4 edition of **Boundary value problems, Schrödinger operators, deformation quantization** found in the catalog.

Boundary value problems, Schrödinger operators, deformation quantization

- 96 Want to read
- 37 Currently reading

Published
**1996**
by Akademie Verlag in New York
.

Written in English

- Boundary value problems,
- Schrödinger operator,
- Perturbation (Mathematics),
- Quantum groups,
- Mathematical physics -- Congresses

**Edition Notes**

Includes bibliographical references.

Statement | edited by Michael Demuth, Elmar Schrohe, Bert-Wolfgang Schulze (editor-in-chief). |

Series | Advances in partial differential equations, Mathematical topics,, v. 8, Mathematical topics (Berlin, Germany) ;, v. 8. |

Contributions | Demuth, Michael, 1946-, Schrohe, Elmar, 1956-, Schulze, Bert-Wolfgang. |

Classifications | |
---|---|

LC Classifications | QA379 .B69 1996 |

The Physical Object | |

Pagination | p. cm. |

ID Numbers | |

Open Library | OL811321M |

ISBN 10 | 3055016998 |

LC Control Number | 95048233 |

The Construction of Transition Operators The Calculation of the Obstructing Cocycle Symplectic Reduction The Marsden-Weistein Reduction Quantization of the Fibering Space Quantum Reduction Discussion A Trace Formula for the Schrodinger Operator The Wick and Anti-Wick Symbols The Mathematical Modelling of Natural Phenomena (MMNP) is an international research journal, which publishes top-level original and review papers, short communications and proceedings on mathematical modelling in biology, medicine, chemistry, physics, and other by: 7.

We discuss a recent method proposed by Kryukov and Walton to address boundary-value problems in the context of deformation quantization. We . Michael Reed and Barry Simon, Methods of modern mathematical physics. I. Functional analysis, Academic Press, New York-London, MR ; 8. M. M. Skriganov, Geometric and arithmetic methods in the spectral theory of multidimensional periodic operators, Trudy Mat. Inst. Steklov. (), (Russian). MR

Topics include proof of the existence of wave operators, some special equations of mathematical physics — including Maxwell equations, the linear equations of elasticity and thermoelasticity, and the plate equation — exterior boundary value problems, Author: Rolf Leis. Boundary Value Problems, Schrödinger Operators, Deformation Quantization. Advances in Partial Differential Equations 2. Akademie Verlag, Berlin, (Editor together with E. Schrohe and B.-W. Schulze) Schrödinger Operators, Markov-Semigroups, Wavelet Analysis, Operator Algebras. Advances in Partial Differential Equations 3.

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ISBN: OCLC Number: Description: pages ; 25 cm. Contents: The Variable Discrete Asymptotics in Pseudo-Differential Boundary Value Problems II / B.-W. Schulze --Boundary Value Problems in Boutet de Monvel's Algebra for Manifolds with Conical Singularities II / E.

Schrohe and B.-W. Schulze --The Index Theorem for Deformation Quantization /. Boundary Value Problems, Schrödinger Operators, Deformation Quantiza tion, Michael Demuth, Elmar Schrohe, Bert-Wolfgang Schulze (Ed itors), Akademie Verlag, Berlinpag., ISBN 3. B.-W. Schulze. The variable discrete asymptotics in pseudo-differential boundary value problems.

In Advances in Partial Differential Equations (Boundary Value Problems,Schrödinger Operators, Deformation Quantization),pages 9– Akademie Verlag, Berlin, Google ScholarCited by: E. Schrohe and B.-W. SchulzeBoundary value problems in Boutet de Monvel’s algebra for manifolds with conical singularities IIBoundary Value Problems, Schrödinger Operators, Deformation Quantization, Math.

Top., Vol. 8, Akademie Verlag, Berlin,70– Google ScholarCited by: 4. Schrohe and B.-W. Schulze, Boundary value problems in Boutet de Monvel’s calculus for manifolds with conical singularities II, Boundary Value Problems, Schrodinger Operators, Deformation Quantization (Akademie Verlag, Berlin), Advances in Partial Differential Equations,pp.

70– Google ScholarCited by: 4. Schrohe and B.-W. Schulze, Boundary value problems in Boutet de Monvel’s calculus for manifolds with conical singularities II, Boundary Value Problems, Schrodinger Operators, Deformation Quantization (Akademie Verlag, Berlin), Advances in Partial Differential Equations,pp.

