From Weak to Strong Coupling in N =4 SYM Theory From Weak to Strong Coupling in N =4 SYM Theory Igor Klebanov Department of Physics Talk at Rutgers University.

From Weak to Strong Coupling in N =4 SYM Theory From Weak to Strong Coupling in N =4 SYM Theory Igor Klebanov Department of Physics Talk at Rutgers University March 6, 2007

Large N Gauge Theories Connection of gauge theory with string theory is most apparent in `t Hooft’s generalization from 3 colors (SU(3) gauge group) to N colors (SU(N) gauge group). Connection of gauge theory with string theory is most apparent in `t Hooft’s generalization from 3 colors (SU(3) gauge group) to N colors (SU(N) gauge group). Make N large, while keeping the `t Hooft coupling fixed: Make N large, while keeping the `t Hooft coupling fixed: The probability of snapping a flux tube by quark-antiquark creation (meson decay) is 1/N. The string coupling is 1/N. The probability of snapping a flux tube by quark-antiquark creation (meson decay) is 1/N. The string coupling is 1/N. In the large N limit only planar diagrams contribute, but 4-d gauge theory is still very difficult. In the large N limit only planar diagrams contribute, but 4-d gauge theory is still very difficult.

Breaking the Ice Dirichlet branes (Polchinski) led string theory back to gauge theory in the mid-90’s. Dirichlet branes (Polchinski) led string theory back to gauge theory in the mid-90’s. A stack of N Dirichlet 3-branes realizes N =4 supersymmetric SU(N) gauge theory in 4 dimensions. It also creates a curved background of 10-d theory of closed superstrings (artwork by E.Imeroni) A stack of N Dirichlet 3-branes realizes N =4 supersymmetric SU(N) gauge theory in 4 dimensions. It also creates a curved background of 10-d theory of closed superstrings (artwork by E.Imeroni) which for small r approaches which for small r approaches Successful matching of graviton absorption by D3- branes, related to 2-point function of stress-energy tensor in the SYM theory, with a gravity calculation in the 3-brane metric (IK; Gubser, IK, Tseytlin) was a precursor of the AdS/CFT correspondence. Successful matching of graviton absorption by D3- branes, related to 2-point function of stress-energy tensor in the SYM theory, with a gravity calculation in the 3-brane metric (IK; Gubser, IK, Tseytlin) was a precursor of the AdS/CFT correspondence.

Super-Conformal Invariance In the N =4 SYM theory there are 6 scalar fields (it is useful to combine them into 3 complex scalars: Z, W, V) and 4 gluinos interacting with the gluons. All the fields are in the adjoint representation of the SU(N) gauge group. In the N =4 SYM theory there are 6 scalar fields (it is useful to combine them into 3 complex scalars: Z, W, V) and 4 gluinos interacting with the gluons. All the fields are in the adjoint representation of the SU(N) gauge group. The Asymptotic Freedom is canceled by the extra fields; the beta function is exactly zero for any complex coupling. The theory is invariant under scale transformations x  -> a x   It is also invariant under space-time inversions. The full super-conformal group is SU(2,2|4). The Asymptotic Freedom is canceled by the extra fields; the beta function is exactly zero for any complex coupling. The theory is invariant under scale transformations x  -> a x   It is also invariant under space-time inversions. The full super-conformal group is SU(2,2|4). It is interesting to study observables of the planar theory as functions of the `t Hooft coupling l. It is interesting to study observables of the planar theory as functions of the `t Hooft coupling l.

Entropy of thermal supersymmetric SU(N) theory Thermal CFT is described by a near- extremal 3-brane background whose near- horizon form is a black hole in AdS 5 Thermal CFT is described by a near- extremal 3-brane background whose near- horizon form is a black hole in AdS 5 The CFT temperature is identified with the Hawking T of the horizon located at z h The CFT temperature is identified with the Hawking T of the horizon located at z h Any event horizon contains Bekenstein- Hawking entropy Any event horizon contains Bekenstein- Hawking entropy A brief calculation gives the entropy density Gubser, IK, Peet A brief calculation gives the entropy density Gubser, IK, Peet

