Cardona, Alexander (ed.); Contreras, Iván (ed.); Reyes-Lega, Andrés F. (ed.) Geometric and topological methods for quantum field theory. Papers based on the presentations at the 6th summer school, Villa de Leyva, Colombia, July 6–23, 2009. (English) Zbl 1277.81005 Cambridge: Cambridge University Press (ISBN 978-1-107-02683-4/hbk; 978-1-139-20864-2/ebook). x, 383 p. (2013). Show indexed articles as search result. The articles of this volume will be reviewed individually. For the preceding summer school see [Zbl 1195.81006].Indexed articles:Bursztyn, Henrique, A brief introduction to Dirac manifolds, 1-38 [Zbl 1293.53001]Schaffhauser, Florent, Differential geometry of holomorphic vector bundles on a curve, 39-80 [Zbl 1295.32035]Paycha, Sylvie, Paths towards an extension of Chern-Weil calculus to a class of infinite dimensional vector bundles, 81-143 [Zbl 1292.58018]Weinzierl, Stefan, Introduction to Feynman integrals, 144-187 [Zbl 1295.81114]Brown, Francis, Iterated integrals in quantum field theory, 188-240 [Zbl 1295.81072]Boya, Luis J., Geometric issues in quantum field theory and string theory, 241-273 [Zbl 1297.81138]Scheck, Florian, Geometric aspects of standard model and the mysteries of matter, 274-306 [Zbl 1297.81182]Cano García, Leonardo A., Absence of singular continuous spectrum for some geometric Laplacians, 307-321 [Zbl 1293.58008]Contreras, Iván, Models for formal groupoids, 322-339 [Zbl 1296.81040]Vargas, Andrés, Elliptic PDEs and smoothness of weakly Einstein metrics of Hölder regularity, 340-365 [Zbl 1294.58003]Cardona, Alexander; Del Corral, César, Regularized traces and the index formula for manifolds with boundary, 366-380 [Zbl 1292.58014] Cited in 1 ReviewCited in 1 Document MSC: 81-06 Proceedings, conferences, collections, etc. pertaining to quantum theory 81Q70 Differential geometric methods, including holonomy, Berry and Hannay phases, Aharonov-Bohm effect, etc. in quantum theory 81Q30 Feynman integrals and graphs; applications of algebraic topology and algebraic geometry 81T30 String and superstring theories; other extended objects (e.g., branes) in quantum field theory 53C80 Applications of global differential geometry to the sciences 53Z05 Applications of differential geometry to physics 58Z05 Applications of global analysis to the sciences 14D21 Applications of vector bundles and moduli spaces in mathematical physics (twistor theory, instantons, quantum field theory) 00B25 Proceedings of conferences of miscellaneous specific interest Citations:Zbl 1195.81006 PDFBibTeX XMLCite \textit{A. Cardona} (ed.) et al., Geometric and topological methods for quantum field theory. Papers based on the presentations at the 6th summer school, Villa de Leyva, Colombia, July 6--23, 2009. Cambridge: Cambridge University Press (2013; Zbl 1277.81005) Full Text: DOI