-deformed superspace and -extended supersymmetric Hamiltonian with arbitrary superpotential
-Wakimoto modules and integral formulae of solutions of the quantum Knizhnik-Zamolodchikov equations.
Q-adapted quantum stochastic integrals and differentials in Fock scale
In this paper we first introduce the Fock-Guichardet formalism for the quantum stochastic (QS) integration, then the four fundamental processes of the dynamics are introduced in the canonical basis as the operator-valued measures, on a space-time σ-field , of the QS integration. Then rigorous analysis of the QS integrals is carried out, and continuity of the QS derivative D is proved. Finally, Q-adapted dynamics is discussed, including Bosonic (Q = I), Fermionic (Q = -I), and monotone (Q = O) quantum...
q-deformed circularity for an unbounded operator in Hilbert space
The notion of strong circularity for an unbounded operator is introduced and studied. Moreover, q-deformed circularity as a q-analogue of circularity is characterized in terms of the partially isometric and the positive parts of the polar decomposition.
QED on a lattice : I. Infrared asymptotic freedom for bounded fields
QR factorizations using a restricted set of rotations.
Quadratic algebra approach to an exactly solvable position-dependent mass Schrödinger equation in two dimensions.
Qualitative analysis of the classical and quantum Manakov top.
Quantification d'une variété symplectique
Quantification et analyse pseudo-différentielle
Quantification formelle des variétés de Poisson
Quantification relativiste
Quantization and Morita equivalence for constant Dirac structures on tori
We define a -algebraic quantization of constant Dirac structures on tori and prove that -equivalent structures have Morita equivalent quantizations. This completes and extends from the Poisson case a theorem of Rieffel and Schwarz.
Quantization effects for a variant of the Ginzburg-Landau type system.
Quantization of pencils with a gl-type Poisson center and braided geometry
We consider Poisson pencils, each generated by a linear Poisson-Lie bracket and a quadratic Poisson bracket corresponding to a so-called Reflection Equation Algebra. We show that any bracket from such a Poisson pencil (and consequently, the whole pencil) can be restricted to any generic leaf of the Poisson-Lie bracket. We realize a quantization of these Poisson pencils (restricted or not) in the framework of braided affine geometry. Also, we introduce super-analogs of all these Poisson pencils and...
Quantization of Poisson structures on .
Quantization of the cotangent bundle via the tangent groupoid
Quantization of the orientation preserving automorphisms of the torus
Quantization on submanifolds
Quantizations and symbolic calculus over the -adic numbers
We develop the basic theory of the Weyl symbolic calculus of pseudodifferential operators over the -adic numbers. We apply this theory to the study of elliptic operators over the -adic numbers and determine their asymptotic spectral behavior.