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Relational information framework, causality, unification of quantum interpretations and return to realism through non-ergodicity. [PDF]
Sci RepShor O, Benninger F, Khrennikov A.
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Physical Mathematics, 2019
Municipal property, therefore, vulnerable. Rousseau's political doctrine induces an existential passage of cats and dogs must also be said about the combination of the appropriation of artistic styles of the past Infinite Series: Rudiments (Pocket ...
C. Evans
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Municipal property, therefore, vulnerable. Rousseau's political doctrine induces an existential passage of cats and dogs must also be said about the combination of the appropriation of artistic styles of the past Infinite Series: Rudiments (Pocket ...
C. Evans
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Certain new factor theorems for infinite series and trigonometric fourier series
Quaestiones Mathematicae. Journal of the South African Mathematical Society, 2020In this paper, firstly we proved a general theorem dealing with absolute Riesz summability factors of infinite series under weaker conditions. And secondly we applied it to the trigonometric Fourier series.
H. Bor
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On absolute Riesz summability factors of infinite series and their application to Fourier series
Georgian Mathematical Journal, 2019In this paper, some known results on the absolute Riesz summability factors of infinite series and trigonometric Fourier series have been generalized for the | N ¯ , p n ; θ n | k {\lvert\bar{N},p_{n};\theta_{n}\rvert_{k}} summability method.
H. Bor
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Infinite sequences and infinite series
1977It is customary to use expressions such as $${u_1} + {u_2} + \cdots + {u_n} + \cdots ,\;and\;\sum\limits_{n = 1}^\infty {{u_n}}$$ (9.1) to represent infinite series. The u i are called the terms of the series, and the quantities $${s_n} = {u_1} + {u_2} + \cdots + {u_n},\quad n = 1,2, \ldots ,$$ are called the partial sums of the series.
Murray H. Protter, Charles B. Morrey
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1992
Abstract Infinite series were in the eighteenth century and are still today considered an essential part of the calculus. Indeed, Newton considered series inseparable from his method of £1.uxions because the only way he could handle even slightly complicated algebraic functions and the transcendental functions was to expand them into ...
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Abstract Infinite series were in the eighteenth century and are still today considered an essential part of the calculus. Indeed, Newton considered series inseparable from his method of £1.uxions because the only way he could handle even slightly complicated algebraic functions and the transcendental functions was to expand them into ...
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On infinite series concerning zeros of Bessel functions of the first kind
, 2016.A relevant result independently obtained by Rayleigh and Sneddon on an identity on series involving the zeros of Bessel functions of the first kind is derived by an alternative method based on Laplace transforms. Our method leads to a Bernstein function
A. Giusti, F. Mainardi
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Infinite series on quadratic skew harmonic numbers
RACSAM, 2023W. Chu
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Infinite series involving hyperbolic functions
, 2014In the first part of this paper, we summarize our previous results on infinite series involving the hyperbolic sine function, especially, with a focus on the hyperbolic sine analogue of Eisenstein series. Those are based on the classical results given by
Y. Komori +2 more
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