Книги з теми "Statistical approach to fluid mechanics"
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Monin, A. S. Statistical fluid mechanics: Mechanics of turbulence. Mineola, N.Y: Dover Publications, 2007.
Barenblatt, G. I. 'Scaling phenomena in fluid mechanics'. Cambridge: Cambridge University Press, 1994.
Bashkirov, Andrei G. Nonequilibrium statistical mechanics of heterogeneous fluid systems. Boca Raton, FL: CRC Press, 1995.
G, Sinaĭskiĭ Ė. Statistical microhydrodynamics. Weinheim: Wiley-VCH, 2008.
Tardu, Sedat. Statistical approach in wall turbulence. London: ISTE, 2011.
Marquand, C. Thermofluids: An integrated approach to thermodynamics and fluid mechanics. Chichester: J. Wiley, 1994.
Center, Ames Research, ed. A theoretical approach for analyzing the restabilization of wakes. Moffett Field, Calif: National Aeronautics and Space Administration, Ames Research Center, 1992.
Center, Ames Research, ed. A theoretical approach for analyzing the restabilization of wakes. Moffett Field, Calif: National Aeronautics and Space Administration, Ames Research Center, 1992.
Hardy, Robert J. Thermodynamics and statistical mechanics: An integrated approach. Chichester, West Sussex: John Wiley & Sons Inc., 2014.
Turns, Stephen R. Thermal-fluid sciences: An integrated approach. Cambridge [England]: Cambridge University Press, 2005.
Iro, Harald. A modern approach to classical mechanics. Singapore: World Scientific, 2002.
Li, Chjan C. Vortex dynamics, statistical mechanics, and planetary atmospheres. Hackensack, N.J: World Scientific, 2009.
Rodríguez, Antonio E. Teoría estadística de fluidos simples en equilibrio. Washington, D.C: Secretaría General de la Organización de los Estados Americanos, Programa Regional de Desarrollo Científico y Tecnológico, 1987.
Ehrenfest, Paul. The conceptual foundations of the statistical approach in mechanics. New York: Dover Publications, 1990.
Tu, Jiyuan. Computational fluid dynamics: A practical approach. Amsterdam: Butterworth-Heinemann, 2008.
S, Sarkar, Gatski T. B, and Langley Research Center, eds. Modeling the pressure-strain correlation of turbulence: An invariant dynamical systems approach. Hampton, Va: National Aeronautics and Space Administration, Langley Research Center, 1990.
S, Sarkar, Gatski T. B, and Langley Research Center, eds. Modeling the pressure-strain correlation of turbulence: An invariant dynamical systems approach. Hampton, Va: National Aeronautics and Space Administration, Langley Research Center, 1990.
N, Tiwari S., and United States. National Aeronautics and Space Administration., eds. A conservative approach for flow field calculations on multiple grids: Progress report for the period ended March 31, 1988. Norfolk, Va: Old Dominion University Research Foundation, 1988.
Barenblatt, G. I. Scaling phenomena in fluid mechanics: An inaugural lecture delivered before the University of Cambridge on 3 May 1993. Cambridge: Cambridge University Press, 1994.
Japan) RIMS Camp-style Seminar "Modern approach and developments to Onsager's theory on statistical vortices" (2011 August 28-31 Kyoto. Modern approach and developments to Onsager's theory on statistical vortices: August 28-31, 2011. Kyoto, Japan: Kyōto Daigaku Sūri Kaiseki Kenkyūjo, 2012.
Kim, Y. S. Phase space picture of quantum mechanics: Group theoretical approach. Singapore: World Scientific, 1991.
Albeverio, Sergio. The statistical mechanics of quantum lattice systems: A path integral approach. Zurich: European Mathematical Society, 2009.
Albeverio, Sergio. The statistical mechanics of quantum lattice systems: A path integral approach. Zurich: European Mathematical Society, 2009.
