Galilean geometry of motions.

Nadjafikhah, Mehdi; Forough, Ahmad-Reza

Displaying similar documents to “Galilean geometry of motions.”

Difference and Difference Quotient. Part II

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In this article, we give some important properties of forward difference, backward difference, central difference and difference quotient and forward difference, backward difference, central difference and difference quotient formulas of some special functions [11].MML identifier: DIFF 2, version: 7.8.09 4.97.1001

Difference and Difference Quotient. Part III

Xiquan Liang, Ling Tang (2010)

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In this article, we give some important theorems of forward difference, backward difference, central difference and difference quotient and forward difference, backward difference, central difference and difference quotient formulas of some special functions.

On computing the derivative of a function

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Chaos in some planar nonautonomous polynomial differential equation

Klaudiusz Wójcik (2000)

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We show that under some assumptions on the function f the system $ż = z ̅ (f (z) e^{i ϕ t} + e^{i 2 ϕ t})$ generates chaotic dynamics for sufficiently small parameter ϕ. We use the topological method based on the Lefschetz fixed point theorem and the Ważewski retract theorem.

Alternate derivations of the stability region of a difference equation with two delays.

Cheng, Sui Sun, Huang, Shao Yuan (2009)

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Đurđica Takači, Dragoslav Herceg, Radivoje Stojković (2005)

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Vertical blow ups of capillary surfaces in $ℝ^{3}$ . II: Nonconvex corners.

Jeffres, Thalia, Lancaster, Kirk (2008)

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Some commutative neutrix convolution products of functions.

Fisher, Brian, Kiliçman, Adem (1995)

Commentationes Mathematicae Universitatis Carolinae

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Some commutative neutrix convolution products of functions

Brian Fisher, Adem Kiliçman (1995)

Commentationes Mathematicae Universitatis Carolinae

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The commutative neutrix convolution product of the locally summable functions ${cos}_{-} (λ x)$ and ${cos}_{+} (μ x)$ is evaluated. Further similar commutative neutrix convolution products are evaluated and deduced.

A `user-friendly' approach to the dynamical equations of non-holonomic systems.

Benenti, Sergio (2007)

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Difference and Difference Quotient. Part IV

Xiquan Liang, Ling Tang, Xichun Jiang (2011)

Formalized Mathematics

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Several Higher Differentiation Formulas of Special Functions

Junjie Zhao, Xiquan Liang, Li Yan (2008)

Formalized Mathematics

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In this paper, we proved some basic properties of higher differentiation, and higher differentiation formulas of special functions [4].MML identifier: HFDIFF 1, version: 7.8.10 4.100.1011