ÁlvarezCónsul, Luis 1970
Overview
Works:  7 works in 25 publications in 2 languages and 211 library holdings 

Genres:  Conference papers and proceedings 
Roles:  Editor, Author 
Publication Timeline
.
Most widely held works by
Luis ÁlvarezCónsul
Feynman amplitudes, periods, and motives : international research workshop, periods and motives : a modern perspective on
renormalization : July 26, 2012, Instituto de Ciencias Matemáticas, Madrid, Spain by International Research Workshop Periods and Motives  a Modern Perspective on Renormalization(
Book
)
9 editions published between 2012 and 2015 in English and held by 133 WorldCat member libraries worldwide
This volume contains the proceedings of the International Research Workshop on Periods and MotivesA Modern Perspective on Renormalization, held from July 26, 2012, at the Instituto de Ciencias Matemáticas, Madrid, Spain. Feynman amplitudes are integrals attached to Feynman diagrams by means of Feynman rules. They form a central part of perturbative quantum field theory, where they appear as coefficients of power series expansions of probability amplitudes for physical processes. The efficient computation of Feynman amplitudes is pivotal for theoretical predictions in particle physics. Periods are numbers computed as integrals of algebraic differential forms over topological cycles on algebraic varieties. The term originated from the period of a periodic elliptic function, which can be computed as an elliptic integral. Motives emerged from Grothendieck's "universal cohomology theory", where they describe an intermediate step between algebraic varieties and their linear invariants (cohomology). The theory of motives provides a conceptual framework for the study of periods. In recent work, a beautiful relation between Feynman amplitudes, motives and periods has emerged. The articles provide an exciting panoramic view on recent developments in this fascinating and fruitful interaction between pure mathematics and modern theoretical physics
9 editions published between 2012 and 2015 in English and held by 133 WorldCat member libraries worldwide
This volume contains the proceedings of the International Research Workshop on Periods and MotivesA Modern Perspective on Renormalization, held from July 26, 2012, at the Instituto de Ciencias Matemáticas, Madrid, Spain. Feynman amplitudes are integrals attached to Feynman diagrams by means of Feynman rules. They form a central part of perturbative quantum field theory, where they appear as coefficients of power series expansions of probability amplitudes for physical processes. The efficient computation of Feynman amplitudes is pivotal for theoretical predictions in particle physics. Periods are numbers computed as integrals of algebraic differential forms over topological cycles on algebraic varieties. The term originated from the period of a periodic elliptic function, which can be computed as an elliptic integral. Motives emerged from Grothendieck's "universal cohomology theory", where they describe an intermediate step between algebraic varieties and their linear invariants (cohomology). The theory of motives provides a conceptual framework for the study of periods. In recent work, a beautiful relation between Feynman amplitudes, motives and periods has emerged. The articles provide an exciting panoramic view on recent developments in this fascinating and fruitful interaction between pure mathematics and modern theoretical physics
Geometry and quantization of moduli spaces by
Vladimir V Fock(
)
11 editions published between 2016 and 2017 in English and German and held by 54 WorldCat member libraries worldwide
This volume is based on four advanced courses held at the Centre de Recerca Matemàtica (CRM), Barcelona. It presents both background information and recent developments on selected topics that are experiencing extraordinary growth within the broad research area of geometry and quantization of moduli spaces. The lectures focus on the geometry of moduli spaces which are mostly associated to compact Riemann surfaces, and are presented from both classical and quantum perspectives
11 editions published between 2016 and 2017 in English and German and held by 54 WorldCat member libraries worldwide
This volume is based on four advanced courses held at the Centre de Recerca Matemàtica (CRM), Barcelona. It presents both background information and recent developments on selected topics that are experiencing extraordinary growth within the broad research area of geometry and quantization of moduli spaces. The lectures focus on the geometry of moduli spaces which are mostly associated to compact Riemann surfaces, and are presented from both classical and quantum perspectives
Feynman Amplitudes, Periods and Motives by
Luis ÁlvarezCónsul(
)
1 edition published in 2015 in English and held by 13 WorldCat member libraries worldwide
This volume contains the proceedings of the International Research Workshop on Periods and MotivesA Modern Perspective on Renormalization, held from July 26, 2012, at the Instituto de Ciencias Matemáticas, Madrid, Spain. Feynman amplitudes are integrals attached to Feynman diagrams by means of Feynman rules. They form a central part of perturbative quantum field theory, where they appear as coefficients of power series expansions of probability amplitudes for physical processes. The efficient computation of Feynman amplitudes is pivotal for theoretical predictions in particle physics. Period
