Books on the topic 'Approximation of convex function'

Duality in nonconvex approximation and optimization. New York: Springer, 2005.

L, Combettes Patrick, and SpringerLink (Online service), eds. Convex Analysis and Monotone Operator Theory in Hilbert Spaces. New York, NY: Springer Science+Business Media, LLC, 2011.

Vasile, Postolică, ed. The best approximation and optimization in locally convex spaces. Frankfurt am Main: P. Lang, 1993.

Kuhn, Daniel. Generalized bounds for convex multistage stochastic programs. Berlin: Springer, 2005.

Geometric approximation algorithms. Providence, R.I: American Mathematical Society, 2011.

Nikolʹskiĭ, S. M. Izbrannye trudy: V trekh tomakh. Moskva: Nauka, 2006.

Domich, P. D. A near-optimal starting solution for polynomial approximation of a continuous function in the L. [Washington, D.C.]: U.S. Dept. of Commerce, National Bureau of Standards, 1986.

Domich, P. D. A near-optimal starting solution for polynomial approximation of a continuous function in the L. [Washington, D.C.]: U.S. Dept. of Commerce, National Bureau of Standards, 1986.

Hedberg, Lars Inge. An axiomatic approach to function spaces, spectral synthesis, and Luzin approximation. Providence, RI: American Mathematical Society, 2007.

Domich, P. D. A near-optimal starting solution for polynomial approximation of a continuous function in the Lb1s norm. [Washington, D.C.]: U.S. Dept. of Commerce, National Bureau of Standards, 1986.

Scattering resonances for several small convex bodies and the Lax-Phillips conjecture. Providence, R.I: American Mathematical Society, 2009.

Domich, P. D. A near-optimal starting solution for polynomial approximation of a continuous function in the Lb1s norm. [Washington, D.C.]: U.S. Dept. of Commerce, National Bureau of Standards, 1986.

Oswald, Peter. Multilevel finite element approximation: Theory and applications. Stuttgart: Teubner, 1994.

Foundations of complex analysis in non locally convex spaces: Function theory without convexity condition. Amsterdam: Elsevier, 2003.

Ghatak, A. K. Modified Airy function and WKB solutions to the wave equation. [Gaithersburg, Md.]: National Institute of Standards and Technology, 1991.

International Conference and Workshop Function Spaces, Approximation Theory, Nonlinear Analysis (2005 Moscow, Russia). Mezhdunarodnai︠a︡ konferent︠s︡ii︠a︡ Funkt︠s︡ionalʹnye prostranstva, teorii︠a︡ priblizheniĭ, nelineĭnyĭ analiz, Moskva, 23-29 mai︠a︡ 2005 g., posvi︠a︡shchennai︠a︡ stoletii︠u︡ Sergei︠a︡ Mikhaĭlovicha Nikolʹskogo (rodilsi︠a︡ 30. IV.1905), tezisy dokladov: International Conference and Workshop Function Spaces, Approximation Theory, Nonlinear Analysis, Moscow, Russia, May 23-29, 2005, dedicated to the centennial of Sergei Mikhailovich Nikolskii (born 30. IV.1905), abstracts. Moskva: Matematicheskiĭ in-t im. V.A. Steklova RAN (MIAN), 2005.

Institut matematiki im. S.L. Soboleva. Different︠s︡ialʹnye uravnenii︠a︡, funkt︠s︡ionalʹnye prostranstva, teorii︠a︡ priblizheniĭ: Mezhdunarodnai︠a︡ konferent︠s︡ii︠a︡, posvi︠a︡shchennai︠a︡ 100-letii︠u︡ so dni︠a︡ rozhdenii︠a︡ Sergei︠a︡ Lʹvovicha Soboleva, Novosibirsk, Rossii︠a︡, 5-12 okti︠a︡bri︠a︡ 2008 g. : tezisy dokladov. Novosibirsk: In-t matematiki SO RAN, 2008.

Biström, Peter. The homomorphisms on algebras of real valued functions defined on locally convex spaces and bounding sets. Åbo: Åbo Akademi Uiversity Press, 1993.

International Conference "Function spaces, approximation theory, and nonlinear analysis" (2005). Funkt︠s︡ionalʹnye prostranstva teorii︠a︡ priblizheniĭ nelineĭnyĭ analiz: Sbornik stateĭ. Moskva: Nauka, 2006.

Drigojias, Ioannis. Approximationseigenschaft und Dualität von gewichteten H⁽p̳⁾- Räumen. [Münster]: Drucktechnische Zentralstelle der Universität Münster, 1993.

Hallerbach, Winfried G. A simple approximation to the normal distribution function with an application to the Black & Scholes option pricing model. Rotterdam, Netherlands: Rotterdam Institute for Business Economic Studies, Erasmus Universiteit, 1994.

Gottlieb, David. On the Gibbs phenomenon V: Recovering exponential accuracy from collocation point values of a piecewise analyytic function. Hampton, Va: Institute for Computer Applications in Science and Engineering, NASA Langley Research Center, 1994.

