Your search keyword '"Marcos Mariño"' showing total 44 results

1. Large N instantons from topological strings

Author

Marcos Mariño, Ramon Miravitllas

Subjects

Physics, QC1-999

Abstract

The $1/N$ expansion of matrix models is asymptotic, and it requires non-perturbative corrections due to large $N$ instantons. Explicit expressions for large $N$ instanton amplitudes are known in the case of Hermitian matrix models with one cut, but not in the multi-cut case. We show that the recent exact results on topological string instanton amplitudes provide the non-perturbative contributions of large $N$ instantons in generic multi-cut, Hermitian matrix models. We present a detailed test in the case of the cubic matrix model by considering the asymptotics of its $1/N$ expansion, which we obtain at relatively high genus for a generic two-cut background. These results can be extended to certain non-conventional matrix models which admit a topological string theory description. As an application, we determine the large $N$ instanton corrections for the free energy of ABJM theory on the three-sphere, which correspond to D-brane instanton corrections in superstring theory. We also illustrate the applications of topological string instantons in a more mathematical setting by considering orbifold Gromov-Witten invariants. By focusing on the example of ${\mathbb C}^3/{\mathbb Z}_3$, we show that they grow doubly-factorially with the genus and we obtain and test explicit asymptotic formulae for them.

Published

2024

2. New renormalons from analytic trans-series

Author

Marcos Mariño, Ramon Miravitllas, and Tomás Reis

Subjects

Integrable Field Theories, Large-Order Behaviour of Perturbation Theory, Renormalons, Nonperturbative Effects, Field Theories in Lower Dimensions, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract We study the free energy of integrable, asymptotically free field theories in two dimensions coupled to a conserved charge. We develop methods to obtain analytic expressions for its trans-series expansion, directly from the Bethe ansatz equations, and we use this result to determine the structure of its Borel singularities. We find a new class of infrared renormalons which does not fit the traditional expectations of renormalon physics proposed long ago by ’t Hooft and Parisi. We check the existence of these new singularities with detailed calculations based on the resurgent analysis of the perturbative expansion. Our results show that the structure of renormalons in asymptotically free theories is more subtle than previously thought, and that large N estimates of their location might be misleading.

Published

2022

3. Instantons, renormalons and the theta angle in integrable sigma models

Author

Marcos Mariño, Ramon Miravitllas, Tomas Reis

Subjects

Physics, QC1-999

Abstract

Some sigma models which admit a theta angle are integrable at both $\vartheta=0$ and $\vartheta=\pi$. This includes the well-known $O(3)$ sigma model and two families of coset sigma models studied by Fendley. We consider the ground state energy of these models in the presence of a magnetic field, which can be computed with the Bethe Ansatz. We obtain explicit results for its non-perturbative corrections and we study the effect of the theta angle on them. We show that imaginary, exponentially small corrections due to renormalons remain unchanged, while instanton corrections change sign, as expected. We find in addition corrections due to renormalons which also change sign as we turn on the theta angle. Based on these results we present an explicit non-perturbative formula for the topological susceptibility of the $O(3)$ sigma model in the presence of a magnetic field, in the weak coupling limit.

Published

2023

4. Resurgence and 1/N Expansion in Integrable Field Theories

Author

Lorenzo Di Pietro, Marcos Mariño, Giacomo Sberveglieri, and Marco Serone

Subjects

1/N Expansion, Integrable Field Theories, Field Theories in Lower Dimensions, Renormalization Regularization and Renormalons, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract In theories with renormalons the perturbative series is factorially divergent even after restricting to a given order in 1/N, making the 1/N expansion a natural testing ground for the theory of resurgence. We study in detail the interplay between resurgent properties and the 1/N expansion in various integrable field theories with renormalons. We focus on the free energy in the presence of a chemical potential coupled to a conserved charge, which can be computed exactly with the thermodynamic Bethe ansatz (TBA). In some examples, like the first 1/N correction to the free energy in the non-linear sigma model, the terms in the 1/N expansion can be fully decoded in terms of a resurgent trans-series in the coupling constant. In the principal chiral field we find a new, explicit solution for the large N free energy which can be written as the median resummation of a trans-series with infinitely many, analytically computable IR renormalon corrections. However, in other examples, like the Gross-Neveu model, each term in the 1/N expansion includes non-perturbative corrections which can not be predicted by a resurgent analysis of the corresponding perturbative series. We also study the properties of the series in 1/N. In the Gross-Neveu model, where this is convergent, we analytically continue the series beyond its radius of convergence and show how the continuation matches with known dualities with sine-Gordon theories.

