Abstract
In several sciences, e.g. in physics, chemistry, biology, and medicine, often decay processes have to be analyzed.
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References
D. Braess, Über Approximation mit EXponentialsummen. Computing 2, 309–321 (1967)
D. Braess, , Chebyshev approximation by y-polynomials, III: On the number of local solutions (submitted)
D. Braess,, Zur numerischen Stabilitat des Newton-Verfahrens bei der nichtlinearen Tschebyscheff-Approximation. Proceedings of the “Kolloquium iiber Approximationstheory”, Bonn, Juni 1976
D.W. Kammler, Existence of best approximations by sums of exponentials. J.Approximation Theory 9, 173–191 (1973)
C. Lanczos, Applied Analysis. Prentice Hall, Englewood Cliffs 1956.
E. Schmidt, Zur Kompaktheit bei Exponentialsummen. J.Approximation Theory 3, 445–454 (197o)
J.M. Wolfe, On the unicity of nonlinear approximation in smooth spaces. J.Approximation Theory 12, 165–181 (1974)
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© 1977 Springer Science+Business Media New York
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Braess, D. (1977). Analysis of Decay Processes and Approximation by Exponentials. In: Micchelli, C.A., Rivlin, T.J. (eds) Optimal Estimation in Approximation Theory. The IBM Research Symposia Series. Springer, Boston, MA. https://doi.org/10.1007/978-1-4684-2388-4_13
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DOI: https://doi.org/10.1007/978-1-4684-2388-4_13
Publisher Name: Springer, Boston, MA
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