Tensor Arithmetic, Geometry and Mathematical Principles of Fluid Mechanics in the Implementation of Direct Computational Experiments

A.V. Bogdanov, V.N. Khramushin

Результат исследований: Материалы конференцийтезисы

Выдержка

Digital computing system could serve as a basis of a unified formation and specialized mathematical language to adequately describe of phenomena and processes in physical field theory. The way to renewal a computers is using a multi-processor systems with using of quite common large arrays of memory. It revives on the new technical level on the theoretical foundations for a functional programming, allowing highly arbitrary description for the physical properties of plurality elementary numerical objects, which capable to independent existence in a virtual environment with similar entities, are jointly modeling to real physical processes and realization of applied computational experiments with continuous control state of the substance and correctness of the physical laws. As a result of years research is summarize fundamental knowledge by elementary tensor notation for a numeric objects, which providing a linear space interpolation for a models of physical laws, as a mathematical models for continuum in Eucli
Язык оригиналаанглийский
Страницы43
СостояниеОпубликовано - 2015
Опубликовано для внешнего пользованияДа
СобытиеInternational Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015) - High Tatra Mountains, Stará Lesná, Словакия
Продолжительность: 12 июл 201516 июл 2015
http://web.tuke.sk/mmcp/mmcp2015/index.php

Конференция

КонференцияInternational Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015)
СтранаСловакия
ГородStará Lesná
Период12/07/1516/07/15
Адрес в сети Интернет

Отпечаток

fluid mechanics
tensors
geometry
programming
interpolation
central processing units
mathematical models
coding
physical properties
continuums

Цитировать

Bogdanov, A. V., & Khramushin, V. N. (2015). Tensor Arithmetic, Geometry and Mathematical Principles of Fluid Mechanics in the Implementation of Direct Computational Experiments. 43. Выдержка из International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015), Stará Lesná, Словакия.
Bogdanov, A.V. ; Khramushin, V.N. / Tensor Arithmetic, Geometry and Mathematical Principles of Fluid Mechanics in the Implementation of Direct Computational Experiments. Выдержка из International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015), Stará Lesná, Словакия.
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Bogdanov, AV & Khramushin, VN 2015, 'Tensor Arithmetic, Geometry and Mathematical Principles of Fluid Mechanics in the Implementation of Direct Computational Experiments' International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015), Stará Lesná, Словакия, 12/07/15 - 16/07/15, стр. 43.

Tensor Arithmetic, Geometry and Mathematical Principles of Fluid Mechanics in the Implementation of Direct Computational Experiments. / Bogdanov, A.V.; Khramushin, V.N.

2015. 43 Выдержка из International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015), Stará Lesná, Словакия.

Результат исследований: Материалы конференцийтезисы

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AU - Khramushin, V.N.

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N2 - Digital computing system could serve as a basis of a unified formation and specialized mathematical language to adequately describe of phenomena and processes in physical field theory. The way to renewal a computers is using a multi-processor systems with using of quite common large arrays of memory. It revives on the new technical level on the theoretical foundations for a functional programming, allowing highly arbitrary description for the physical properties of plurality elementary numerical objects, which capable to independent existence in a virtual environment with similar entities, are jointly modeling to real physical processes and realization of applied computational experiments with continuous control state of the substance and correctness of the physical laws. As a result of years research is summarize fundamental knowledge by elementary tensor notation for a numeric objects, which providing a linear space interpolation for a models of physical laws, as a mathematical models for continuum in Eucli

AB - Digital computing system could serve as a basis of a unified formation and specialized mathematical language to adequately describe of phenomena and processes in physical field theory. The way to renewal a computers is using a multi-processor systems with using of quite common large arrays of memory. It revives on the new technical level on the theoretical foundations for a functional programming, allowing highly arbitrary description for the physical properties of plurality elementary numerical objects, which capable to independent existence in a virtual environment with similar entities, are jointly modeling to real physical processes and realization of applied computational experiments with continuous control state of the substance and correctness of the physical laws. As a result of years research is summarize fundamental knowledge by elementary tensor notation for a numeric objects, which providing a linear space interpolation for a models of physical laws, as a mathematical models for continuum in Eucli

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Bogdanov AV, Khramushin VN. Tensor Arithmetic, Geometry and Mathematical Principles of Fluid Mechanics in the Implementation of Direct Computational Experiments. 2015. Выдержка из International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015), Stará Lesná, Словакия.