Funaro, Daniele. Convergence results for pseudospectral approximations of hyperbolic systems by a penalty type boundary treatment. Hampton, Va: National Aeronautics and Space Administration, Langley Research Center, 1989.

Funaro, Daniele. Convergence results for pseudospectral approximations of hyperbolic systems by a penalty type boundary treatment. Hampton, Va: National Aeronautics and Space Administration, Langley Research Center, 1989.

1941-, Hag Kari, and Broch Ole Jacob, eds. The ubiquitous quasidisk. Providence, Rhode Island: American Mathematical Society, 2012.

Real analysis. Providence, Rhode Island: American Mathematical Society, 2015.

Saff, E. B., Douglas Patten Hardin, Brian Z. Simanek, and D. S. Lubinsky. Modern trends in constructive function theory: Conference in honor of Ed Saff's 70th birthday : constructive functions 2014, May 26-30, 2014, Vanderbilt University, Nashville, Tennessee. Providence, Rhode Island: American Mathematical Society, 2016.

S, Lokanathan, ed. Quantum mechanics: Theory and applications. Dordrecht: Kluwer Academic Pulbishers, 2004.

Ghatak, A. K. Quantum mechanics: Theory and applications. Dordrecht: Kluwer Academic Publishers, 2004.

1968-, Arvesú Jorge, and Lopez Lagomasino Guillermo 1948-, eds. Recent advances in orthogonal polynomials, special functions, and their applications: 11th International Symposium on Orthogonal Polynomials, Special Functions, and Their Applications, August 29-September 2, 2011, Universidad Carlos III de Madrid, Leganes, Spain. Providence, R.I: American Mathematical Society, 2012.

Singer, Ivan. Duality for Nonconvex Approximation and Optimization (CMS Books in Mathematics). Springer, 2006.

Bauschke, Heinz H., and Patrick L. Combettes. Convex Analysis and Monotone Operator Theory in Hilbert Spaces. Springer, 2013.

Bauschke, Heinz H., and Patrick L. Combettes. Convex Analysis and Monotone Operator Theory in Hilbert Spaces. Springer, 2018.

Bauschke, Heinz H., and Patrick L. Combettes. Convex Analysis and Monotone Operator Theory in Hilbert Spaces. Springer, 2011.

Bauschke, Heinz H., and Patrick L. Combettes. Convex Analysis and Monotone Operator Theory in Hilbert Spaces. Springer, 2017.

Yilmaz, Fatih, María Jesús Santos Sánchez, Araceli Queiruga-Dios, Jesús Martín-Vaquero, and Melek Sofyalioğlu, eds. International Conference on Mathematics and its Applications in Science and Engineering (ICMASE 2020). Ediciones Universidad de Salamanca, 2020. http://dx.doi.org/10.14201/0aq0302.

Goebel, Kazimierz, and Stanislaw Prus. Elements of Geometry of Balls in Banach Spaces. Oxford University Press, 2018. http://dx.doi.org/10.1093/oso/9780198827351.001.0001.

1934-, Ciesielski Zbigniew, ed. Approximation and function spaces. Warszawa: PWN-Polish Scientific Publishers, 1989.

Function Approximation And Classification. Springer, 2009.

Natanson. Constructive Function Theory (Uniform Approximation). Ungar Pub Co, 1985.

Natanson. Constructive Function Theory (Approximation in Mean). Ungar Pub Co, 1985.

Approximation of Set-Valued Functions: Adaptation of Classical Approximation Operators. Imperial College Press, 2014.

Gamkrelidze, R. V. Analysis II: Convex Analysis and Approximation Theory (Encyclopaedia of Mathematical Sciences). Springer, 1990.

Tikhomirov, Vladimir M. Analysis II: Convex Analysis and Approximation Theory (Encyclopaedia of Mathematical Sciences). Springer, 1990.

Function spaces, approximation theory, and nonlinear analysis: Collected papers. Moscow: MAIK Nauka/Interperiodica, 2006.

Hami, Abdelkhalak El, and Bouchaib Radi. Advanced Numerical Methods with Matlab 1: Function Approximation and System Resolution. Wiley & Sons, Incorporated, John, 2018.

Hami, Abdelkhalak El, and Bouchaib Radi. Advanced Numerical Methods with Matlab 1: Function Approximation and System Resolution. Wiley & Sons, Incorporated, John, 2018.

M, Adams William, and United States. National Aeronautics and Space Administration. Scientific and Technical Information Division., eds. Nonlinear programming extensions to rational function approximation methods for unsteady aerodynamic forces. [Washington, DC]: National Aeronautics and Space Administration, Scientific and Technical Information Division, 1988.

Foundations of Complex Analysis in Non Locally Convex Spaces - Function Theory Without Convexity Condition. Elsevier, 2003. http://dx.doi.org/10.1016/s0304-0208(03)x8017-2.

Waldschmidt, Michel. Diophantine Approximation on Linear Algebraic Groups: Transcendence Properties of the Exponential Function in Several Variables. Springer, 2000.