9 edition of **Stochastic variational approach to quantum-mechanical few-body problems** found in the catalog.

- 3 Want to read
- 3 Currently reading

Published
**1998**
by Springer in Berlin, New York
.

Written in English

- Few-body problem.,
- Quantum theory.,
- Random variables.

**Edition Notes**

Includes bibliographical references (p. [299]-305)and index.

Statement | Yasuyuki Suzuki, Kálmán Varga. |

Series | Lecture notes in physics., m54 |

Contributions | Varga, Kálmán, 1963- |

Classifications | |
---|---|

LC Classifications | QC174.17.P7 S89 1998 |

The Physical Object | |

Pagination | xiv, 310 p. : |

Number of Pages | 310 |

ID Numbers | |

Open Library | OL382443M |

ISBN 10 | 3540651527 |

LC Control Number | 98044833 |

A stochastic variational optimization of the basis function parameters facilitates the calculation of accurate energies and wave functions for the ground and some excited rotational- Stochastic Variational Approach to Quantum-Mechanical Few Cited by: Stochastic Variational Approach To Quantum Mechanical Few Body Problems Author are a wave-function expansion in terms of correlated Gaussians and an optimization of the variational trial function by stochastic sampling. The book is written for physicists and, especially, for graduate students interested in quantum few-body physics.

Stochastic variational approach to quantum-mechanical Few Body Syst. problems. Phys. (Verlag): M54 () 1. [] Gaussian expansion method for few-body systems - Hiyama, E. et al. 51 () []. The quantum mechanics of two-electron systems is reviewed, starting with the ground state of the helium atom and helium-like ions, with central charge Z≥2. For Z=1, demonstrating the stability of the negative hydrogen ion, H−, cannot be achieved using a mere product of individual electron wave functions, and requires instead an explicit account for the anticorrelation among the two.

the better the parameter set. The parameter selection is carried out using the stochastic variational method [35], in which new basis functions are generated one by one. Trial values for the parameters of the spatial basis functions, Eq. (22), K, ui, lnαij, are drawn from discrete uniform, continuous uniform, and normal distributions Cited by: 2. Scribd is the world's largest social reading and publishing site.

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The quantum-mechanical few-body problem is of fundamental importance for all branches of microphysics and it has substantially broadened with the advent of modern computers.

This book gives a simple, unified recipe to obtain precise solutions to virtually any few-body bound-state problem and presents its application to various problems in. Find many great new & used options and get the best deals for Lecture Notes in Physics Monographs: Stochastic Variational Approach to Quantum-Mechanical Few-Body Problems 54 by Yasuyuki Suzuki (, Hardcover) at the best online.

Stochastic Variational Approach to Quantum-Mechanical Few-Body Problems, Volume 54 Volume 54 of Lecture Notes in Physics Monographs, [Lecture notes in physics, ISSN Stochastic Variational Approach to Quantum-mechanical Few-body Problems, Yasuyuki Suzuki: Authors: Yasuyuki Suzuki, Miki Suzuki, Kalman Varga: Edition: illustrated: Publisher.

Part of the Lecture Notes in Physics book series (LNPMGR, volume 54) Abstract. As a first step toward the goal of giving a unified and reasonably simple recipe for solutions of few-body bound-state problems the basic notations and concepts are introduced here. Quantum-mechanical few-body problems.

In: Stochastic Variational Approach to. Get this from a library. Stochastic variational approach to quantum-mechanical few-body problems.

[Yasuyuki Suzuki; Kálmán Varga] -- The quantum-mechanical few-body problem is of fundamental importance for all branches of microphysics and it has substantially broadened with the advent of modern computers. This book gives a simple. Solution of few-body problems in atomic, nuclear, subnuclear and solid state physics with the stochastic variational method.

(Details are in our book which is in press: "Stochastic variational approach to quantum mechanical few-body problems", Y. Suzuki and. Quantum-mechanical few-body problems.- to variational methods.- Stochastic variational method.- Other methods to solve few-body problems.- Variational trial functions.- Matrix elements for spherical Gaussians.- Small atoms and molecules.- Baryon spectroscopy.- Few-body problems in solid state physics.- Nuclear few-body systems.

Series Title. Recent book very much in the spirit of the RG/EFT approach to many-body physics with emphasis on low-energy field theories, path integrals, universality.

Stochastic variational approach to quantum-mechanical few-body problems: QCP7 S89 The bible on the SVM method. Very accessible. Follow Miki Suzuki and explore their bibliography from 's Miki Suzuki Author Page.

This book is a rigorous, unified account of the fundamental principles of the density-functional theory of the electronic structure of matter and its applications to atoms and molecules.

Containing a detailed discussion of the chemical potential and its derivatives, it provides an understanding of the concepts of electronegativity, hardness and softness, and chemical 4/5(2).

Stochastic variational approach to resonances of Ps(-) and PS2 Article in Nuclear Instruments and Methods in Physics Research Section B Beam Interactions. Classic authoritative book on quantum mechanical scattering. Second edition now available as a (relatively:) Stochastic variational approach to quantum-mechanical few-body problems: QCP7 S89 The bible on the SVM method.

Very accessible. popular approaches to tackle quantum-mechanical few-body problems. Though it gives only an approximate solution except for some special cases (the Ritz variational method, for example, gives only an upper bound of the energy), one can get a virtually exact solution with an appropriately chosen function space.

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Stochastic Variational Approach to Quantum-Mechanical Few-Body Problems by Yasuyuki Suzuki,Kalman Varga Book Summary: The quantum-mechanical few-body problem is of fundamental importance for all branches of microphysics and it has substantially broadened with the advent of modern computers. Few- and many-body methods in nuclear physics.

Stochastic Variational Approach to Quantum-Mechanical Few-Body Problems. Article. variational approach is Author: Michele Viviani.

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Suzuki, K. Varga, Stochastic variational approach to quantum-mechanical few-body problems (Lecture notes in physics, Vol. 54). Springer, Berlin Heidelberg New York K.

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