Published

2021

5. A new renormalon in two dimensions

Author

Marcos Mariño and Tomás Reis

Subjects

1/N Expansion, Field Theories in Lower Dimensions, Nonperturbative Effects, Renormalization Regularization and Renormalons, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract According to standard lore, perturbative series of super-renormalizable theories have only instanton singularities. In this paper we show that two-dimensional scalar theories with a spontaneously broken O(N ) symmetry at the classical level, which are super-renormalizable, have an IR renormalon singularity at large N . Since perturbative expansions in these theories are made around the “false vacuum” in which the global symmetry is broken, this singularity can be regarded as a manifestation of the non-perturbative absence of Goldstone bosons. We conjecture that the Borel singularity in the ground state energy of the Lieb-Liniger model is a non-relativistic manifestation of this phenomenon. We also provide en passant a detailed perturbative calculation of the Lieb-Liniger energy up to two-loops, and we check that it agrees with the prediction of the Bethe ansatz.

Published

2020

6. Non-perturbative approaches to the quantum Seiberg-Witten curve

Author

Alba Grassi, Jie Gu, and Marcos Mariño

Subjects

Integrable Hierarchies, Supersymmetric Gauge Theory, Topological Strings, Bethe Ansatz, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract We study various non-perturbative approaches to the quantization of the Seiberg-Witten curve of N $$ \mathcal{N} $$ = 2, SU(2) super Yang-Mills theory, which is closely related to the modified Mathieu operator. The first approach is based on the quantum WKB periods and their resurgent properties. We show that these properties are encoded in the TBA equations of Gaiotto-Moore-Neitzke determined by the BPS spectrum of the theory, and we relate the Borel-resummed quantum periods to instanton calculus. In addition, we use the TS/ST correspondence to obtain a closed formula for the Fredholm determinant of the modified Mathieu operator. Finally, by using blowup equations, we explain the connection between this operator and the τ function of Painlevé III.

Published

2020

7. Renormalons in integrable field theories

Author

Marcos Mariño and Tomás Reis

Subjects

Nonperturbative Effects, Renormalization Regularization and Renormalons, Integrable Field Theories, Sigma Models, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract In integrable field theories in two dimensions, the Bethe ansatz can be used to compute exactly the ground state energy in the presence of an external field coupled to a conserved charge. We generalize previous results by Volin and we extract analytic results for the perturbative expansion of this observable, up to very high order, in various asymptotically free theories: the non-linear sigma model and its supersymmetric extension, the Gross-Neveu model, and the principal chiral field. We study the large order behavior of these perturbative series and we give strong evidence that, as expected, it is controlled by renormalons. Our analysis is sensitive to the next-to-leading correction to the asymptotics, which involves the first two coefficients of the beta function. We also show that, in the supersymmetric non-linear sigma model, there is no contribution from the first IR renormalon, in agreement with general arguments.

Published

2020

8. Resonances and PT symmetry in quantum curves

Author

Yoan Emery, Marcos Mariño, and Massimiliano Ronzani

Subjects

Discrete Symmetries, Topological Strings, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract In the correspondence between spectral problems and topological strings, it is natural to consider complex values for the string theory moduli. In the spectral theory side, this corresponds to non-Hermitian quantum curves with complex spectra and resonances, and in some cases, to PT-symmetric spectral problems. The correspondence leads to precise predictions about the spectral properties of these non-Hermitian operators. In this paper we develop techniques to compute the complex spectra of these quantum curves, providing in this way precision tests of these predictions. In addition, we analyze quantum Seiberg-Witten curves with PT symmetry, which provide interesting and exactly solvable examples of spontaneous PT-symmetry breaking.

Published

2020

9. Resurgence and renormalons in the one-dimensional Hubbard model

Author

Marcos Mariño, Tomás Reis

Subjects

Physics, QC1-999

Abstract

We use resurgent analysis to study non-perturbative aspects of the one-dimensional, multicomponent Hubbard model with an attractive interaction and arbitrary filling. In the two-component case, we show that the leading Borel singularity of the perturbative series for the ground-state energy is determined by the energy gap, as expected for superconducting systems. This singularity turns out to be of the renormalon type, and we identify a class of diagrams leading to the correct factorial growth. As a consequence of our analysis, we propose an explicit expression for the energy gap at weak coupling in the multi-component Hubbard model, at next-to-leading order in the coupling constant. In the two-component, half-filled case, we use the Bethe ansatz solution to determine the full trans-series for the ground state energy, and the exact form of its Stokes discontinuity.