This is interpreted as the strong coupling limit of This is interpreted as the strong coupling limit of The weak `t Hooft coupling behavior of the interpolating function is determined by Feynman graph calculations in the N =4 SYM theory The weak `t Hooft coupling behavior of the interpolating function is determined by Feynman graph calculations in the N =4 SYM theory We deduce from AdS/CFT duality that We deduce from AdS/CFT duality that The entropy density is multiplied only by ¾ as the coupling changes from zero to infinity. Gubser, IK, Tseytlin The entropy density is multiplied only by ¾ as the coupling changes from zero to infinity. Gubser, IK, Tseytlin

Corrections to the interpolating function at strong coupling come from the higher- derivative terms in the type IIB effective action: Corrections to the interpolating function at strong coupling come from the higher- derivative terms in the type IIB effective action: Gubser, IK, Tseytlin Gubser, IK, Tseytlin The interpolating function is usually assumed to have a smooth monotonic form, but so far we do not know its form at the intermediate coupling. The interpolating function is usually assumed to have a smooth monotonic form, but so far we do not know its form at the intermediate coupling.

A similar reduction of entropy by strong-coupling effects is observed in lattice non-supersymmetric gauge theories for N=3: the arrows show free field values. A similar reduction of entropy by strong-coupling effects is observed in lattice non-supersymmetric gauge theories for N=3: the arrows show free field values. Karsch (hep-lat/0106019). Karsch (hep-lat/0106019). N-dependence in the pure glue theory enters largely through the overall normalization. N-dependence in the pure glue theory enters largely through the overall normalization. Bringoltz and Teper (hep-lat/0506034) Bringoltz and Teper (hep-lat/0506034)

The AdS/CFT duality Maldacena; Gubser, IK, Polyakov; Witten Relates conformal gauge theory in 4 dimensions to string theory on 5-d Anti-de Sitter space times a 5-d compact space. For the N =4 SYM theory this compact space is a 5-d sphere. Relates conformal gauge theory in 4 dimensions to string theory on 5-d Anti-de Sitter space times a 5-d compact space. For the N =4 SYM theory this compact space is a 5-d sphere. When a gauge theory is strongly coupled, the radius of curvature of the dual AdS 5 and of the 5-d compact space becomes large: When a gauge theory is strongly coupled, the radius of curvature of the dual AdS 5 and of the 5-d compact space becomes large: String theory in such a weakly curved background can be studied in the effective (super)-gravity approximation, which allows for a host of explicit calculations. Corrections to it proceed in powers of String theory in such a weakly curved background can be studied in the effective (super)-gravity approximation, which allows for a host of explicit calculations. Corrections to it proceed in powers of Feynman graphs instead develop a weak coupling expansion in powers of  At weak coupling the dual string theory becomes difficult. Feynman graphs instead develop a weak coupling expansion in powers of  At weak coupling the dual string theory becomes difficult.

Gauge invariant operators in the CFT 4 are in one-to-one correspondence with fields (or extended objects) in AdS 5 Gauge invariant operators in the CFT 4 are in one-to-one correspondence with fields (or extended objects) in AdS 5 Operator dimension is determined by the mass of the dual field; e.g. for scalar operators GKPW Operator dimension is determined by the mass of the dual field; e.g. for scalar operators GKPW The BPS protected operators are dual to SUGRA fields of m~1/L. Their dimensions are independent of l. The BPS protected operators are dual to SUGRA fields of m~1/L. Their dimensions are independent of l. The unprotected operators (Konishi operator is the simplest) are dual to massive string states. AdS/CFT predicts that at strong coupling their dimensions grow as l 1/4. The unprotected operators (Konishi operator is the simplest) are dual to massive string states. AdS/CFT predicts that at strong coupling their dimensions grow as l 1/4.

Until recently, the only (probably) exact non-BPS interpolating function was the expectation value of a circular Wilson loop obtained from rainbow graph summation Erickson, Semenoff, Zarembo Until recently, the only (probably) exact non-BPS interpolating function was the expectation value of a circular Wilson loop obtained from rainbow graph summation Erickson, Semenoff, Zarembo Here the radius of convergence of ln W is related to the zero of the Bessel function J 1. Here the radius of convergence of ln W is related to the zero of the Bessel function J 1. There is an infinite number of branch points at negative l. There is an infinite number of branch points at negative l. The strong coupling limit The strong coupling limit is in agreement with the AdS calculation. is in agreement with the AdS calculation.