Llor, Antoine. Statistical Hydrodynamic Models for Developed Mixing Instability Flows: Analytical "0D" Evaluation Criteria, and Comparison of Single-and Two-Phase Flow Approaches. Springer, 2014.
Llor, Antoine. Statistical Hydrodynamic Models for Developed Mixing Instability Flows: Analytical "0D" Evaluation Criteria, and Comparison of Single-and Two-Phase Flow Approaches (Lecture Notes in Physics). Springer, 2006.
Yaglom, A. M., and A. S. Monin. Statistical Fluid Mechanics: Mechanics of Turbulence, Volume I. Dover Publications, 2007.
Yaglom, A. M., and A. S. Monin. Statistical Fluid Mechanics, Volume I: Mechanics of Turbulence. Dover Publications, Incorporated, 2013.
Yaglom, A. M., and A. S. Monin. Statistical Fluid Mechanics, Volume II: Mechanics of Turbulence. Dover Publications, Incorporated, 2013.
Sultanian, Bijay. Fluid Mechanics: An Intermediate Approach. Taylor & Francis Group, 2015.
Sultanian, Bijay. Fluid Mechanics: An Intermediate Approach. Taylor & Francis Group, 2015.
Sultanian, Bijay. Fluid Mechanics: An Intermediate Approach. Taylor & Francis Group, 2015.
Sultanian, Bijay. Fluid Mechanics: An Intermediate Approach. Taylor & Francis Group, 2015.
Uddin, Naseem. Fluid Mechanics: A Problem-Solving Approach. CRC Press LLC, 2022.
Uddin, Naseem. Fluid Mechanics: A Problem-Solving Approach. Taylor & Francis Group, 2022.
Uddin, Naseem. Fluid Mechanics: A Problem-Solving Approach. Taylor & Francis Group, 2022.
Uddin, Naseem. Fluid Mechanics: A Problem-Solving Approach. Taylor & Francis Group, 2022.
Uddin, Naseem. Fluid Mechanics: A Problem-Solving Approach. CRC Press LLC, 2022.
Bashkirov, Andrei G. Nonequilibrium Statistical Mechanics of Heterogeneous Fluid Systems. Taylor & Francis Group, 2020.
L, Dryden Hugh, Theodore Von Karman, and Kalinske Anton Adam. Fluid Mechanics and Statistical Methods in Engineering. University of Pennsylvania Press, 2016.
Bashkirov, Andrei G. Nonequilibrium Statistical Mechanics of Heterogeneous Fluid Systems. Taylor & Francis Group, 2020.
Bashkirov, Andrei G. Nonequilibrium Statistical Mechanics of Heterogeneous Fluid Systems. Taylor & Francis Group, 2020.
Bashkirov, Andrei G. Nonequilibrium Statistical Mechanics of Heterogeneous Fluid Systems. Taylor & Francis Group, 2020.
Sinaiski, Emmanuil G., and Leonid I. Zaichik. Statistical Microhydrodynamics. Wiley & Sons, Limited, John, 2008.
Sinaiski, Emmanuil G., and Leonid I. Zaichik. Statistical Microhydrodynamics. Wiley & Sons, Incorporated, John, 2008.
Sinaiski, Emmanuil G., and Leonid Zaichik. Statistical Microhydrodynamics. Wiley-VCH, 2008.
Ajaev, Vladimir S. Interfacial Fluid Mechanics: A Mathematical Modeling Approach. Springer, 2012.
Interfacial Fluid Mechanics A Mathematical Modeling Approach. Springer, 2012.
Ajaev, Vladimir S. Interfacial Fluid Mechanics: A Mathematical Modeling Approach. Springer, 2014.
Ajaev, Vladimir S. Interfacial Fluid Mechanics: A Mathematical Modeling Approach. Springer, 2012.
Tardu, Sedat. Statistical Approach to Wall Turbulence. Wiley & Sons, Incorporated, John, 2013.