Standard

Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics. / Degtyarev, A.B.; Khramushin, V.N.

в: EPJ Web of Conferences, Том 108, 02018, 2015.

Результаты исследований: Научные публикации в периодических изданияхстатья в журнале по материалам конференции

Harvard

Degtyarev, AB & Khramushin, VN 2015, 'Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics', EPJ Web of Conferences, Том. 108, 02018. https://doi.org/10.1051/epjconf/201610802018

APA

Degtyarev, A. B., & Khramushin, V. N. (2015). Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics. EPJ Web of Conferences, 108, [02018]. https://doi.org/10.1051/epjconf/201610802018

Vancouver

Degtyarev AB, Khramushin VN. Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics. EPJ Web of Conferences. 2015;108. 02018. https://doi.org/10.1051/epjconf/201610802018

Author

Degtyarev, A.B. ; Khramushin, V.N. / Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics. в: EPJ Web of Conferences. 2015 ; Том 108.

BibTeX

@article{964d9570d2b94c3c8b2f3392e2a08fa6,
title = "Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics",
abstract = "Adaptive computational experiments under control states for all numeric objects and operations, set functional or contextual requirements for specialized programming in the continuous-corpuscular physical environments: 1) elementary space-temporal numerical objects and physical phenomena are written in tensor notation with values in physical dimensional form, that allows a visual control and using a hybrid circuits with engineering empiricists and math asymptotes; 2) computing operations defined in the global coordinates system, and associated by inverse approximation in local bases, geometrically related to numeric objects – large particle – finite volume of fluid. Object-oriented application will associate all numerical objects to logic-arithmetic operations: 1) the logical or empirical algorithms is formalize the laws of applied fluid mechanics; 2) the addition is applied to numerical objects in the same geometric basis of strict compliance with the physical dimensions (n.1); 3) the multiply is perfor",
author = "A.B. Degtyarev and V.N. Khramushin",
year = "2015",
doi = "https://doi.org/10.1051/epjconf/201610802018",
language = "English",
volume = "108",
journal = "EPJ Web of Conferences",
issn = "2100-014X",
publisher = "EDP Sciences",
note = "International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015) ; Conference date: 12-07-2015 Through 16-07-2015",
url = "http://web.tuke.sk/mmcp/mmcp2015/index.php",

}

RIS

TY - JOUR

T1 - Coordinate Systems, Numerical Objects and Algorithmic Operations of Computational Experiments in Fluid Mechanics

AU - Degtyarev, A.B.

AU - Khramushin, V.N.

PY - 2015

Y1 - 2015

N2 - Adaptive computational experiments under control states for all numeric objects and operations, set functional or contextual requirements for specialized programming in the continuous-corpuscular physical environments: 1) elementary space-temporal numerical objects and physical phenomena are written in tensor notation with values in physical dimensional form, that allows a visual control and using a hybrid circuits with engineering empiricists and math asymptotes; 2) computing operations defined in the global coordinates system, and associated by inverse approximation in local bases, geometrically related to numeric objects – large particle – finite volume of fluid. Object-oriented application will associate all numerical objects to logic-arithmetic operations: 1) the logical or empirical algorithms is formalize the laws of applied fluid mechanics; 2) the addition is applied to numerical objects in the same geometric basis of strict compliance with the physical dimensions (n.1); 3) the multiply is perfor

AB - Adaptive computational experiments under control states for all numeric objects and operations, set functional or contextual requirements for specialized programming in the continuous-corpuscular physical environments: 1) elementary space-temporal numerical objects and physical phenomena are written in tensor notation with values in physical dimensional form, that allows a visual control and using a hybrid circuits with engineering empiricists and math asymptotes; 2) computing operations defined in the global coordinates system, and associated by inverse approximation in local bases, geometrically related to numeric objects – large particle – finite volume of fluid. Object-oriented application will associate all numerical objects to logic-arithmetic operations: 1) the logical or empirical algorithms is formalize the laws of applied fluid mechanics; 2) the addition is applied to numerical objects in the same geometric basis of strict compliance with the physical dimensions (n.1); 3) the multiply is perfor

U2 - https://doi.org/10.1051/epjconf/201610802018

DO - https://doi.org/10.1051/epjconf/201610802018

M3 - Conference article

VL - 108

JO - EPJ Web of Conferences

JF - EPJ Web of Conferences

SN - 2100-014X

M1 - 02018

T2 - International Conference on Mathematical Modeling and Computational Physiscs (MMCP-2015)

Y2 - 12 July 2015 through 16 July 2015

ER -

ID: 106842065