Exact Integrability Perturbative calculations of anomalous dimensions are Perturbative calculations of anomalous dimensions are mapped to integrable spin chains, suggesting exact mapped to integrable spin chains, suggesting exact integrability of the N =4 SYM theory. Minahan, Zarembo; Beisert, Staudacher integrability of the N =4 SYM theory. Minahan, Zarembo; Beisert, Staudacher For example, for the `SU(2) sector’ operators For example, for the `SU(2) sector’ operators Tr (ZZZWZW…ZW), where Z and W are two complex scalars, the Heisenberg spin chain emerges at 1 loop. Higher loops correct the Hamiltonian but seem to preserve its integrability. Tr (ZZZWZW…ZW), where Z and W are two complex scalars, the Heisenberg spin chain emerges at 1 loop. Higher loops correct the Hamiltonian but seem to preserve its integrability. This meshes nicely with earlier findings of integrability in certain subsectors of QCD. Lipatov; Faddeev, Korchemsky; Braun, Derkachov, Manashov This meshes nicely with earlier findings of integrability in certain subsectors of QCD. Lipatov; Faddeev, Korchemsky; Braun, Derkachov, Manashov The dual string theory approach indicates that in the SYM theory the exact integrability is present at very strong coupling (Bena, Polchinski, Roiban). Hence it is likely to exist for all values of the coupling. The dual string theory approach indicates that in the SYM theory the exact integrability is present at very strong coupling (Bena, Polchinski, Roiban). Hence it is likely to exist for all values of the coupling.

Spinning Strings vs. Highly Charged Operators Vibrating closed strings with large angular momentum on the 5-sphere are dual to SYM operators with large R-charge (the number of fields Z) Berenstein, Maldacena, Nastase Vibrating closed strings with large angular momentum on the 5-sphere are dual to SYM operators with large R-charge (the number of fields Z) Berenstein, Maldacena, Nastase Generally, semi-classical spinning strings are dual to long operators, e.g. the dual of a high-spin operator Generally, semi-classical spinning strings are dual to long operators, e.g. the dual of a high-spin operator is a folded string spinning around the center of AdS 5. Gubser, IK, Polyakov is a folded string spinning around the center of AdS 5. Gubser, IK, Polyakov

The structure of dimensions of high-spin operators is The structure of dimensions of high-spin operators is The universal function f(g) is independent of the twist; it is universal in the planar limit. The universal function f(g) is independent of the twist; it is universal in the planar limit. It also enters the cusp anomaly of It also enters the cusp anomaly of Wilson loops in Minkowski space. Wilson loops in Minkowski space. This can be calculated using This can be calculated using AdS/CFT. Kruczenski AdS/CFT. Kruczenski

At strong coupling, the AdS/CFT corresponds predicts via the spinning string energy calculations Gubser, IK, Polyakov; Frolov, Tseytlin At strong coupling, the AdS/CFT corresponds predicts via the spinning string energy calculations Gubser, IK, Polyakov; Frolov, Tseytlin At weak coupling the expansion of the universal function f(g) up to 3 loops is At weak coupling the expansion of the universal function f(g) up to 3 loops is

The coefficients in f(g) are related to the corresponding coefficients in QCD through selecting at each order the term with the highest transcendentality. Kotikov, Lipatov, Onishchenko, Velizhanin The coefficients in f(g) are related to the corresponding coefficients in QCD through selecting at each order the term with the highest transcendentality. Kotikov, Lipatov, Onishchenko, Velizhanin Recently, great progress has been achieved on finding f(g) at 4 loops and beyond! Recently, great progress has been achieved on finding f(g) at 4 loops and beyond! Using the of the spin chain symmetries, the Bethe ansatz equations were restricted to the form Staudacher, Beisert Using the of the spin chain symmetries, the Bethe ansatz equations were restricted to the form Staudacher, Beisert

The magnon dispersion relation is The magnon dispersion relation is The complex x-variables encode the momentum p and energy C: The complex x-variables encode the momentum p and energy C: Of particular importance is the crossing symmetry (Janik) Of particular importance is the crossing symmetry (Janik)

