Add to ORKGThe principle of invariance of the c-number symmetric bracket is used to derive both the quantum operator commutator relation $[\hat q, \hat p]=i\hbar$ and the time-dependent Schrödinger equation. A c-number dynamical equation is found which leads to the second quantized field theory of bosons and fermions
Statistical reformulation of quantum mechanics in terms of phase-space distribution functions as giv...
Our purpose in these lectures will be to provide a general introduction to the role played by consid...
By making use of the Weyl-Wigner-Groenewold-Moyal association rules, a commutative product and a new...
The principle of invariance of the c-number symmetric bracket is used to derive both the quantum ope...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
We postulate that physical states are equivalent under coordinate transformations. We then implement...
Courses about Quantum Mechanics are generally developed at the level of the mathematical formalism, ...
Recently we showed that the postulated diffeomorphic equivalence of states implies quantum mechanics...
The canonical commutation relation, $[Q,P] = i\hbar$, stands at the foundation of quantum theory and...
Can one represent quantum group covariant q-commuting ``creators, annihilators'' $A^+_i,A^j$ as oper...
Recently we showed that the postulated diffeomorphic equivalence of states implies quantum mechanics...
A simple exposition of the rarely discussed fact that a set of free boson fields describing differen...
We reconsider the (non-relativistic) quantum theory of indistinguishable particles on the basis of ...
Some applications of the odd Poisson bracket developed by Kharkov's theorists are represented, inclu...
Statistical reformulation of quantum mechanics in terms of phase-space distribution functions as giv...
Our purpose in these lectures will be to provide a general introduction to the role played by consid...
By making use of the Weyl-Wigner-Groenewold-Moyal association rules, a commutative product and a new...
The principle of invariance of the c-number symmetric bracket is used to derive both the quantum ope...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
A carefully motivated symmetric variant of the Poisson bracket in ordinary (not Grassmann) phase spa...
We postulate that physical states are equivalent under coordinate transformations. We then implement...
Courses about Quantum Mechanics are generally developed at the level of the mathematical formalism, ...
Recently we showed that the postulated diffeomorphic equivalence of states implies quantum mechanics...
The canonical commutation relation, $[Q,P] = i\hbar$, stands at the foundation of quantum theory and...
Can one represent quantum group covariant q-commuting ``creators, annihilators'' $A^+_i,A^j$ as oper...
Recently we showed that the postulated diffeomorphic equivalence of states implies quantum mechanics...
A simple exposition of the rarely discussed fact that a set of free boson fields describing differen...
We reconsider the (non-relativistic) quantum theory of indistinguishable particles on the basis of ...
Some applications of the odd Poisson bracket developed by Kharkov's theorists are represented, inclu...
Statistical reformulation of quantum mechanics in terms of phase-space distribution functions as giv...
Our purpose in these lectures will be to provide a general introduction to the role played by consid...
By making use of the Weyl-Wigner-Groenewold-Moyal association rules, a commutative product and a new...