Published

2022

10. Wavefunctions, integrability, and open strings

Author

Marcos Mariño and Szabolcs Zakany

Subjects

Matrix Models, Topological Strings, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract It has been recently conjectured that the exact eigenfunctions of quantum mirror curves can be obtained by combining their WKB expansion with the open topological string wavefunction. In this paper we give further evidence for this conjecture. We present closed expressions for the wavefunctions in the so-called maximally supersymmetric case, in various geometries. In the higher genus case, our conjecture provides a solution to the quantum Baxter equation of the corresponding cluster integrable system, and we argue that the quantization conditions of the integrable system follow from imposing appropriate asymptotic conditions on the wavefunction. We also present checks of the conjecture for general values of the Planck constant.

Published

2019

11. Quantum curves as quantum distributions

Author

Marcos Mariño and Szabolcs Zakany

Subjects

Matrix Models, Topological Strings, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract Topological strings on toric Calabi-Yau threefolds can be defined non-perturbatively in terms of a non-interacting Fermi gas of N particles. Using this approach, we propose a definition of quantum mirror curves as quantum distributions on phase space. The quantum distribution is obtained as the Wigner transform of the reduced density matrix of the Fermi gas. We show that the classical mirror geometry emerges in the strongly coupled, large N limit in which ℏ ∼ N. In this limit, the Fermi gas has effectively zero temperature, and the Wigner distribution becomes sharply supported on the interior of the classical mirror curve. The quantum fluctuations around the classical limit turn out to be captured by an improved version of the universal scaling form of Balazs and Zipfel.

Published

2019

12. TBA equations and resurgent Quantum Mechanics

Author

Katsushi Ito, Marcos Mariño, and Hongfei Shu

Subjects

Integrable Field Theories, Nonperturbative Effects, Topological Field Theories, Nuclear and particle physics. Atomic energy. Radioactivity, QC770-798

Abstract

Abstract We derive a system of TBA equations governing the exact WKB periods in one-dimensional Quantum Mechanics with arbitrary polynomial potentials. These equations provide a generalization of the ODE/IM correspondence, and they can be regarded as the solution of a Riemann-Hilbert problem in resurgent Quantum Mechanics formulated by Voros. Our derivation builds upon the solution of similar Riemann-Hilbert problems in the study of BPS spectra in N $$ \mathcal{N} $$ = 2 gauge theories and of minimal surfaces in AdS. We also show that our TBA equations, combined with exact quantization conditions, provide a powerful method to solve spectral problems in Quantum Mechanics. We illustrate our general analysis with a detailed study of PT-symmetric cubic oscillators and quartic oscillators.

Published

2019

13. Analyticity of the Free Energy of a Closed 3-Manifold

Author

Stavros Garoufalidis, Thang T.Q. Lê, and Marcos Mariño

Subjects

Chern-Simons theory, perturbation theory, gauge theory, free energy, planar limit, Gevrey series, LMO invariant, weight systems, ribbon graphs, cubic graphs, lens spaces, trilogarithm, polylogarithm, Painlevé I, WKB, asymptotic expansions, transseries, Riemann-Hilbert problem, Mathematics, QA1-939

Abstract

The free energy of a closed 3-manifold is a 2-parameter formal power series which encodes the perturbative Chern-Simons invariant (also known as the LMO invariant) of a closed 3-manifold with gauge group U(N) for arbitrary N. We prove that the free energy of an arbitrary closed 3-manifold is uniformly Gevrey-1. As a corollary, it follows that the genus g part of the free energy is convergent in a neighborhood of zero, independent of the genus. Our results follow from an estimate of the LMO invariant, in a particular gauge, and from recent results of Bender-Gao-Richmond on the asymptotics of the number of rooted maps for arbitrary genus. We illustrate our results with an explicit formula for the free energy of a Lens space. In addition, using the Painlevé differential equation, we obtain an asymptotic expansion for the number of cubic graphs to all orders, stengthening the results of Bender-Gao-Richmond.