The Dressing Phase The `dressing phase’ in the magnon S-matrix appears first at 4-loop order in perturbation theory: The `dressing phase’ in the magnon S-matrix appears first at 4-loop order in perturbation theory: where q r (u) are eigenvalues of the magnon charges. It was determined first in the large g expansion ( Beisert, Hernandez, Lopez ), and then via appropriate resummation in the small g expansion ( Beisert, Eden, Staudacher ). where q r (u) are eigenvalues of the magnon charges. It was determined first in the large g expansion ( Beisert, Hernandez, Lopez ), and then via appropriate resummation in the small g expansion ( Beisert, Eden, Staudacher ). f(g) is determined through solving an integral equation, which corrects an earlier similar equation derived by Eden and Staudacher (who assumed that the phase vanishes) f(g) is determined through solving an integral equation, which corrects an earlier similar equation derived by Eden and Staudacher (who assumed that the phase vanishes)

The BES kernel is The BES kernel is The first term is the ES kernel The first term is the ES kernel while the second one is due to the dressing phase in the magnon S-matrix while the second one is due to the dressing phase in the magnon S-matrix

Perturbative order-by-order solution of the BES equation gives the 4-loop term in f(g) Perturbative order-by-order solution of the BES equation gives the 4-loop term in f(g) (it differs by relative sign from the ES prediction which did not include the `dressing phase’) (it differs by relative sign from the ES prediction which did not include the `dressing phase’) Remarkably, an independent 4-loop calculation by Bern, Dixon, Czakon, Kosower and Smirnov yielded a numerical value that prompted them to conjecture exactly the same analytical result. Remarkably, an independent 4-loop calculation by Bern, Dixon, Czakon, Kosower and Smirnov yielded a numerical value that prompted them to conjecture exactly the same analytical result. This has led the two groups to the same conjecture for the complete structure of the perturbative expansion of f(g): it is the one yielded by the BES integral equation. This has led the two groups to the same conjecture for the complete structure of the perturbative expansion of f(g): it is the one yielded by the BES integral equation.

This approach yields analytic predictions for all planar perturbative coefficients This approach yields analytic predictions for all planar perturbative coefficients So far the 4-loop answer is only known numerically. Recently, a new method yielded improved numerical precision and agrees with the analytical prediction to around 0.001%. So far the 4-loop answer is only known numerically. Recently, a new method yielded improved numerical precision and agrees with the analytical prediction to around 0.001%. Cachazo, Spradlin, Volovich Cachazo, Spradlin, Volovich

The alternation of the series and the geometric behavior of the coefficients remove all singularities from the real axis, allowing smooth extrapolation to infinite coupling. The alternation of the series and the geometric behavior of the coefficients remove all singularities from the real axis, allowing smooth extrapolation to infinite coupling. The radius of convergence is ¼. The closest singularities are square-root branch points at The radius of convergence is ¼. The closest singularities are square-root branch points at The analytic structure of f(g) is not completely clear, but there appear to be an infinite number of branch cuts along the imaginary axis. There is an essential singularity at infinity. These qualitative features also appear for the circular Wilson loop. The analytic structure of f(g) is not completely clear, but there appear to be an infinite number of branch cuts along the imaginary axis. There is an essential singularity at infinity. These qualitative features also appear for the circular Wilson loop.

To solve the equation at finite coupling, we use a basis of linearly independent functions To solve the equation at finite coupling, we use a basis of linearly independent functions Determination of is tantamount to inverting an infinite matrix. Determination of is tantamount to inverting an infinite matrix. Truncation to finite matrices converges very rapidly. Benna, Benvenuti, IK, Scardicchio Truncation to finite matrices converges very rapidly. Benna, Benvenuti, IK, Scardicchio

The blue line refers to the BES equation, red line to the ES, green line to the equation where the dressing kernel is divided by 2. The blue line refers to the BES equation, red line to the ES, green line to the equation where the dressing kernel is divided by 2. The first two terms of the BES large g asymptotics are in very precise agreement with the AdS/CFT spinning string predictions. The first two terms of the BES large g asymptotics are in very precise agreement with the AdS/CFT spinning string predictions.

Recently, the exact analytic solution was obtained for the leading order BES equation. Alday, Arutyunov, Benna, Eden, IK; Kostov, Serban, Volin Recently, the exact analytic solution was obtained for the leading order BES equation. Alday, Arutyunov, Benna, Eden, IK; Kostov, Serban, Volin Expanding at strong coupling, Expanding at strong coupling, The solution is The solution is Since s 1 =1/2, this proves that Since s 1 =1/2, this proves that f(g)= 4 g + O(1) f(g)= 4 g + O(1)

