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BRANE SOLUTIONS AND RG FLOW. FRANCISCO A. BRITO. UNIVERSIDADE FEDERAL DE CAMPINA GRANDE. September 2006. BRANE SOLUTIONS AND RG FLOW. INTRODUCTION. Compactification - Factorizable - Non-factorizable ( phenomenology d=4 )
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BRANE SOLUTIONS AND RG FLOW FRANCISCO A. BRITO UNIVERSIDADE FEDERAL DE CAMPINA GRANDE September 2006
BRANE SOLUTIONS AND RG FLOW • INTRODUCTION • Compactification • - Factorizable • - Non-factorizable • (phenomenology d=4) • * Other interests (BTZ black holes, gravity in 2d string theory, and sugra 10 and 11 to lower dimensions > 4) • ii) Dualidade gauge/gravity (e.g. AdS/CFT) • - gravity duals (brane solutions): D - dimensions • - RG flow of a dual field theory: (D-1) - dimensions
BRANE SOLUTIONS AND RG FLOW D = 26 BOSONIC STRINGS SUPERSTRINGS D = 10 COMPACTIFICATIONS OF SIX DIM
M10 = M4 X K6 “factorizable geometry” BRANE SOLUTIONS AND RG FLOW D = 26 BOSONIC STRINGS SUPERSTRINGS D = 10 COMPACTIFICATIONS OF SIX DIM Our four dim universe Compact 6-manifold
NON-FACTORIZABLE “WARPED GEOMETRY” BRANE SOLUTIONS AND RG FLOW • AN ALTERNATIVE TO COMPACTIFICATION Randall & Sundrum, (1999) NON-COMPACT DIMENSION 3-BRANE r M4 ½ AdS5 • OUR UNIVERSE ON A 3-BRANE
, = 0, 1, 2, 3 (brane world-volume indices) e 2A(r)≡ warp factor BRANE SOLUTIONS AND RG FLOW • AdS5 METRIC ds52= e2A(r) dx dx + dr2
A = - k |r| SOLUTION: |5| = 12 k2 = σ2 / 12 e 2A (r) A (r) r r BRANE SOLUTIONS AND RG FLOW • THE Randall-Sundrum SCENARIO
BRANE SOLUTIONS AND RG FLOW • GRAVITY FLUCTUATIONS
BRANE SOLUTIONS AND RG FLOW • GRAVITY FLUCTUATIONS
H = Q+Q Q = r + 3r A(r) _ H (r) = m2(r) 2 BRANE SOLUTIONS AND RG FLOW • GRAVITY FLUCTUATIONS
H = Q+Q Q = r + 3z A(r) _ 2 SOLUTION: BRANE SOLUTIONS AND RG FLOW • GRAVITY FLUCTUATIONS H (r) = m2(r) • Zero Mode: m = 0 H o = 0 Q o = 0 o e 3/2 A(r) ) )
H = Q+Q Q = r + 3r A(r) _ 2 BRANE SOLUTIONS AND RG FLOW • GRAVITY FLUCTUATIONS H (r) = m2(r) • Zero Mode: m = 0 H o = 0 Q o = 0 o e 3/2 A(r) SOLUTION: ) )
o e -3/2 k |r| r BRANE SOLUTIONS AND RG FLOW Localization of Gravity!
H = Q+Q Q = r + 3r A(r) _ 2 BRANE SOLUTIONS AND RG FLOW • GRAVITY FLUCTUATIONS H (r) = m2(r) • Zero Mode: m = 0 H o = 0 Q o = 0 o e 3/2 A(r) SOLUTION: ) ) o e -3/2 k |r| Localization of gravity! r
V(z) z BRANE SOLUTIONS AND RG FLOW • Massive modes
V(z) z BRANE SOLUTIONS AND RG FLOW • Massive modes
V(z) z BRANE SOLUTIONS AND RG FLOW • Massive modes KK modes
BRANE SOLUTIONS AND RG FLOW • Massive modes V(z) z
Correction of Newtonian Potential! BRANE SOLUTIONS AND RG FLOW • Massive modes
BRANE SOLUTIONS AND RG FLOW Gregory, Rubakov & Sibiryakov (2000) • GRS SCENARIO Massive gravity: metastable gravity
BRANE SOLUTIONS AND RG FLOW Gregory, Rubakov & Sibiryakov (2000) • GRS SCENARIO Massive gravity: metastable gravity
Flat brane embeded into 5d Minkowski bulk: infinite volume! No zero modes A rc rc r 0 σ < 0 σ < 0 σ > 0 BRANE SOLUTIONS AND RG FLOW • GRS SCENARIO
BRANE SOLUTIONS AND RG FLOW • ASYMMETRIC BRANES Brito & Gomes (work in progress) Finite volume massive modes
L R >> Rc R << Rc 2 1 log R BRANE SOLUTIONS AND RG FLOW U (R) ~ 1 / RL
- - ds2= eA(r)gdx dx + dr2 ds2= eA(r)gdx dx + dr2 dS4 M4 AdS4 - Λ→ four dimensional - - - Λ = 0 Λ > 0 Λ < 0 cosmological constant BRANE SOLUTIONS AND RG FLOW Karch & Randall (2001) • LOCALLY LOCALIZED GRAVITY
AdS4 (Local localization) A (r) r BRANE SOLUTIONS AND RG FLOW • LOCALLY LOCALIZED GRAVITY
AdS4 (Local localization) A (r) M4 r BRANE SOLUTIONS AND RG FLOW • LOCALLY LOCALIZED GRAVITY A = -k |r|
AdS4 (Local localization) dS4 BRANE SOLUTIONS AND RG FLOW • LOCALLY LOCALIZED GRAVITY A (r) M4 r A = -k |r| “No global issues !” e. g. infinite volume
AdS4 V (z) z BRANE SOLUTIONS AND RG FLOW • SCHROEDINGER POTENTIAL
AdS4 BRANE SOLUTIONS AND RG FLOW V (z) • SCHROEDINGER POTENTIAL z M4
dS4 BRANE SOLUTIONS AND RG FLOW AdS4 V (z) • SCHROEDINGER POTENTIAL z M4
BRANE SOLUTIONS AND RG FLOW AdS4 V (z) • SCHROEDINGER POTENTIAL dS4 z Quase-zero mode emerges M4 (Massive) GRAVITY LOCALIZATION : A LOCAL EFFECT !!