Published

2008

14. Universality and asymptotics of graph counting problems in non-orientable surfaces.

Author

Stavros Garoufalidis and Marcos Mariño

Published

2010

15. Peacock patterns and new integer invariants in topological string theory

Author

Jie Gu and Marcos Mariño

Subjects

High Energy Physics - Theory, Spectral, Holomorphic, Singularity, Chern-Simons term, Physics, QC1-999, General Physics and Astronomy, FOS: Physical sciences, Structure, Mathematical Physics (math-ph), ddc:500.2, Mathematics - Algebraic Geometry, Conifold, Mathematics::Algebraic Geometry, High Energy Physics - Theory (hep-th), topological [String model], Calabi-Yau, FOS: Mathematics, ddc:510, Algebraic Geometry (math.AG), Mathematics::Symplectic Geometry, Mathematical Physics

Abstract

Topological string theory near the conifold point of a Calabi-Yau threefold gives rise to factorially divergent power series which encode the all-genus enumerative information. These series lead to infinite towers of singularities in their Borel plane (also known as "peacock patterns"), and we conjecture that the corresponding Stokes constants are integer invariants of the Calabi-Yau threefold. We calculate these Stokes constants in some toric examples, confirming our conjecture and providing in some cases explicit generating functions for the new integer invariants, in the form of q-series. Our calculations in the toric case rely on the TS/ST correspondence, which promotes the asymptotic series near the conifold point to spectral traces of operators, and makes it easier to identify the Stokes data. The resulting mathematical structure turns out to be very similar to the one of complex Chern-Simons theory. In particular, spectral traces correspond to state integral invariants and factorize in holomorphic/anti-holomorphic blocks., Comment: 51 pages, 11 figures, typos corrected, new clarification added

Published

2022

16. Advanced Topics in Quantum Mechanics

Author

Marcos Mariño

Abstract

Quantum mechanics is one of the most successful theories in science, and is relevant to nearly all modern topics of scientific research. This textbook moves beyond the introductory and intermediate principles of quantum mechanics frequently covered in undergraduate and graduate courses, presenting in-depth coverage of many more exciting and advanced topics. The author provides a clearly structured text for advanced students, graduates and researchers looking to deepen their knowledge of theoretical quantum mechanics. The book opens with a brief introduction covering key concepts and mathematical tools, followed by a detailed description of the Wentzel–Kramers–Brillouin (WKB) method. Two alternative formulations of quantum mechanics are then presented: Wigner's phase space formulation and Feynman's path integral formulation. The text concludes with a chapter examining metastable states and resonances. Step-by-step derivations, worked examples and physical applications are included throughout.

Published

2021

17. New renormalons from analytic trans-series

Author

Marcos Mariño, Ramon Miravitllas, and Tomás Reis

Subjects

High Energy Physics - Theory, Nuclear and High Energy Physics, High Energy Physics - Phenomenology, High Energy Physics - Phenomenology (hep-ph), High Energy Physics - Lattice, High Energy Physics - Theory (hep-th), High Energy Physics - Lattice (hep-lat), High Energy Physics::Phenomenology, FOS: Physical sciences, Mathematical Physics (math-ph), Mathematical Physics

Abstract

We study the free energy of integrable, asymptotically free field theories in two dimensions coupled to a conserved charge. We develop methods to obtain analytic expressions for its trans-series expansion, directly from the Bethe ansatz equations, and we use this result to determine the structure of its Borel singularities. We find a new class of infrared renormalons which does not fit the traditional expectations of renormalon physics proposed long ago by 't Hooft and Parisi. We check the existence of these new singularities with detailed calculations based on the resurgent analysis of the perturbative expansion. Our results show that the structure of renormalons in asymptotically free theories is more subtle than previously thought, and that large $N$ estimates of their location might be misleading., 58 pages, 17 figures - v4: corrected the discussion of the instanton-like contributions in the PCF model

Published

2021

18. Testing the Bethe ansatz with large

Author

Marcos, Mariño, Ramon, Miravitllas, and Tomás, Reis

Subjects

Regular Article

Abstract

The ground-state energy of integrable asymptotically free theories can be conjecturally computed using the Bethe ansatz once the theory has been coupled to an external potential through a conserved charge. This leads to a precise prediction for the perturbative expansion of the energy. We provide a non-trivial test of this prediction in the non-linear sigma model and its supersymmetric extension, by calculating analytically the associated Feynman diagrams at next-to-leading order in the 1/N expansion, and at all loops. By investigating the large order behavior of the diagrams, we locate the position of the renormalons of the theory and we obtain an analytic expression for the large N trans-series associated to each. As a spin-off of our calculation, we provide a direct derivation of the beta function of these theories, at next-to-leading order in the 1/N expansion.