Quark Anti-Quark Potential Quark Anti-Quark Potential The z-direction is dual to the energy scale of the gauge theory: small z is the UV; large z is the IR. The z-direction is dual to the energy scale of the gauge theory: small z is the UV; large z is the IR. In a pleasant surprise, because of the 5-th dimension z, the string picture applies even to theories that are conformal (not confining!). The quark and antiquark are placed at the boundary of Anti-de Sitter space (z=0), but the string connecting them bends into the interior (z>0). Due to the scaling symmetry of the AdS space, this gives Coulomb potential (Maldacena; Rey, Yee) In a pleasant surprise, because of the 5-th dimension z, the string picture applies even to theories that are conformal (not confining!). The quark and antiquark are placed at the boundary of Anti-de Sitter space (z=0), but the string connecting them bends into the interior (z>0). Due to the scaling symmetry of the AdS space, this gives Coulomb potential (Maldacena; Rey, Yee)

Excitations of the Gluonic String Callan, Guijosa; Brower, Tan, Thorn; IK, Maldacena, Thorn Excitations of the Gluonic String Callan, Guijosa; Brower, Tan, Thorn; IK, Maldacena, Thorn The spectrum of small oscillations of the string with Dirichlet boundary conditions at z=0 is known: The spectrum of small oscillations of the string with Dirichlet boundary conditions at z=0 is known: By conformal invariance, all energies scale inversely with quark anti-quark distance L. Their spectrum is known, and they correspond to gluonic excitations at strong `t Hooft coupling. By conformal invariance, all energies scale inversely with quark anti-quark distance L. Their spectrum is known, and they correspond to gluonic excitations at strong `t Hooft coupling. But at weak coupling there are no such excitations: only the ground state of energy where But at weak coupling there are no such excitations: only the ground state of energy where

A simplified model where only ladder graphs are summed indicates that the coupling where an infinite number of excitations appear is A simplified model where only ladder graphs are summed indicates that the coupling where an infinite number of excitations appear is Their appearance is related to the fall-to-the center instability in the bound state equation Their appearance is related to the fall-to-the center instability in the bound state equation The near-threshold bound states are in exact agreement with the spectrum of a highly excited string containing a single very long fold: The near-threshold bound states are in exact agreement with the spectrum of a highly excited string containing a single very long fold:

Is such a `fall to the center’ transition possible in QCD? Apparently not, since the asymptotic freedom makes the coupling weak when the ends of the string approach each other. Apparently not, since the asymptotic freedom makes the coupling weak when the ends of the string approach each other. A recent lattice calculation of the string excitation spectrum shows this explicitly. Only one level exists with energy much lower than others at short separation. Juge, Kuti, Morningstar A recent lattice calculation of the string excitation spectrum shows this explicitly. Only one level exists with energy much lower than others at short separation. Juge, Kuti, Morningstar

Why are the flux tube excitations stable in a CFT ? For a combination of energetic and large N reasons! For a combination of energetic and large N reasons! After a gluon is emitted the resulting state would be in a color adjoint, and would have positive energy. Hence, energy conservation forbids one-gluon emission from an excited bound state. After a gluon is emitted the resulting state would be in a color adjoint, and would have positive energy. Hence, energy conservation forbids one-gluon emission from an excited bound state. The energy conservation does not forbid glueball (closed string) emission. But it is suppressed at large N. The energy conservation does not forbid glueball (closed string) emission. But it is suppressed at large N.

Conclusions The AdS/CFT correspondence makes a multitude of dynamical predictions about strongly coupled conformal gauge theories. They always appear to make sense, but are difficult to check quantitatively (e.g., the ¾ in the entropy). The AdS/CFT correspondence makes a multitude of dynamical predictions about strongly coupled conformal gauge theories. They always appear to make sense, but are difficult to check quantitatively (e.g., the ¾ in the entropy). For non-BPS quantities in N =4 SYM, non-trivial interpolating functions appear. Recently, the conjectured integrability has led to determination of the cusp anomaly function. This provides strong new evidence for the validity of the AdS/CFT duality. For non-BPS quantities in N =4 SYM, non-trivial interpolating functions appear. Recently, the conjectured integrability has led to determination of the cusp anomaly function. This provides strong new evidence for the validity of the AdS/CFT duality. The recent developments raise hope of further exact results, and perhaps an eventual proof of AdS/CFT duality. The recent developments raise hope of further exact results, and perhaps an eventual proof of AdS/CFT duality.