70– Google ScholarCited by: Schrohe, E., Schulze, B.-W.: Boundary value problems in Boutet de Monvel’s algebra for manifolds with conical singularities II. Boundary Value Problems, Schrödinger Operators, Deformation Quantization, Advances in Partial Differential Equations 2; Cited by: Explanation.

Boundary value problems are similar to initial value problems.A boundary value problem has conditions specified at the extremes ("boundaries") of the independent variable in the equation whereas an initial value problem has all of the conditions specified at the same value of the independent variable (and that value is at the lower boundary of the domain, thus the term "initial.

Schrohe and B.-W. Schulze, Boundary value problems in Boutet de Monvel’s calculus for manifolds with conical singularities II, in Boundary Value Problems, Schrödinger Operators, Deformation Quantization, Advances in Partial Differential Equations (Akademie Verlag, Berlin, ), pp.

70– Google Scholar; by: 4. Boundary Value Problems in Boutet de Monvel's Algebra for Manifolds with Conical Singularities II. Elmar Schrohe, B.-Wolfgang Schulze Advances in Partial Differential Equations 2, pp.

70 - (= Boundary Value Problems, Schrödinger Operators, Deformation Quantization, Akademie Verlag, Berlin ()) pdf. Boundary value problems for pseudodifferential operators (with orwithout the transmission property) are characterised as a substructureof the edge pseudodifferential calculus with constant.

We consider C = A + B where A is selfadjoint with a gap (a, b) in its spectrum and B is (relatively) compact. We prove a general result allowing B of indefinite sign and apply it to obtain a (δ V) d / 2 bound for perturbations of suitable periodic Schrödinger operators and a (not quite) Lieb–Thirring bound for perturbations of algebro-geometric almost periodic Jacobi by: Group Actions in Deformation Quantisation.

Boundary value problems, Schrödinger operators, deformation quantization, Mathematical Topics Vol. 8, Akademie Verlag, Berlin, () Author: Simone Gutt. Differential operators and boundary value problems on hypersurfaces Article in Mathematische Nachrichten () July with 71 Reads How we measure 'reads'.

In this paper, we study the boundary value problem of a fractional q-difference equation with nonlocal conditions involving the fractional q-derivative of the Caputo type, and the nonlinear term contains a fractional q-derivative of Caputo type.

By means of Bananch’s contraction mapping principle and Schaefer’s fixed-point theorem, some existence results for the solutions are Cited by: 6. In this paper, we study the boundary value problems of a class of fractional q-difference Schröinger equations involving the Riemann–Liouville fractional means of a fixed point theorem in cones, some positive solutions are by: NOTES ON DEFORMATION QUANTIZATION SHILIN YU Abstract.

Contents 1. Deformation theory 1 Deformation of associative algebras 1 Hochschild complex and dg-Lie algebra 2 Deformation quantization of Poisson manifolds 5 2. Kontsevich’s formality theorem 8 1. Deformation theory Deformation of associative algebras.

On account of its being the imaginary part of the boundary value of an analytic function, possibilities exist for its analytic continuation, QUANTIZATION AS AN EIGENVALUE PROBLEM to write dispersion relations for it, and for activities of a related nature.

Such relations have been extensively studied by theoretical physicists in other by: This paper addresses the problem of computing the eigenvalues lying in the gaps of the essential spectrum of a periodic Schrödinger operator perturbed by a fast decreasing potential. Schrohe and B.-W.

Schulze, Boundary value problems in Boutet de Monvel's algebra for manifolds with conical singularities II, in Boundary value problems, Deformation quantization, Schrödinger operators, Advances in Partial Differential Equations, Akad.-Verlag, Berlin, Cited by: 7.

The index theorem for deformation quantization, in Boundary Value Problems, Schrödinger Operators, Deformation Quantization, Advances in Partial Differential Equations, pp.

– (Akademie, Berlin, ).BOOK REVIEW: Boundary Value Problems, Schrödinger Operators, Deformation Quatization Conformal transformations and Hardy spaces arising in Clifford analysis The equivariant Brauer groups 36 of principal bundles 36 2 SILBERMANN, В.

(with ROCH, S.) SPIELBERG, J.S. (with ARCHBOLD, R.J.) STEGER, T. (with ROBERTSON, G.) 35 2 1 methods of quantization; see (BW) for a general introduction to the geometry of quantization, and a speci c geometric method (geometric quantization).

In this survey we will be interested in deformation quantization. In-tuitively a deformation of a mathematical object is a family of the same kind of objects depending on some parameter(s). The File Size: KB.