
(N = 3 in the real world ... u, d, s) f N f cr N clue to ordinary QCD f application to chiral phase transition in hot and/or dense QCD large flavor QCD (Increase number of light flavors) chiral phase transition N = 3 f chiral broken phase symmetric phase 33/2 non-asymptotic free
☆ Running coupling in QCD N flavors f ; α* → small for N → large f α cr chiral restoration for N → N large N f f f α * E small N f • two-loop β function ・・・ ◎ b > 0 and c < 0 → α* (IR fixed point)
7.4. Vector Manifestation in large flavor QCD
☆ F (0) → 0 occurs in HLS for large N ? π f cr ◎ VM conditions for N → N f f ・・・ small N dependence f ; chiral restoration !
cr ☆ Vector Manifestation occurs for N → N f f ρ = Chiral Partner of π
☆ VM and fixed point ◎ VM limit (X, a, g) → (1, 1, 0) at restoration point fixed point of RGEs • VM is governed by fixed point
cr ☆ Estimation of N f ;
7.5. Nf-Dependence of the Parameters
☆ Simple anzatz for parameters in OPE ・・・ RGE invariant
☆ Assumptions for HLS parameters ; • Wilsonian matching condition
KSRF II KSRF I ⇔ low energy theorem of HLS • Low energy theorem is satisfied by the on-shell quantities. • KSRF II is violated.
7.6. Vector Dominance in Large Nf QCD
☆ Vector dominance in Nf = 3 QCD ・ In N = 3 QCD ~ real world f characterized by
☆ Vector dominance in large flavor QCD • VD is characterized by Large violation of VD near restoration point