Published

2021

19. Stringy Geometry and Emergent Space

Author

Marcos Mariño

Subjects

Physics, Theoretical physics, Space (mathematics)

Published

2021

20. String theory and knot invariants

Author

Marcos Mariño

Published

2007

21. Instantons and Large N

Author

Marcos Mariño

Abstract

This highly pedagogical textbook for graduate students in particle, theoretical and mathematical physics, explores advanced topics of quantum field theory. Clearly divided into two parts; the first focuses on instantons with a detailed exposition of instantons in quantum mechanics, supersymmetric quantum mechanics, the large order behavior of perturbation theory, and Yang–Mills theories, before moving on to examine the large N expansion in quantum field theory. The organised presentation style, in addition to detailed mathematical derivations, worked examples and applications throughout, enables students to gain practical experience with the tools necessary to start research. The author includes recent developments on the large order behavior of perturbation theory and on large N instantons, and updates existing treatments of classic topics, to ensure that this is a practical and contemporary guide for students developing their understanding of the intricacies of quantum field theory.

Published

2015

22. Framed knots at large 𝑁

Author

Marcos Mariño and Cumrun Vafa

Published

2002

23. Propiedades psicométricas de un instrumento de evaluación de barreras para la adherencia al tratamiento antirretroviral en población argentina

Author

Elena Colasanti, Jhonatan Navarro-Loli, Marcos Marino, and Leonardo Adrián Medrano

Subjects

cumplimiento de la medicación, vih, síndrome de inmunodeficiencia adquirida, Medicine, Medicine (General), R5-920

Abstract

Objetivo: adaptar y validar un instrumento para evaluar barreras a la adherencia antirretroviral en personas que conviven con el vih en Córdoba (Argentina). Materiales y métodos: la muestra final incluyó 180 participantes argentinos. La media de edad fue de 40.61 (de = 12.032) y el 82.8 % fueron hombres. Sobre la muestra (n = 180) se efectuaron estudios de estructura interna, confiabilidad y validez con otras variables. Resultados: el análisis factorial confirmatorio arrojó resultados congruentes con la estructura factorial del estudio original, aunque para ello fue necesario eliminar ciertos ítems que presentaban bajas cargas factoriales y que pueden ser representados por otros ítems, debido a información redundante. Se obtuvieron coeficientes ω = 0.833 en la subescala información; ω = 0.759 en la subescala motivación, y ω = 0.888 en la subescala habilidades comportamentales. Se encontraron correlaciones significativas entre los resultados de adherencia al tratamiento y barreras al tratamiento. Conclusión: aunque se requieren de mayores investigaciones, los resultados son promisorios, sugieren que el instrumento puede usarse para evaluar barreras de la adherencia al tratamiento antirretroviral en Córdoba.

Published

2023

24. Hurwitz numbers, matrix models and enumerative geometry

Author

Vincent Bouchard and Marcos Mariño

Subjects

High Energy Physics - Theory, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, High Energy Physics - Theory (hep-th), 57M27, 81T30, FOS: Mathematics, FOS: Physical sciences, 14N35, Mathematical Physics and Mathematics, Algebraic Geometry (math.AG), Mathematics::Symplectic Geometry

Abstract

We propose a new, conjectural recursion solution for Hurwitz numbers at all genera. This conjecture is based on recent progress in solving type B topological string theory on the mirrors of toric Calabi-Yau manifolds, which we briefly review to provide some background for our conjecture. We show in particular how this B-model solution, combined with mirror symmetry for the one-leg, framed topological vertex, leads to a recursion relation for Hodge integrals with three Hodge class insertions. Our conjecture in Hurwitz theory follows from this recursion for the framed vertex in the limit of infinite framing., 21 pages, 5 figures, small corrections, references added

Published

2007

25. THE TOPOLOGICAL VERTEX

Author

Marcos Mariño

Abstract

This chapter explains the cut-and-paste approach to toric Calabi-Yau manifolds developed previously with the large-N duality relating Chern-Simons theory and topological strings, to find a building block for topological string amplitudes on those geometries. This building block is an open string amplitude called the topological vertex. In order to understand topological vertex it is necessary to discuss one aspect of open string amplitudes: the framing ambiguity. Three gluing rules for the topological vertex are discussed: for a change of orientation in one edge, for the propagator, and for the matching of framings in the gluing. Some examples of computation of topological string amplitudes by using the topological vertex are presented.

Published

2005

26. TOPOLOGICAL STRINGS

Author

Marcos Mariño

Abstract

Type-A and type-B topological sigma models are two topological field theories in two dimensions. Although they contain a lot of information in genus 0, they turn out to be trivial for g > 1. This is essentially due to the fact that, in order to define these theories, it is necessary to consider a fixed metric in the Riemann surface. In order to obtain a non-trivial theory in higher genus the degrees of freedom of the two-dimensional metric must be introduced. This means that the topological field theories must be coupled to two-dimensional gravity. The coupling to gravity is done by using the fact that the structure of the twisted theory is tantalizingly close to that of the bosonic string. Topological sigma models may be defined not only on closed Riemann surfaces and closed topological strings, but also on the open case.

