What quantum mechanics describes is - Philsci
... one-to-one relation still exists for every component function, and these vector functions ...
... one-to-one relation still exists for every component function, and these vector functions ...
The path integral representation kernel of evolution operator in
... The path integral method was proposed by R. Feynman as a new approach [1] to the solution of quantum mechanical problems. Nowadays it became one of the most powerful methods in theoretical physics. Many applications (see [2–5]) of this method are devoted to diverse important problems. In articles [6 ...
... The path integral method was proposed by R. Feynman as a new approach [1] to the solution of quantum mechanical problems. Nowadays it became one of the most powerful methods in theoretical physics. Many applications (see [2–5]) of this method are devoted to diverse important problems. In articles [6 ...
Ultrafast geometric control of a single qubit using chirped pulses
... gates have been proposed for quantum computation [1–3]. Various combinations of quantum gates have been intensively discussed in the literature related to the universality in quantum computation [1, 4–6]. To perform quantum computation, one must have two major building blocks at their disposal: (i) ...
... gates have been proposed for quantum computation [1–3]. Various combinations of quantum gates have been intensively discussed in the literature related to the universality in quantum computation [1, 4–6]. To perform quantum computation, one must have two major building blocks at their disposal: (i) ...
27_1.pdf
... where b ( v, µ ) = v σθ ( v, µ ) is a scattering indicatrix, µ ( R v2 angle, and F( ξ )=f D ψ ( ξ ) = f( v ) ψ( u ) is the two-particle velocity distribution function. The fact (eq.(3)) that collision matrixes constitute a group gives us essentially new opportunities for investigating the Boltzmann ...
... where b ( v, µ ) = v σθ ( v, µ ) is a scattering indicatrix, µ ( R v2 angle, and F( ξ )=f D ψ ( ξ ) = f( v ) ψ( u ) is the two-particle velocity distribution function. The fact (eq.(3)) that collision matrixes constitute a group gives us essentially new opportunities for investigating the Boltzmann ...
Field Formulation of Many-Body Quantum Physics {ffmbqp
... structure called quantum field theory. As a first step towards developing this powerful theory we shall start from the well-founded Schrödinger theory of nonrelativistic spinless particles. We show that there exists a completely equivalent formulation of this theory in terms of quantum fields. This ...
... structure called quantum field theory. As a first step towards developing this powerful theory we shall start from the well-founded Schrödinger theory of nonrelativistic spinless particles. We show that there exists a completely equivalent formulation of this theory in terms of quantum fields. This ...
Exactly Solvable Problems in Quantum Mechanics
... either upon cleverly chosen ansätze or upon the idea of dynamical symmetry carried over from the classical physics. Later on, new methods appeared, some of which were based on some kind of hidden symmetry of the problem (or of the class of problems) while others made use e.g. of special functions. ...
... either upon cleverly chosen ansätze or upon the idea of dynamical symmetry carried over from the classical physics. Later on, new methods appeared, some of which were based on some kind of hidden symmetry of the problem (or of the class of problems) while others made use e.g. of special functions. ...
Elementary Introduction to Quantum Field Theory in Curved Spacetime
... This course is a brief introduction to Quantum Field Theory in Curved Spacetime (QFTCS)—a beautiful and fascinating area of fundamental physics. The application of QFTCS is required in situations when both gravitation and quantum mechanics play a significant role, for instance, in early-universe cos ...
... This course is a brief introduction to Quantum Field Theory in Curved Spacetime (QFTCS)—a beautiful and fascinating area of fundamental physics. The application of QFTCS is required in situations when both gravitation and quantum mechanics play a significant role, for instance, in early-universe cos ...