- - Λ = L-2 [ σ (T)2 – σ* ] Λ = L-2 [ σ (T)2 – σ* ] Brane tension depending on temperature 4 dim cosmological constant σ T BRANE SOLUTIONS AND RG FLOW • GEOMETRIC TRANSITIONS & LOCALLY LOCALIZED GRAVITY Brito, Bazeia & Gomes (2004)
- - - Λ = 0 Λ > 0 Λ < 0 T 0 ∞ T* critical temperature BRANE SOLUTIONS AND RG FLOW • GEOMETRIC TRANSITIONS & LOCALLY LOCALIZED GRAVITY Susy Breaking dS4 M4 AdS4
; BRANE SOLUTIONS AND RG FLOW Cvetic et al (2000) Brito & Cvetic (2001) Bazeia, Brito & Nascimento (2003) • SUPERGRAVITY ACTION 5 dim cosmological constant → critical points W - superpotential
Supergravity multiplet: (eam, im) (, im) Scalar super multiplet: ; im eam ; ; BRANE SOLUTIONS AND RG FLOW • SUPERGRAVITY ACTION • CONTENTS TURNED ON S = 0 UNDER SUSY TRANSFORMATIONS!!!!
energy scale (AdS/CFT) = 0 n = 0 or BRANE SOLUTIONS AND RG FLOW Skenderis & Townsend (1999) Freedman et al (1999) Kallosh & Linde (2000) Cvetic & Behrndt (2000) • THE SUSY FLOW EQUATIONS ds2= a2 (r) dx dx + dr2 • KILLING EQUATIONS (i)’ = ± 3 g i j j W ) ) g i j - metric definied on moduli space
(i)’ = 0 ) j W (i* ) = 0 ) ) BRANE SOLUTIONS AND RG FLOW • THE SUSY FLOW EQUATIONS • CRITICAL POINTS i (r →∞) = i*
(i)’ = 0 ) j W (i* ) = 0 ) ) W * * BRANE SOLUTIONS AND RG FLOW • THE SUSY FLOW EQUATIONS • CRITICAL POINTS i (r →∞) = i* Flow
X BRANE SOLUTIONS AND RG FLOW • RG EQUATION
RG EQUATION ON THE FIELD THEORY SIDE a – energy scale i - couplings BRANE SOLUTIONS AND RG FLOW • RG EQUATION where
BRANE SOLUTIONS AND RG FLOW • RG EQUATION where
Restrictions on W? BRANE SOLUTIONS AND RG FLOW • RG EQUATION where
BRANE SOLUTIONS AND RG FLOW • SPECIAL GEOMETRIES Thus we find Assuming perturbation as ; ci = constant
r →∞ > 0 a →∞ i → 0 ; e 2 A ( r) r IR UV BRANE SOLUTIONS AND RG FLOW Not good for localizing gravity! • SPECIAL GEOMETRIES • i) SUGRA D = 5 STABLE CRITICAL POINT UV FIXED POINT (QFT) ) QFT on AdS boundary AdS5 solution: a (r) = e k r UNSTABLE IR
r →∞ STABLE CRITICAL POINT i → 0 a → 0 ; e 2 A ( r) r BRANE SOLUTIONS AND RG FLOW < 0 • ii) GRAVITY LOCALIZATION : i = ci a || • SPECIAL GEOMETRIES “IR FIXED POINT” AdS5 solution: a (r) = e -k r
a (r) = e –k |r| INTRODUCING A BRANE: r →∞ zero mode STABLE CRITICAL POINT i → 0 o e-k|r| a → 0 ; e 2 A ( r) r LOCALIZATION OF GRAVITY!! (Massless) BRANE SOLUTIONS AND RG FLOW • SPECIAL GEOMETRIES Two copies of AdS5 pasted together
“fake sugra” BRANE SOLUTIONS AND RG FLOW NEW DEVELOPMENTS Freedman et al. (2004) Bazeia et al. (2006) Brito, Bazeia, Losano (work in progress) • FIRST ORDER FORMALISM AND “BENT” BRANES:
BRANE SOLUTIONS AND RG FLOW NEW DEVELOPMENTS Freedman et al. (2004) Bazeia et al. (2006) Brito, Bazeia, Losano (work in progress) • FIRST ORDER FORMALISM AND “BENT” BRANES: • “BENT” BRANE GEOMETRIES
BRANE SOLUTIONS AND RG FLOW NEW DEVELOPMENTS Freedman et al. (2004) Bazeia et al. (2006) Brito, Bazeia, Losano (work in progress) • FIRST ORDER FORMALISM AND “BENT” BRANES: • “BENT” BRANE GEOMETRIES