The planar N =4 SYM is a rich and complicated theory, and some properties of its spectrum can depend dramatically on the value of the coupling. The planar N =4 SYM is a rich and complicated theory, and some properties of its spectrum can depend dramatically on the value of the coupling.

The z-direction of AdS is dual to the energy scale of the gauge theory: small z is the UV; large z is the IR. The z-direction of AdS is dual to the energy scale of the gauge theory: small z is the UV; large z is the IR. In a pleasant surprise, because of the 5-th dimension z, the string picture applies even to theories that are conformal (not confining!). The quark and antiquark are placed at the boundary of Anti-de Sitter space (z=0), but the string connecting them bends into the interior (z>0). Due to the scaling symmetry of the AdS space, this gives Coulomb potential (Maldacena; Rey, Yee) In a pleasant surprise, because of the 5-th dimension z, the string picture applies even to theories that are conformal (not confining!). The quark and antiquark are placed at the boundary of Anti-de Sitter space (z=0), but the string connecting them bends into the interior (z>0). Due to the scaling symmetry of the AdS space, this gives Coulomb potential (Maldacena; Rey, Yee)

String Theoretic Approaches to Confinement It is possible to generalize the AdS/CFT correspondence in such a way that the quark- antiquark potential is linear at large distance. It is possible to generalize the AdS/CFT correspondence in such a way that the quark- antiquark potential is linear at large distance. The 5-d metric should have a warped form (Polyakov): The 5-d metric should have a warped form (Polyakov): The space ends at a maximum value of z where the warp factor is finite. Then the confining string tension is The space ends at a maximum value of z where the warp factor is finite. Then the confining string tension is

Semi-classical Nambu String Semi-classical quantization around long straight Nambu string predicts the quark- antiquark potential Semi-classical quantization around long straight Nambu string predicts the quark- antiquark potential The coefficient of the universal Luescher term depends only on the space-time dimension d and is proportional to the Regge intercept: The coefficient of the universal Luescher term depends only on the space-time dimension d and is proportional to the Regge intercept:

Comparison with the Lattice Data Luescher, Weisz (2002) Lattice calculations of the force vs. distance produce good agreement with the semi- classical Nambu string for r>0.7 fm: Lattice calculations of the force vs. distance produce good agreement with the semi- classical Nambu string for r>0.7 fm:

Embedding in Flux Compactifications A long warped throat embedded into a compactification with NS-NS and R-R fluxes leads to a small ratio between the IR scale at the bottom of the throat and the string scale. A long warped throat embedded into a compactification with NS-NS and R-R fluxes leads to a small ratio between the IR scale at the bottom of the throat and the string scale. Randall, Sundrum; Verlinde; IK, Strassler; Giddings, Kachru, Polchinski; KKLT; KKLMMT Randall, Sundrum; Verlinde; IK, Strassler; Giddings, Kachru, Polchinski; KKLT; KKLMMT In the dual cascading gauge theory the IR scale is the confinement scale: confinement stabilizes the hierarchy between the Planck scale and the SM or the inflationary scale. In the dual cascading gauge theory the IR scale is the confinement scale: confinement stabilizes the hierarchy between the Planck scale and the SM or the inflationary scale. Cascading gauge theories dual to “standard model throats” may offer interesting possibilities for new physics beyond the standard model. Cascales, Franco, Hanany, Saad, Uranga, … Cascading gauge theories dual to “standard model throats” may offer interesting possibilities for new physics beyond the standard model. Cascales, Franco, Hanany, Saad, Uranga, …

Exact Integrability Perturbative calculations of anomalous dimensions are Perturbative calculations of anomalous dimensions are mapped to integrable spin chains, suggesting exact mapped to integrable spin chains, suggesting exact integrability of the N =4 SYM theory. Minahan, Zarembo; Beisert, Staudacher integrability of the N =4 SYM theory. Minahan, Zarembo; Beisert, Staudacher For example, for the SU(2) sector operators For example, for the SU(2) sector operators Tr (ZZZWZW…ZW), where Z and W are two complex scalars, the Heisenberg spin chain emerges at 1 loop. Higher loops correct the Hamiltonian but seem to preserve its integrability. Tr (ZZZWZW…ZW), where Z and W are two complex scalars, the Heisenberg spin chain emerges at 1 loop. Higher loops correct the Hamiltonian but seem to preserve its integrability. This meshes nicely with earlier findings of integrability in certain subsectors of QCD. Lipatov; Faddeev, Korchemsky; Braun, Derkachov, Manashov This meshes nicely with earlier findings of integrability in certain subsectors of QCD. Lipatov; Faddeev, Korchemsky; Braun, Derkachov, Manashov The dual string theory approach indicates that in the SYM theory the exact integrability is present at very strong coupling (Bena, Polchinski, Roiban). Hence it is likely to exist for all values of the coupling. The dual string theory approach indicates that in the SYM theory the exact integrability is present at very strong coupling (Bena, Polchinski, Roiban). Hence it is likely to exist for all values of the coupling.

