'The study of minimally complicated models is central to the field of condensed-matter physics. Those models, and the tools needed to understand them, are the subject of Ramamurti Shankar's new book,Quantum Field Theory and Condensed Matter: An Introduction. What is different about Shankar's text? For one thing, it is shorter [than his competitors]. Accordingly, Shankar's book is less ambitious in its aim and more selective in its content. That makes it both a more introductory text and a friendlier read. It will be a good textbook for a one-semester first-year graduate course.' Mike Stone, Physics Today
'[The book] provides a broad review of many different techniques and models used daily in the theoretical condensed matter community. The presentation is done in a quite individual and elegant way the book can be used self-consistently as a source for an advanced statistical mechanics course at the master degree level Shankar covers a wide variety of models ranging from the celebrated classical two-dimensional Ising model to the XY model and Zq gauge theories, and finally to models developed for the quantum Hall effect such as the BohmPines or ChernSimons theories. In the middle of the book, there are six chapters giving an extensive survey on the renormalization group theory (a book within a book, as Daniel Arovas wrote) and two self-contained chapters dealing with bosonization. Again, here, these chapters may be used self-consistently in order to teach the material.' Acta Crystallographica Section A: Foundations Advances
'Since the Nobel Prize-winning work of Ken Wilson in the 1970s, quantum field theory has been a fundamental tool in condensed matter theory Shankar presents more than enough material for a one- or two-semester course, and the book could be used to teach at a variety of levels. There is a substantial amount of classic material: the Ising model and critical phenomena, the relation of the Feynman path integral to statistical mechanics, and the renormalization group. The text ventures beyond these, with treatments of coherent state path integrals, gauge theories, duality, and bosonization. Topics of great modern importance include Majorana fermions and the quantum Hall effect. It is notable that both the Lagrangian and Hamiltonian forms of lattice models are treated. This clear, authoritative text should be available at any institution where modern condensed matter physics is studied.' M. C. Ogilvie, Choice
' the rst few chapters are about techniques one has to learn before learning the real techniques. The book starts with a review of Thermodynamics and Statistical Mechanics. The Ising model is discussed next. [Other] topics covered are Statistical to Quantum Mechanics Quantum to Statistical Mechanics Feynman Path Integral, Coherent State Path Integrals, Two dimensional Ising model and its exact solution and Majorana Fermions. Further Gauge Theories, The Renormalization Group and Critical Phenomena, dierent views of Renormalization, Bosonization and Duality and Triality are described. The nal Chapter covers Techniques for Quantum Hall Eect. Each chapter ends with a list of references for further reading. Overall, a very useful book for researchers.' T. C. Mohan, zbMATH
'The next best analogy to relativistic quantum field theory is the concept of quasi-particles like phonons, excitons, plasmons and the like which emerge in solid state physics. Shankar's book goes much deeper than this simple analogy. It examines topics like Majorana fermions, gauge theory, the renormalization group equation, bosonization and triviality. These topics are well known to anybody familiar with the relativistic version of quantum field theory. They [also] play a role in condensed matter physics, as the author skillfully explains, touching hereby standard themes of solid state physics like superconductivity, the Ising and Hubbard model and the Hall effect Every chapter is accompanied by a brief introduction This is interlaced with remarks on personal experiences of the author. [the] personal style is a pedagogical highlight. The book is perfect ' Marek Nowakowski, Mathematical Reviews