Published

2005

27. GEOMETRIC TRANSITIONS

Author

Marcos Mariño

Abstract

Gopakumar and Vafa demonstrated in an important paper (1999) that there is a closed string theory leading to the resummations (2.179) and (2.181). The intuition behind the result of Gopakumar and Vafa is that open/closed string dualities are related to geometric transitions in the background geometry. Since Chern-Simons theory is an open topological string on the deformed conifold geometry with N topological D-branes wrapping the three-sphere, it is natural to conjecture that at large N the D-branes induce a conifold transition in the background geometry. This yields the resolved conifold and no D-branes. But in the absence of D-branes that enforce boundary conditions, a theory of closed topological strings remains. Following this reasoning, Gopakumar and Vafa conjectured that Chern-Simons theory on S3 is equivalent to closed topological string theory on the resolved conifold. This chapter analyzes geometric transitions for Chern-Simons theory and type-A topological strings as well as matrix models and type-B topological strings.

Published

2005

28. MATRIX MODELS

Author

Marcos Mariño

Abstract

This chapter starts with explaining some basic aspects and techniques of matrix models. Matrix models are the simplest examples of quantum gauge theories; they are quantum gauge theories in zero dimensions. The basic field is a Hermitian N x N matrix M. Two useful techniques for solving matrix models are described: saddle-point analysis and orthogonal polynomials.

Published

2005

29. Topological Quantum Field Theory and Four-Manifolds

Author

Marcos Mariño

Published

2001

30. Enumerative Invariants in Algebraic Geometry and String Theory : Lectures Given at the C.I.M.E. Summer School Held in Cetraro, Italy, June 6-11, 2005

Author

Marcos Marino, Michael Thaddeus, Ravi Vakil, Kai Behrend, Marco Manetti, Marcos Marino, Michael Thaddeus, Ravi Vakil, Kai Behrend, and Marco Manetti

Subjects

Algebra, Algebraic geometry, Geometry, Differential, Quantum physics

Abstract

Starting in the middle of the 80s, there has been a growing and fruitful interaction between algebraic geometry and certain areas of theoretical high-energy physics, especially the various versions of string theory. Physical heuristics have provided inspiration for new mathematical definitions (such as that of Gromov-Witten invariants) leading in turn to the solution of problems in enumerative geometry. Conversely, the availability of mathematically rigorous definitions and theorems has benefited the physics research by providing the required evidence in fields where experimental testing seems problematic. The aim of this volume, a result of the CIME Summer School held in Cetraro, Italy, in 2005, is to cover part of the most recent and interesting findings in this subject.

Published

2008

31. Topological Quantum Field Theory and Four Manifolds

Author

Jose Labastida, Marcos Marino, Jose Labastida, and Marcos Marino

Subjects

Mathematical physics, Topology, Geometry, Differential

Abstract

The emergence of topological quantum?eld theory has been one of the most important breakthroughs which have occurred in the context of ma- ematical physics in the last century, a century characterizedbyindependent developments of the main ideas in both disciplines, physics and mathematics, which has concluded with two decades of strong interaction between them, where physics, as in previous centuries, has acted as a source of new mat- matics. Topological quantum?eld theories constitute the core of these p- nomena, although the main drivingforce behind it has been the enormous e?ort made in theoretical particle physics to understand string theory as a theory able to unify the four fundamental interactions observed in nature. These theories set up a new realm where both disciplines pro?t from each other. Although the most striking results have appeared on the mathema- calside,theoreticalphysicshasclearlyalsobene?tted,sincethecorresponding developments have helped better to understand aspects of the fundamentals of?eld and string theory.

Published

2007

32. Chern-Simons Theory, Matrix Models, and Topological Strings

Author

Marcos Marino and Marcos Marino

Subjects

String models, Gauge fields (Physics), Three-manifolds (Topology)

Abstract

In recent years, the old idea that gauge theories and string theories are equivalent has been implemented and developed in various ways, and there are by now various models where the string theory / gauge theory correspondence is at work. One of the most important examples of this correspondence relates Chern-Simons theory, a topological gauge theory in three dimensions which describes knot and three-manifold invariants, to topological string theory, which is deeply related to Gromov-Witten invariants. This has led to some surprising relations between three-manifold geometry and enumerative geometry. This book gives the first coherent presentation of this and other related topics. After an introduction to matrix models and Chern-Simons theory, the book describes in detail the topological string theories that correspond to these gauge theories and develops the mathematical implications of this duality for the enumerative geometry of Calabi-Yau manifolds and knot theory. It is written in a pedagogical style and will be useful reading for graduate students and researchers in both mathematics and physics willing to learn about these developments.

