5 edition of **Mathematical models and methods of localized interaction theory** found in the catalog.

- 345 Want to read
- 5 Currently reading

Published
**1995**
by World Scientific in Singapore, River Edge, NJ
.

Written in English

- Aerodynamics -- Mathematical models.

**Edition Notes**

Includes bibliographical references (p. 199-224) and index.

Other titles | Localized interaction theory. |

Statement | Abram I. Bunimovich, Anatolii V. Dubinskii. |

Series | Series on advances in mathematics for applied sciences ;, v. 25 |

Contributions | Dubinskii, Anatolii V. |

Classifications | |
---|---|

LC Classifications | QA930 .B787 1995 |

The Physical Object | |

Pagination | xi, 226 p. : |

Number of Pages | 226 |

ID Numbers | |

Open Library | OL1105217M |

ISBN 10 | 9810217439 |

LC Control Number | 94030339 |

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Mathematical Models and Methods of Localized Interaction Theory Abram I Bunimovich, Anatolii V Dubinskii The Sixth International Workshop on Complex Structures and Vector Fields was a continuation of the previous five workshops (,) on similar research projects.

Localized Interaction Theory as a Field of Use of Mathematics for Applied Sciences; Methods of Calculation of Integral Characteristics of Influence of Environment on Body Moving in It; Methods of Design of Bodies having Invariable Longitudinal Static Stability; Variation Problems of Finding Optimal Body's Surfaces; Generalization of the.

Localized Interaction Theory (LIT) studies various theoretical and applied problems using the most general description of the influence of the environment on the body.

This makes it possible to integrate results obtained from different models and to create new universal methods that can be used for various conditions, even if the description of. Get this from a library. Mathematical models and methods of localized interaction theory.

[Abram I Bunimovich; Anatolii V Dubinskii] -- The interaction of the environment with a moving body is called "localized" if it has been found or assumed that the force or/and thermal influence of the environment on each body surface point is.

PDF | On Jan 1,A.I. Bunimovich and others published Mathematical models and methods of localized interaction theory | Find, read and cite all the research you need on ResearchGate.

The interaction of the environment with a moving body is called "localized" if it has been found or assumed that the force or/and thermal influence of the environment on each body surface point is independent and can be determined by the local geometrical and kinematical characteristics of this point as well as by the parameters of the environment and body--environment interactions which are Author: Abram I Bunimovich.

Mathematical model of localized interaction between a medium and a body surface. Development and state-of-the-art of LIT. Origin and general evolution tendencies of LIT. Development of “localized” modelling methods. Methods of calculation and optimization of integral characteristics on the basis of specific local interaction models (LIM).

A mathematical model is a description of a system using mathematical concepts and process of developing a mathematical model is termed mathematical atical models are used in the natural sciences (such as physics, biology, earth science, chemistry) and engineering disciplines (such as computer science, electrical engineering), as well as in the social sciences (such.

Journal of Applied and Industrial Mathematics is a journal that publishes original and review articles containing theoretical results and those of interest for applications in various branches of industry.

The journal topics include the qualitative theory of differential equations in application to mechanics, physics, chemistry, biology, technical and natural processes; mathematical modeling.

Creating Traffic Models is a challenging task because some of their interactions and system components are difficult to adequately express in a mathematical form. Traffic Flow Theory: Characteristics, Experimental Methods, and Numerical Techniques provide traffic engineers with the necessary methods and techniques for mathematically.

Optimal body design using localized interaction models Article in Journal of Applied Mathematics and Mechanics 72(1) December with 3 Reads How we measure 'reads'.

Localizations of plastic deformation such as shear band and necking have been investigated during past several decades. From experimental observations. Chaos theory is a branch of mathematics focusing on the study of chaos—states of dynamical systems whose apparently-random states of disorder and irregularities are often governed by deterministic laws that are highly sensitive to initial conditions.

Chaos theory is an interdisciplinary theory stating that, within the apparent randomness of chaotic complex systems, there are underlying. These encompass three general categories (see Fig. 1): (1) statistical methods for surveillance of outbreaks and identification of spatial patterns in real epidemics, (2) mathematical models within the context of dynamical systems (also called state-space models) used to forecast the evolution of a “hypothetical” or on-going epidemic spread.

In this paper, we propose a model reduction method for solving multiscale elliptic PDEs with random coefficients in the multiquery setting using an optimization approach. The optimization approach. Mathematical models have both limitations and capabilities that must recognized.

Sometimes questions cannot be answered by using epidemiological models, but sometimes the modeler is able to find the right combination of available data, an interesting question and a mathematical model. Sustainability, an international, peer-reviewed Open Access journal.

Search for Articles. Title / Keyword. Abstract: In this paper, we mainly review recent results on mathematical theory and numerical methods for Bose-Einstein condensation (BEC), based on the Gross-Pitaevskii equation (GPE).

Starting from the simplest case with one-component BEC of the weakly interacting bosons, we study the reduction of GPE to lower dimensions, the ground states of BEC including the existence and.

Computational and Mathematical Methods in Medicine publishes research and review articles focused on the application of mathematics to problems arising from the biomedical sciences. mathematical concepts such as differential equations and Control theory techniques. This project attempts to illustrate both abstract and intuitive approaches based on examples arising in social and business systems.

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@article{osti_, title = {Chemisorption theory for metallic surfaces: Convergence of surface localized orbitals for Ti() clusters}, author = {Whitten, J L}, abstractNote = {A theory for treating chemisorption on metallic surfaces has been proposed based on a large cluster model for the lattice, treated approximately from which an N-electron subspace for a local region is defined by a.In the current work, a new generalized model of heat conduction has been constructed taking into account the influence of porosity on a poro-thermoelastic medium using the finite element method (FEM).

The governing equations are presented in the context of the Green and Naghdi (G-N) type III theory with and without energy dissipations. The finite element scheme has been adopted to present the.This chapter reviews spatially localized modes emerging in nonlinear discrete dynamical systems, which are called intrinsic localized modes.

After the notion of intrinsic localized mode is introduced.