Operator Methods in Quantum Mechanics - Schechter - 1981M. Schechter: Operator Methods in Quantum Mechanics, North Holland, New York/Oxford, 1981.M. Schechter: Operator Methods in Quantum Mechanics , North—Holland, New York 1981; reprinted by Dover Publications Inc., Mineola, NY 2002....
Fractional corresponding operator in quantum mechanics and applications: A uniform fractional Schrdinger equation in form and fractional quantization methods 来自 Semantic Scholar 喜欢 0 阅读量: 83 作者:X Zhang,C Wei,Y Liu,M Luo 摘要: In this paper we use Dirac function to construct a fractional...
field theory and quantum mechanicscollisionselementary particlesequationsmany body problemmatricesmotionoperatorsprobabilityWe analyse the quantum mechanical collision operator for three incident free particles from the point of view of transport theory. Starting from the Liouville-von Neumann equation for the ...
Does this also mean that operatorA^A^is always hermitian, or is it only hermitian if the coëfficientsaiaiare real? Are in this caseaiaieigenvalues or are they coëfficients determining the chance a certain observation|ai|2/N2<ψn|ψn>|ai|2/N2<ψn|ψn>, (NNis normalisation), takes ...
Operator Methods in Quantum Mechanics Though Schechter has very skilfully intertwined the mathematics and the physics by introducing the mathematical apparatus only as needed and presenting only the formalism required for the physical applications, the text is nevertheless too ... Vvedensky,D D - 《...
theory stochastic processes/ functional formulations stochastic dynamics operator ordering schemes c-number formulations quantum mechanics generating functionals functional integrals Schrodinger equation Fokker Planck equation/ A0365C Formalism in quantum theory A0365D Functional analytical methods in quantum theory...
Operator algebras and quantum statistical mechanics - Bratteli, Robinson - 1987BRI,II] Bratteli, O., Robinson, D.: Operator Algebras and Quantum Statistical Mechanics 1,2. Texts and Monographs in Physics, Berlin: Springer-Verlag, 2nd edition, 1987...
in this paper enable us to characterize the time evolution of a post-selected operator. The methods can be applied to other evolutionary/transport equations including the Fokker–Planck equation, and the equation of Brownian motion.
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Frank E. Harris, in Mathematical Methods for Physicists (Seventh Edition), 2013 5.4 Self-Adjoint Operators Operators that are self-adjoint (Hermitian) are of particular importance in quantum mechanics because observable quantities are associated with Hermitian operators. In particular, the average value...