Results on fixed point theorems
J. Achari (1978)
Matematički Vesnik
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Displaying similar documents to “The high-precision summation of series whose terms are rational numbers”
Results on fixed point theorems
Rational summation of rational functions.
Matusevich, Laura Felicia (2000)
Beiträge zur Algebra und Geometrie
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Results On Non-Unique Fixed Points
J. Achari (1979)
Publications de l'Institut Mathématique
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A note on rational function of several complex variables
J. Siciak (1962)
Annales Polonici Mathematici
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Construction and features of the optimum rational function used in the ADI-method
Krystyna Ziętak (1974)
Applicationes Mathematicae
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Rational products of sines of rational angles.
Gerald Myerson (1993)
Aequationes mathematicae
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Investigation of the algorithms determining the optimum rational function of the ADI-method
Krystyna Ziętak (1974)
Applicationes Mathematicae
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Characterization of linear rational preference structures.
Jacinto González Pachón, Sixto Ríos-Insua (1992)
Extracta Mathematicae
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We consider the multiobjective decision making problem. The decision maker's (DM) impossibility to take consciously a preference or indifference attitude with regard to a pair of alternatives leads us to what we have called doubt attitude. So, the doubt may be revealed in a conscient way by the DM. However, it may appear in an inconscient way, revealing judgements about her/his attitudes which do not follow a certain logical reasoning. In this paper, doubt will be considered...
Functions without residue and a bilinear differential equation
Eduard Wirsing (1993)
Acta Arithmetica
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Rational semimodules over the max-plus semiring and geometric approach to discrete event systems
Stéphane Gaubert, Ricardo Katz (2004)
Kybernetika
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We introduce rational semimodules over semirings whose addition is idempotent, like the max-plus semiring, in order to extend the geometric approach of linear control to discrete event systems. We say that a subsemimodule of the free semimodule over a semiring is rational if it has a generating family that is a rational subset of , being thought of as a monoid under the entrywise product. We show that for various semirings of max-plus type whose elements are integers, rational...
Cauchy type functional equations related to some associative rational functions
Katarzyna Domańska (2019)
Annales Universitatis Paedagogicae Cracoviensis. Studia Mathematica
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L. Losonczi [4] determined local solutions of the generalized Cauchy equation f(F(x, y))= f(x) + f(y) on components of the denition of a given associative rational function F. The class of the associative rational function was described by A. Chéritat [1] and his work was followed by paper [3] of the author. The aim of the present paper is to describe local solutions of the equation considered for some singular associative rational functions.