Books on the topic 'Noise control Mathematical models'
Create a spot-on reference in APA, MLA, Chicago, Harvard, and other styles
Consult the top 50 books for your research on the topic 'Noise control Mathematical models.'
Next to every source in the list of references, there is an 'Add to bibliography' button. Press on it, and we will generate automatically the bibliographic reference to the chosen work in the citation style you need: APA, MLA, Harvard, Chicago, Vancouver, etc.
You can also download the full text of the academic publication as pdf and read online its abstract whenever available in the metadata.
Browse books on a wide variety of disciplines and organise your bibliography correctly.
Uosukainen, Seppo. JMC method applied to active control of sound: Theoretical extensions and new source configurations. Espoo [Finland]: Technical Research Centre of Finland, 1999.
Lončarić, J. Optimization of acoustic source strenght in the problems of active noise control. Hampton, VA: Institute for Computer Applications in Science and Engineering, NASA Langley Research Center, 2002.
1962-, Wagner Claus Albrecht, Hüttl Thomas 1970-, and Sagaut Pierre 1967-, eds. Large-eddy simulation for acoustics. New York: Cambridge University Press, 2007.
Polites, Michael E. The estimation error covariance matrix for the ideal state reconstructor with measurement noise. [Washington, D.C.]: National Aeronautics and Space Administration, Scientific and Technical Information Division, 1988.
Koenig, David M. Control and analysis of noisy processes. Englewood Cliffs, N.J: Prentice Hall, 1991.
International Seminar on Modal Analysis (19th 1994 Katholieke Universiteit te Leuven). Proceedings ISMA 19, tools for noise and vibration analysis: Conference, September 12-14, 1994. Edited by Sas Paul and Katholieke Universiteit te Leuven (1970- ). Afdeling Mechanische Konstruktie en Produktie. Heverlee, Belgium: Katholieke Universiteit Leuven, Faculty of Engineering, Dept. of Mechanical Engineering, Division of Production Engineering, Machine Design & Automation, 1994.
Adeli, Hojjat. Wavelet-based vibration control of smart buildings and bridges. Boca Raton: Taylor & Francis, 2009.
Reynolds, Douglas D. Algorithms for HVAC acoustics. Atlanta, Ga: American Society of Heating, Refrigerating and Air-Conditioning Engineers, 1991.
Dunnett, S. J. The mathematics of blunt body sampling. Berlin: Springer-Verlag, 1988.
Newman, M. E. J. Avalanches, scaling, and coherent noise. Ithaca, N.Y: Cornell Theory Center, Cornell University, 1996.
Durlauf, Steven N. Measuring noise in inventory models. Cambridge, MA: National Bureau of Economic Research, 1993.
Sung, Chien. Population system control. Beijing: China Academic Publishers, 1988.
Itō, Takatoshi. Intraday yen/dollar exchange rate movements: News or noise? Cambridge, MA (1050 Massachusetts Avenue, Cambridge, Mass. 02138): National Bureau of Economic Research, 1988.
Sragovich, Vladimir Grigorʹevich. Mathematical theory of adaptive control. Singapore: World Scientific, 2006.
Seierstad, Atle. Optimal control theory with economic applications. Amsterdam: North-Holland, 1987.
Qiu, Li. Developments in control theory towards glocal control. London: Institution of Engineering and Technology, 2012.
Tapiero, Charles S. Applied stochastic models and control in management. Amsterdam: North-Holland, 1988.
Mays, Larry W. Optimal control of hydrosystems. New York: M. Dekker, 1997.
Williams, Noah. Small noise asymptotics for a stochastic growth model. Cambridge, MA: National Bureau of Economic Research, 2003.
Dow, James. Noise trading, delegated portfolio management, and economic welfare. Cambridge, MA: National Bureau of Economic Research, 1994.
Williams, Noah. Small noise asymptotics for a stochastic growth model. Cambridge, Mass: National Bureau of Economic Research, 2003.
Ramirez, W. Fred. Process control and identification. Boston: Academic Press, 1994.
Christofides, Panagiotis D. Model-Based control of particulate processes. Dordrecht: Kluwer Academic Publishers, 2002.
Bowlby, William. Predicting stop-and-go traffic noise levels. Washington, D.C: Transportation Research Board, National Research Council, 1989.
