# Matrix theory: Difference between revisions

No edit summary |
(Marino on SUSY CS) |
||

Line 1: | Line 1: | ||

===reviews=== | ===reviews=== | ||

[http://arxiv.org/abs/1104.0783 Lectures on localization and matrix models in supersymmetric Chern-Simons-matter theories]<br> | |||

by Marcos Marino (1104.0783 [hep-th], 71 pages, 7 figures) | |||

[http://arxiv.org/abs/0811.3531 Algebraic methods in random matrices and enumerative geometry]<br> | [http://arxiv.org/abs/0811.3531 Algebraic methods in random matrices and enumerative geometry]<br> | ||

by Bertrand Eynard (SPhT), Nicolas Orantin (CERN) (0811.3531 [hep-th], review article, Latex, 139 pages, many figures) | by Bertrand Eynard (SPhT), Nicolas Orantin (CERN) (0811.3531 [hep-th], review article, Latex, 139 pages, many figures) |

## Latest revision as of 10:57, 11 April 2011

### reviews

Lectures on localization and matrix models in supersymmetric Chern-Simons-matter theories

by Marcos Marino (1104.0783 [hep-th], 71 pages, 7 figures)

Algebraic methods in random matrices and enumerative geometry

by Bertrand Eynard (SPhT), Nicolas Orantin (CERN) (0811.3531 [hep-th], review article, Latex, 139 pages, many figures)

Review of Matrix Theory

by Daniela Bigatti, Leonard Susskind (hep-th/9712072, 45 pages, 2 figures)

Matrix Models

by C. Sochichiu (hep-th/0506186, 38 pages)

M(atrix) Theory: Matrix Quantum Mechanics as a Fundamental Theory

by Washington Taylor (hep-th/0101126, 56 pages, 3 figures)

Taylor makes an effort to make his review accessible, to cover a broad range of topics, and to describe how matrix theory relates to other models.

The M(atrix) model of M-theory

by Washington Taylor (hep-th/0002016, 80 pages, 4 figures)

Introduction to M(atrix) theory and noncommutative geometry

by A. Konechny, A. Schwarz (hep-th/0012145)

Introduction to M(atrix) theory and noncommutative geometry, Part II

by A. Konechny, A. Schwarz (hep-th/0107251, 34 pages)

TASI Lectures on Matrix Theory

by Tom Banks (hep-th/9911068, 47 pages)

This review by a founder of matrix theory emphasizes discrete light-cone quantization and
compactifications.

M-Theory and the Light Cone

by Joseph Polchinski (hep-th/9903165, 13 pages, 3 figures)

An Introduction to the Quantum Supermembrane

by Arundhati Dasgupta, Hermann Nicolai, Jan Plefka (hep-th/0201182, 24 pages, 4 figures)

Membranes and Matrix Models

by Jens Hoppe (hep-th/0206192, 32 pages)

Nonperturbative Formulations of Superstring Theory

by Lubos Motl (hep-th/0109149, 156 pages, 4 figures)

IIB Matrix Model

H. Aoki, S. Iso, H. Kawai, Y. Kitazawa, T. Tada, A. Tsuchiya (hep-th/9908038, 37 pages, 2 figures)

Supermembranes and Super Matrix Models

by Bernard de Wit (hep-th/9902051, 41 pages)

Supermembranes and M(atrix) Theory

by Hermann Nicolai, Robert Helling (hep-th/9809103, 46 pages, 4 figures)

Supermembranes and Super Matrix Theory

by Bernard de Wit (hep-th/9802073, 19 pages)

Lectures on D-branes, Gauge Theory and M(atrices)

by Washington Taylor (hep-th/9801182, 80 pages, 8 figures)

Matrix Theory

by Tom Banks (hep-th/9710231, 72 pages)

M(atrix) Theory : a Pedagogical Introduction

by Adel Bilal (hep-th/9710136, 20 pages, 2 figures)

The State of Matrix Theory

by Tom Banks (hep-th/9706168, 11 pages)

Three Introductory Lectures in Helsinki on Matrix Models of Superstrings

by Yuri Makeenko (hep-th/9704075, 27 pages, 2 figure)

Symmetries and interactions in matrix string theory

by Feike Hacquebord (hep-th/9909227, 115 pages)