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LA PARTICELLA CHE HA CREATO L'UNIVERSO: IL MONOPOLO MAGNETICO DI PAUL DIRAC eBooks & eLearning

Posted by hill0 at April 1, 2020

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LA PARTICULE QUI A CRÉÉ L'UNIVERS: LE MONOPOLE MAGNÉTIQUE DE PAUL DIRAC eBooks & eLearning

Posted by hill0 at May 27, 2020

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Graham Farmelo - L’uomo più strano del mondo. Vita segreta di Paul Dirac, il genio dei quanti (Repost) eBooks & eLearning

Posted by Karabas91 at Nov. 4, 2017

Paul Dirac (1902-1984), detto "il taciturno", era una figura dalle mille contraddizioni, che dovevano fare di lui l'uomo più strano del secolo: impacciato nella conversazione e mirabile nell'esposizione scientifica, timido con le donne e insieme capace di lasciarsi attrarre dal fascino femminile, rigoroso con colleghi e studenti e intanto appassionato di Topolino, freddo "come un ghiacciolo", ma anche pronto a battersi fino all'ultimo in difesa dei propri amici. Questo era "il fisico più bizzarro del mondo", colui che ha ricostruito l'intero edificio della meccanica quantistica, ha "inventato" l'antimateria prima di qualsiasi conferma sperimentale, ha ripensato insieme la fisica del molto grande e del molto piccolo aprendo nuovi orizzonti nella comprensione dell'Universo. E tutto ciò, come lui stesso amava ripetere, "lasciandomi prendere per mano dalla matematica".

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Analytic Deformations of the Spectrum of a Family of Dirac Operators on an Odd-Dimensional Manifold With Boundary eBooks & eLearning

Posted by insetes at Nov. 20, 2018

Analytic Deformations of the Spectrum of a Family of Dirac Operators on an Odd-Dimensional Manifold With Boundary By P. Kirk, E. Klassen
1997 | 58 Pages | ISBN: 082180538X | PDF | 7 MB

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Introduction to Symplectic Dirac Operators eBooks & eLearning

Posted by insetes at Sept. 21, 2020

Introduction to Symplectic Dirac Operators By Katharina Habermann, Lutz Habermann (auth.)
2006 | 125 Pages | ISBN: 3540334203 | PDF | 2 MB

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Geometric Multivector Analysis: From Grassmann to Dirac eBooks & eLearning

Posted by AvaxGenius at Nov. 10, 2019

Geometric Multivector Analysis: From Grassmann to Dirac by Andreas Rosén
English | PDF | 2019 | 471 Pages | ISBN : 3030314103 | 8.07 MB

This book presents a step-by-step guide to the basic theory of multivectors and spinors, with a focus on conveying to the reader the geometric understanding of these abstract objects. Following in the footsteps of M. Riesz and L. Ahlfors, the book also explains how Clifford algebra offers the ideal tool for studying spacetime isometries and Möbius maps in arbitrary dimensions.

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The Heat Kernel Lefschetz Fixed Point Formula for the Spin-c Dirac Operator eBooks & eLearning

Posted by insetes at Dec. 8, 2018

The Heat Kernel Lefschetz Fixed Point Formula for the Spin-c Dirac Operator By J. J. Duistermaat (auth.)
1996 | 247 Pages | ISBN: 1461253462 | PDF | 18 MB

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Orbiting the Moons of Pluto: Complex Solutions to the Einstein, Maxwell, Schrodinger and Dirac Equations eBooks & eLearning

Posted by interes at June 7, 2020

Orbiting the Moons of Pluto: Complex Solutions to the Einstein, Maxwell, Schrodinger and Dirac Equations by Elizabeth A. Rauscher, Richard L. Amoroso
English | 2011 | ISBN-10: 9814324248 | 400 pages | PDF | 7 MB

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Geometric Multivector Analysis: From Grassmann to Dirac (repost) eBooks & eLearning

Posted by hill0 at Nov. 24, 2019

Geometric Multivector Analysis: From Grassmann to Dirac by Andreas Rosén
English | 2019 | 471 Pages | ISBN : 3030314103 | PDF | 8 MB

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Self-adjoint Extensions in Quantum Mechanics: General Theory and Applications to Schrödinger and Dirac Equations with Singular eBooks & eLearning

Posted by insetes at April 8, 2019

Self-adjoint Extensions in Quantum Mechanics: General Theory and Applications to Schrödinger and Dirac Equations with Singular Potentials By D.M. Gitman, I.V. Tyutin, B.L. Voronov (auth.)
2012 | 511 Pages | ISBN: 0817646620 | PDF | 4 MB

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