Éva, Barancsi, and Chikán Attila, eds. Inventory models. Dordrecht, The Netherlands: Kluwer Academic Publishers, 1990.
Leonov, Gennadiĭ Alekseevich. Mathematical problems of control theory: An introduction. Singapore: World Scientific, 2001.
Tisdell, C. A. Economic threshold models and weed control. [Newcastle, N.S.W.]: University of Newcastle, N.S.W., Australia, Dept. of Economics, 1985.
Roy, Priti Kumar, and Abhirup Datta. Mathematical Models for Therapeutic Approaches to Control Psoriasis. Singapore: Springer Singapore, 2019. http://dx.doi.org/10.1007/978-981-13-9020-3.
Schättler, Heinz, and Urszula Ledzewicz. Optimal Control for Mathematical Models of Cancer Therapies. New York, NY: Springer New York, 2015. http://dx.doi.org/10.1007/978-1-4939-2972-6.
Gerdts, Matthias. Optimal control of ODEs and DAEs. Berlin: De Gruyter, 2012.
Vinter, R. B. Optimal control. New York: Springer, 2010.
D, Gunzburger Max, ed. Flow control. New York: Springer-Verlag, 1995.
Robrade, Andreas Dieter. Dynamische Einprodukt-Lagerhaltungsmodelle bei periodischer Bestandsüberwachung. Heidelberg: Physica, 1991.
Fratzl, Hubert. Ein- und mehrstufige Lagerhaltung. Heidelberg: Physica, 1992.
Wee, Hui-Ming. Inventory systems modeling and research methods. Hauppauge, N.Y: Nova Science Publishers, 2010.
Weber, Thomas A. Optimal control theory with applications in economics. Cambridge, Mass: MIT Press, 2011.
Edwards, Robert Paul. Expert system control of a flotation circuit. Vancouver, BC: University of British Columbia, 1990.
Christianus Bernardus Maria Te Stroet. Calibration of stochastic groundwater flow models: Estimation of noise statistics and model parameters. [Delft: Eburon], 1995.
Schroter, V. ORNAMENT: Ontario road noise analysis method for environment and transportation : technical document. Ontario: Ontario Environment, 1989.
Suchanek, Bernhard. Sicherheitsbestände zur Einhaltung von Servicegraden. Frankfurt am Main: P. Lang, 1996.
Sarychev, Andrey. Mathematical Control Theory and Finance. Berlin, Heidelberg: Springer-Verlag Berlin Heidelberg, 2008.
(Editor), Claus Wagner, Thomas Hüttl (Editor), and Pierre Sagaut (Editor), eds. Large-Eddy Simulation for Acoustics (Cambridge Aerospace Series). Cambridge University Press, 2007.
A mathematical model for simulating noise suppression of lined ejectors. Hampton, Va: National Aeronautics and Space Administration, Langley Research Center, 1994.
Modal analysis, modeling, diagnostics, and control: Analytical and experimental : presented at the 1991 ASME design technical conferences, 13th Biennial Conference on Mechanical Vibration and Noise, September 22-25, 1991. New York, N.Y: American Society of Mechanical Engineers, 1991.
1961-, Schein David B., Gridley Doreen, Langley Research Center, and United States. National Aeronautics and Space Administration. Scientific and Technical Information Branch., eds. Analytical study of acoustic response of a semireverberant enclosure with application to active noise control. [Washington, D.C.]: National Aeronautics and Space Administration, Scientific and Technical Information Branch, 1985.
Quadratic optimization in the problems of active control of sound. Hampton, Va: ICASE, NASA Langley Research Center, 2002.
V, Tsynkov S., and Institute for Computer Applications in Science and Engineering., eds. Quadratic optimization in the problems of active control of sound. Hampton, Va: ICASE, NASA Langley Research Center, 2002.
Novikov, Dmitry A., and Alexander G. Chkhartishvili. Reflexion and Control: Mathematical Models. Taylor & Francis Group, 2014.
Novikov, Dmitry A., and Alexander G. Chkhartishvili. Reflexion and Control: Mathematical Models. Taylor & Francis Group, 2014.
Novikov, Dmitry A. Reflexion and Control: Mathematical Models. Taylor & Francis Group, 2014.