Connection with Cosmic strings Copeland, Myers, Polchinski A fundamental string at the bottom of the warped deformed conifold is dual to a confining string. A D-string is dual to a solitonic string which couples to the Goldstone mode. A fundamental string at the bottom of the warped deformed conifold is dual to a confining string. A D-string is dual to a solitonic string which couples to the Goldstone mode. Upon embedding of the warped throat into a flux compactification, these objects can be used to model cosmic strings. Upon embedding of the warped throat into a flux compactification, these objects can be used to model cosmic strings. This throat is not the “standard model throat’’ but another throat, the “inflationary throat,” dual to some hidden sector cascading gauge theory. This throat is not the “standard model throat’’ but another throat, the “inflationary throat,” dual to some hidden sector cascading gauge theory.

Speed of Sound In a CFT, the pressure is related to the energy density, p=3 . Hence, In a CFT, the pressure is related to the energy density, p=3 . Hence, C s 2 = dp/d  = 1/3. C s 2 = dp/d  = 1/3. The plot of C s 2 in pure glue SU(3) lattice gauge theory The plot of C s 2 in pure glue SU(3) lattice gauge theory Gavai, Gupta, Mukherjee Gavai, Gupta, Mukherjee For T/T c = 3, the coupling is still quite strong, ~ 7. This suggests that AdS/CFT methods may be useful. For T/T c = 3, the coupling is still quite strong, ~ 7. This suggests that AdS/CFT methods may be useful.

Folded Strings on S 5 and Magnons Folded string spinning around the north pole has, for large R-charge J: Gubser, IK, Polyakov Folded string spinning around the north pole has, for large R-charge J: Gubser, IK, Polyakov Recently this string was identified by Hofman and Maldacena with a 2-magnon operator where each magnon carries p=  The exact energy of a free magnon is Santambrogio, Zanon Recently this string was identified by Hofman and Maldacena with a 2-magnon operator where each magnon carries p=  The exact energy of a free magnon is Santambrogio, Zanon Beisert Beisert Its dual is an open string spinning on S 5 : Its dual is an open string spinning on S 5 : Hence the 2-magnon operator dimension is Hence the 2-magnon operator dimension is in exact agreement with the folded string result for large  in exact agreement with the folded string result for large 

The gauge theory on D7-branes wrapping a 4- cycle  4 has coupling The gauge theory on D7-branes wrapping a 4- cycle  4 has coupling The non-perturbative superpotential The non-perturbative superpotential depends on the D3-brane location through the warped volume depends on the D3-brane location through the warped volume In the throat approximation, the warp factor can be calculated and integrated over a 4- cycle explicitly. Baumann, Dymarsky, Klebanov, Maldacena, McAllister, Murugan. In the throat approximation, the warp factor can be calculated and integrated over a 4- cycle explicitly. Baumann, Dymarsky, Klebanov, Maldacena, McAllister, Murugan. For a class of conifold embeddings Arean, Crooks, Ramallo ( w 1 =z 1 +iz 2, etc.) For a class of conifold embeddings Arean, Crooks, Ramallo ( w 1 =z 1 +iz 2, etc.) the result is the result is

This formula applies both to n wrapped D7- branes, and to a wrapped Euclidean D3 ( n=1 ). This formula applies both to n wrapped D7- branes, and to a wrapped Euclidean D3 ( n=1 ). For the latter case, Ganor showed that A has a simple zero when the D3-brane approaches the 4-cycle. Our result agrees with this. For the latter case, Ganor showed that A has a simple zero when the D3-brane approaches the 4-cycle. Our result agrees with this. We have also carried out such calculations for 4- cycles within the Calabi-Yau cones over Y p,q with analogous results: A(X) is proportional to the embedding equation raised to the power 1/n. This appears to be a general rule for 4-cycles in the throat. We have also carried out such calculations for 4- cycles within the Calabi-Yau cones over Y p,q with analogous results: A(X) is proportional to the embedding equation raised to the power 1/n. This appears to be a general rule for 4-cycles in the throat.