1 edition published in 2015 in English and held by 13 WorldCat member libraries worldwide
This volume contains the proceedings of the International Research Workshop on Periods and MotivesA Modern Perspective on Renormalization, held from July 26, 2012, at the Instituto de Ciencias Matemáticas, Madrid, Spain. Feynman amplitudes are integrals attached to Feynman diagrams by means of Feynman rules. They form a central part of perturbative quantum field theory, where they appear as coefficients of power series expansions of probability amplitudes for physical processes. The efficient computation of Feynman amplitudes is pivotal for theoretical predictions in particle physics. Period
Vector bundles and complex geometry : conference on vector bundles in honor of S. Ramanan on the occasion of his 70th birthday,
June 1620, 2008, Miraflores de la Sierra, Madrid, Spain by Conference on Vector Bundles in Honor of S. Ramanan(
Book
)
1 edition published in 2010 in English and held by 8 WorldCat member libraries worldwide
This volume contains a collection of papers from the conference on Vector Bundles held at Miraflores de la sierra, Madrid, Spain on June 1620, 2008, which honored S. Ramanan on his 70th birthday
1 edition published in 2010 in English and held by 8 WorldCat member libraries worldwide
This volume contains a collection of papers from the conference on Vector Bundles held at Miraflores de la sierra, Madrid, Spain on June 1620, 2008, which honored S. Ramanan on his 70th birthday
Feynman amplitudes, periods and motives International Research Workshop Periods and Motives  A Modern Perspective on Renormalization,
July 2  6, 2012, Instituto de Ciencias Matemáticas, Madrid, Spain(
)
1 edition published in 2015 in English and held by 1 WorldCat member library worldwide
1 edition published in 2015 in English and held by 1 WorldCat member library worldwide
Vector Bundles and Complex Geometry by
O GarcíaPrada(
)
1 edition published in 2010 in English and held by 1 WorldCat member library worldwide
1 edition published in 2010 in English and held by 1 WorldCat member library worldwide
Feynman Amplitudes, Periods and Motives by
Luis ÁlvarezCónsul(
Book
)
1 edition published in 2015 in English and held by 1 WorldCat member library worldwide
This volume contains the proceedings of the International Research Workshop on Periods and MotivesA Modern Perspective on Renormalization, held from July 26, 2012, at the Instituto de Ciencias Matemáticas, Madrid, Spain. Feynman amplitudes are integrals attached to Feynman diagrams by means of Feynman rules. They form a central part of perturbative quantum field theory, where they appear as coefficients of power series expansions of probability amplitudes for physical processes. The efficient computation of Feynman amplitudes is pivotal for theoretical predictions in particle physics. Periods are numbers computed as integrals of algebraic differential forms over topological cycles on algebraic varieties. The term originated from the period of a periodic elliptic function, which can be computed as an elliptic integral. Motives emerged from Grothendieck's "universal cohomology theory", where they describe an intermediate step between algebraic varieties and their linear invariants (cohomology). The theory of motives provides a conceptual framework for the study of periods. In recent work, a beautiful relation between Feynman amplitudes, motives and periods has emerged. The articles provide an exciting panoramic view on recent developments in this fascinating and fruitful interaction between pure mathematics and modern theoretical physics
1 edition published in 2015 in English and held by 1 WorldCat member library worldwide
This volume contains the proceedings of the International Research Workshop on Periods and MotivesA Modern Perspective on Renormalization, held from July 26, 2012, at the Instituto de Ciencias Matemáticas, Madrid, Spain. Feynman amplitudes are integrals attached to Feynman diagrams by means of Feynman rules. They form a central part of perturbative quantum field theory, where they appear as coefficients of power series expansions of probability amplitudes for physical processes. The efficient computation of Feynman amplitudes is pivotal for theoretical predictions in particle physics. Periods are numbers computed as integrals of algebraic differential forms over topological cycles on algebraic varieties. The term originated from the period of a periodic elliptic function, which can be computed as an elliptic integral. Motives emerged from Grothendieck's "universal cohomology theory", where they describe an intermediate step between algebraic varieties and their linear invariants (cohomology). The theory of motives provides a conceptual framework for the study of periods. In recent work, a beautiful relation between Feynman amplitudes, motives and periods has emerged. The articles provide an exciting panoramic view on recent developments in this fascinating and fruitful interaction between pure mathematics and modern theoretical physics
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