Handbook of numerical analysis - Foundations of by F. Cucker; P. G. Ciarlet; J.L. Lions;

By F. Cucker; P. G. Ciarlet; J.L. Lions;

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Gröbner Bases and Applications. In: London Math. Soc. Lecture Note Ser. 251 (Cambridge University Press, Cambridge). , I SERLES , A. (1999). Geometric integration: Numerical solution of differential equations on manifolds. Philos. Trans. Royal Soc. A 357, 945–956. , P IGGOTT, M. (2003). Geometric integration and its applications. , Cucker, F. ), Foundations of Computational Mathematics. In: Handbook of Numerical Analysis 11 (NorthHolland, Amsterdam), pp. 35–139. B UHMANN , M. (2000). Radial basis functions.

2003). Geometric integration and its applications. , Cucker, F. ), Foundations of Computational Mathematics. In: Handbook of Numerical Analysis 11 (NorthHolland, Amsterdam), pp. 35–139. B UHMANN , M. (2000). Radial basis functions. Acta Numerica 9, 1–38. B UTCHER , J. (1972). An algebraic theory of integration methods. Math. Comp. 26, 79–106. , S HAPIRO , V. (2000). A multivector data structure for differential forms and equations. Math. Comput. Simulation 54, 33–64. , Y E , Y. (2003). Linear programming and condition numbers under the real number computation model.

Complexity and Real Computation (Springer, New York). B ROUDER , C. (1999). Runge–Kutta methods and renormalization. Eur. Phys. J. 12, 521–534. B UCHBERGER , B. (1970). Ein algorithmisches Kriterium für die Lösbarkeit eines algebraischen Gleichungssystems. Aequationes Math. 4, 374–383. , W INKLER , F. ) (1998). Gröbner Bases and Applications. In: London Math. Soc. Lecture Note Ser. 251 (Cambridge University Press, Cambridge). , I SERLES , A. (1999). Geometric integration: Numerical solution of differential equations on manifolds.

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