For operators with large R-charge J, the new results imply that the so-called `perturbative BMN scaling’ (the assumption that all quantitites have expansion in powers of l /J 2 ) is violated. This resolved certain discrepancies that followed from this unjustified assumption. For operators with large R-charge J, the new results imply that the so-called `perturbative BMN scaling’ (the assumption that all quantitites have expansion in powers of l /J 2 ) is violated. This resolved certain discrepancies that followed from this unjustified assumption. In fact, in our 2002 paper, Spradlin, Volovich and I showed that this scaling must be violated for related observables. Now this violation is believed to be a general phenomenon in the AdS/CFT duality, which allows for smooth extrapolation from weak to strong coupling. In fact, in our 2002 paper, Spradlin, Volovich and I showed that this scaling must be violated for related observables. Now this violation is believed to be a general phenomenon in the AdS/CFT duality, which allows for smooth extrapolation from weak to strong coupling.

The anomalous dimension of such a high spin twist-2 operator is The anomalous dimension of such a high spin twist-2 operator is AdS/CFT predicts that at strong coupling AdS/CFT predicts that at strong coupling A 3-loop perturbative N =4 SYM calculation gives Kotikov, Lipatov, Onishchenko, Velizhanin; Bern, Dixon, Smirnov A 3-loop perturbative N =4 SYM calculation gives Kotikov, Lipatov, Onishchenko, Velizhanin; Bern, Dixon, Smirnov An approximate extrapolation formula works with about 10% accuracy: An approximate extrapolation formula works with about 10% accuracy: Constrains on f( ) imposed by the integrability were studied by Eden, Staudacher; Belitsky et al Constrains on f( ) imposed by the integrability were studied by Eden, Staudacher; Belitsky et al

News Flash Remarkably, Bern, Czakon, Dixon, Kosower and Smirnov have calculated the four-loop correction to the universal function f( l ): Remarkably, Bern, Czakon, Dixon, Kosower and Smirnov have calculated the four-loop correction to the universal function f( l ): -16 -3 p -8 l 4 (73 p 6 /630 + 4 z (3) 2 ) -16 -3 p -8 l 4 (73 p 6 /630 + 4 z (3) 2 ) This allows to determine the scattering phase of magnon S-matrix in the integrability approach, and appears to completely determine the expansion of f( l ) ! Beisert, Eden, Staudacher; Beisert, Hernandez, Lopez This allows to determine the scattering phase of magnon S-matrix in the integrability approach, and appears to completely determine the expansion of f( l ) ! Beisert, Eden, Staudacher; Beisert, Hernandez, Lopez Extrapolation to large l gives good numerical agreement with the string theory prediction. There are indications the agreement is exact. Extrapolation to large l gives good numerical agreement with the string theory prediction. There are indications the agreement is exact. I expect many more results following this breakthrough in the near future. I expect many more results following this breakthrough in the near future.

Correlation functions are calculated from the dependence of string theory path integral on boundary conditions  0 in AdS 5, imposed near z=0: Gubser, IK, Polyakov; Witten Correlation functions are calculated from the dependence of string theory path integral on boundary conditions  0 in AdS 5, imposed near z=0: Gubser, IK, Polyakov; Witten In the large N limit the path integral is found from the classical string action: In the large N limit the path integral is found from the classical string action:

From Weak to Strong Coupling in N =4 SYM Theory From Weak to Strong Coupling in N =4 SYM Theory Igor Klebanov Department of Physics Talk at Rutgers University.

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Presentation on theme: "From Weak to Strong Coupling in N =4 SYM Theory From Weak to Strong Coupling in N =4 SYM Theory Igor Klebanov Department of Physics Talk at Rutgers University."— Presentation transcript:

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From Weak to Strong Coupling in N =4 SYM Theory From Weak to Strong Coupling in N =4 SYM Theory Igor Klebanov Department of Physics Talk at Rutgers University.

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Presentation on theme: "From Weak to Strong Coupling in N =4 SYM Theory From Weak to Strong Coupling in N =4 SYM Theory Igor Klebanov Department of Physics Talk at Rutgers University."— Presentation transcript:

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