Published

2005

33. Resurgence for superconductors.

Author

Marcos Mariño and Tomás Reis

Published

2019

34. The complex side of the TS/ST correspondence.

Author

Alba Grassi and Marcos Mariño

Subjects

*QUANTUM automobile, *MATHEMATICAL complex analysis

Abstract

The TS/ST correspondence relates the spectral theory of certain quantum mechanical operators, to topological strings on toric Calabi–Yau threefolds. So far the correspondence has been formulated for real values of Planck’s constant. In this paper we start to explore the validity of the correspondence when takes complex values. We give evidence that, for threefolds associated to supersymmetric gauge theories, one can extend the correspondence and obtain exact quantization conditions for the operators. We also explore the correspondence for operators involving periodic potentials. In particular, we study a deformed version of the Mathieu equation, and we solve for its band structure in terms of the quantum mirror map of the underlying threefold. [ABSTRACT FROM AUTHOR]

Published

2019

35. Holomorphic anomaly and quantum mechanics.

Author

Santiago Codesido and Marcos Mariño

Subjects

*HOLOMORPHIC functions, *QUANTUM mechanics

Abstract

We show that the all-orders WKB periods of one-dimensional quantum mechanical oscillators are governed by the refined holomorphic anomaly equations of topological string theory. We analyze in detail the double-well potential and the cubic and quartic oscillators, and we calculate the WKB expansion of their quantum free energies by using the direct integration of the anomaly equations. We reproduce in this way all known results about the quantum periods of these models, which we express in terms of modular forms on the WKB curve. As an application of our results, we study the large order behavior of the WKB expansion in the case of the double well, which displays the double factorial growth typical of string theory. [ABSTRACT FROM AUTHOR]

Published

2018

36. Localization at large N in Chern–Simons-matter theories.

Author

Marcos Mariño

Subjects

*LOCALIZATION (Mathematics), *GAUGE field theory, *PARTITION functions

Abstract

We review some exact results for the matrix models appearing in the localization of Chern–Simons-matter theories, focusing on the structure of non-perturbative effects and on the M-theory expansion of ABJM theory. We also summarize some of the results obtained for other Chern–Simons-matter theories, as well as recent applications to topological strings. [ABSTRACT FROM AUTHOR]

Published

2017

37. Localization techniques in quantum field theories.

Author

Vasily Pestun, Maxim Zabzine, Francesco Benini, Tudor Dimofte, Thomas T Dumitrescu, Kazuo Hosomichi, Seok Kim, Kimyeong Lee, Bruno Le Floch, Marcos Mariño, Joseph A Minahan, David R Morrison, Sara Pasquetti, Jian Qiu, Leonardo Rastelli, Shlomo S Razamat, Silvu S Pufu, Yuji Tachikawa, Brian Willett, and Konstantin Zarembo

Subjects

LOCALIZATION (Mathematics), QUANTUM field theory, GAUGE field theory

Abstract

This is the foreword to the special issue on localization techniques in quantum field theory. The summary of individual chapters is given and their interrelation is discussed. [ABSTRACT FROM AUTHOR]

Published

2017

38. Exact eigenfunctions and the open topological string.

Author

Marcos Mariño and Szabolcs Zakany

Subjects

*EIGENFUNCTIONS, *TOPOLOGY, *SUPERSYMMETRY

Abstract

Mirror curves to toric Calabi–Yau threefolds can be quantized and lead to trace class operators on the real line. The eigenvalues of these operators are encoded in the BPS invariants of the underlying threefold, but much less is known about their eigenfunctions. In this paper, we first develop methods in spectral theory to compute these eigenfunctions. We also provide an integral matrix representation which allows them to be studied in a ’t Hooft limit, where they are described by standard topological open string amplitudes. Based on these results, we propose a conjecture for the exact eigenfunctions, which involves both the WKB wavefunction and the standard topological string wavefunction. This conjecture can be made completely explicit in the maximally supersymmetric, or self-dual case, which we work out in detail for local . In this case, our conjectural eigenfunctions turn out to be closely related to Baker–Akhiezer functions on the mirror curve, and they are in full agreement with the first-principle calculations in spectral theory. [ABSTRACT FROM AUTHOR]

Published

2017

39. Resurgence matches quantization.

Author

Ricardo Couso-Santamaría, Marcos Mariño, and Ricardo Schiappa

Subjects

*STRING theory, *PARTITION functions, *MATHEMATICAL functions, *QUANTUM field theory, *STOKES equations, *NUMBER theory

