Quantum Potential: Physics, Geometry and Algebra, 2014 SpringerBriefs in Physics Series
Auteurs : Licata Ignazio, Fiscaletti Davide
From the Contents: Quantum Potential.- The Quantum Potential in Schrödinger Equation.- The Pilot Wave Theory.- Particles’ trajectories as the foundation of Bohm’s mechanics: the nutshell of Dürr, Goldstein, Tumulka and Zanghì.- Non-Commutative Quantum Geometry and the Algebraic Approach to Non-Locality.- Quantum potential in particle and field theory models.- Klein Gordon Equation and Bertoldi-Faraggi-Matone Theory.- The quantum potential in Bohm’s approach to the Dirac relativistic quantum mechanics.- Quantum Potential in Curved Space Field Theory.
Includes supplementary material: sn.pub/extras
Date de parution : 12-2013
Ouvrage de 106 p.
15.5x23.5 cm
Mots-clés :
Interpretation of Quantum Mechanics; Kak’s Approach to Quantum Information; Non-Commutative Quantum Geometry; Non-locality; Quantum Fields and Cosmology; Quantum Information; Quantum Potential; Quantum Potential in Curved Space Field Theory; Quantum potential in particle and field theory models; The Algebraic Approach to Non-Locality; The Geometric Approach to Quantum Information; The Pilot Wave Theory; The quantum potential in Bohm’s approach to the Dirac; Von Neumann’s Entropy and