Abstract

The quest to find a nonperturbative formulation of topological string theory has recently seen two unrelated developments. On the one hand, via quantization of the mirror curve associated to a toric Calabi–Yau background, it has been possible to give a nonperturbative definition of the topological-string partition function. On the other hand, using techniques of resurgence and transseries, it has been possible to extend the string (asymptotic) perturbative expansion into a transseries involving nonperturbative instanton sectors. Within the specific example of the local toric Calabi–Yau threefold, the present work shows how the Borel–Padé–Écalle resummation of this resurgent transseries, alongside occurrence of Stokes phenomenon, matches the string-theoretic partition function obtained via quantization of the mirror curve. This match is highly non-trivial, given the unrelated nature of both nonperturbative frameworks, signaling at the existence of a consistent underlying structure. [ABSTRACT FROM AUTHOR]

Published

2017

40. Exact quantization conditions for cluster integrable systems.

Author

Sebastián Franco, Yasuyuki Hatsuda, and Marcos Mariño

Published

2016

41. Quantization conditions and functional equations in ABJ(M) theories.

Author

Alba Grassi, Yasuyuki Hatsuda, and Marcos Mariño

Subjects

FUNCTIONAL equations, QUANTIZATION (Physics), QUANTUM theory, OPERATOR equations (Quantum mechanics), FERMI energy

Abstract

The partition function of ABJ(M) theories on the three-sphere can be regarded as the canonical partition function of an ideal Fermi gas with a non-trivial Hamiltonian. We propose an exact expression for the spectral determinant of this Hamiltonian, which generalizes recent results obtained in the maximally supersymmetric case. As a consequence, we find an exact WKB quantization condition determining the spectrum which is in agreement with numerical results. In addition, we investigate the factorization properties and functional equations for our conjectured spectral determinants. These functional equations relate the spectral determinants of ABJ theories to consecutive ranks of gauge groups but the same Chern–Simons coupling. [ABSTRACT FROM AUTHOR]

Published

2016

42. Non-perturbative topological string theory on compact Calabi-Yau 3-folds

Author

Jie Gu, Amir-Kian Kashani-Poor, Albrecht Klemm, Marcos Mariño

Subjects

Physics, QC1-999

Abstract

We obtain analytic and numerical results for the non-perturbative amplitudes of topological string theory on arbitrary, compact Calabi-Yau manifolds. Our approach is based on the theory of resurgence and extends previous special results to the more general case. In particular, we obtain explicit trans-series solutions of the holomorphic anomaly equations. Our results predict the all orders, large genus asymptotics of the topological string free energies, which we test in detail against high genus perturbative series obtained recently in the compact case. We also provide additional evidence that the Stokes constants appearing in the resurgent structure are closely related to integer BPS invariants.

Published

2024

43. Exact multi-instantons in topological string theory

Author

Jie Gu, Marcos Mariño

Subjects

Physics, QC1-999

Abstract

Topological string theory has multi-instanton sectors which lead to non-perturbative effects in the string coupling constant and control the large order behavior of the perturbative genus expansion. As proposed by Couso, Edelstein, Schiappa and Vonk, these sectors can be described by a trans-series extension of the BCOV holomorphic anomaly equations. In this paper we find exact, closed form solutions for these multi-instanton trans-series in the case of local Calabi-Yau manifolds. The resulting multi-instanton amplitudes turn out to be very similar to the eigenvalue tunneling amplitudes of matrix models. Their form suggests that the flat coordinates of the Calabi-Yau manifold are naturally quantized in units of the string coupling constant, as postulated in large $N$ dualities. Based on our results we obtain a general picture for the resurgent structure of the topological string in the local case, which we illustrate with explicit calculations for local $\mathbb{P}^2$.

Published

2023

44. On the resurgent structure of quantum periods

Author

Jie Gu, Marcos Mariño

Subjects

Physics, QC1-999

Abstract

Quantum periods appear in many contexts, from quantum mechanics to local mirror symmetry. They can be described in terms of topological string free energies and Wilson loops, in the so-called Nekrasov-Shatashvili limit. We consider the trans-series extension of the holomorphic anomaly equations satisfied by these quantities, and we obtain exact multi-instanton solutions for these trans-series. Building on this result, we propose a unified perspective on the resurgent structure of quantum periods. We show for example that the Delabaere-Pham formula, which was originally obtained in quantum mechanical examples, is a generic feature of quantum periods. We illustrate our general results with explicit calculations for the double-well in quantum mechanics, and for the quantum mirror curve of local $\mathbb{P}^2$.

Published

2023