Found 59 Documents (Results 1–59)

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MSC:  05C65
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MSC:  39A10

Analytic number theory and disinformation. (English. Russian original)Zbl 1357.82066

Math. Notes 100, No. 4, 568-578 (2016); translation from Mat. Zametki 100, No. 4, 553-565 (2016).
MSC:  82D05 94A17 11A25
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Global asymptotic stability of a second-order system of difference equations. (English)Zbl 1321.39015

MSC:  39A20 39A30
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Global behavior of a third-order difference equation. (English)Zbl 1268.39007

Reviewer: Fei Xue (Hartford)
MSC:  39A20 39A30 39A23
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Stability and periodic character of a third order difference equation. (English)Zbl 1235.39009

MSC:  39A30 39A22 39A23
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Stability analysis of a population model with piecewise constant arguments. (English)Zbl 1402.34076

MSC:  34K20 92D25
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On the global asymptotic behavior of a system of two nonlinear difference equations. (English)Zbl 1249.39014

MSC:  39A20 39A30

Global asymptotic stability of a system of two nonlinear difference equations. (English)Zbl 1207.39024

MSC:  39A30 39A20 39A22

On the global behavior of a high-order rational difference equation. (English)Zbl 1198.39023

MSC:  39A23 39A30 39A22
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Existence of solutions with a single semicycle for a general higher order rational difference equation. (English)Zbl 1212.39012

MSC:  39A20 39A22
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MSC:  39A23
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Global asymptotic stability of a system of difference equations. (English)Zbl 1146.39024

MSC:  39A11 39A10
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Dynamics of the difference equation $$x_{n+1}=\frac{x_n+p x_{n-k}}{x_n+q}$$. (English)Zbl 1145.39303

MSC:  39A11 39A10
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Global asymptotic stability of a second order rational difference equation. (English)Zbl 1153.39015

MSC:  39A11 39A20
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Global stability of a class of recursive sequence. (English)Zbl 1146.39025

MSC:  39A11 39A20

Linear difference equations mod 2 with applications to nonlinear difference equations. (English)Zbl 1156.39003

MSC:  39A11 39A10
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On the population model of the non-autonomous logistic equation of second order with period-two parameters. (English)Zbl 1135.92026

MSC:  92D25 92D40 39A11 39A10 47B39
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Global asymptotical stability of a second order rational difference equation. (English)Zbl 1148.39004

MSC:  39A11 39A20
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The rule of trajectory structure and global asymptotic stability for a nonlinear difference equation. (English)Zbl 1141.39007

MSC:  39A11 39A20

Dynamical properties for a fourth order rational difference equation. (English)Zbl 1129.39005

MSC:  39A11 39A20 39A05

The rule of trajectory structure and global asymptotic stability for a fourth-order rational difference equation. (English)Zbl 1127.39018

MSC:  39A11 39A20
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The rule of trajectory structure and global asymptotic stability for a nonlinear difference equation. (English)Zbl 1176.39016

MSC:  39A30 39A23 39A20
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Dynamics of a nonlinear difference equation. (English)Zbl 1145.39304

MSC:  39A11 39A20
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The characteristics of a higher-order rational difference equation. (English)Zbl 1108.39006

MSC:  39A11 39A20
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Dynamics of a $$k$$th order rational difference equation. (English)Zbl 1108.39004

MSC:  39A11 39A20
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Dynamics of a higher-order rational difference equation. (English)Zbl 1106.39005

MSC:  39A11 39A20
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On the recursive sequence $$x_{x+1}= \frac{\alpha+\beta x_{n-k+1}}{A+Bx_{n-k+1}+Cx_{n-2k+1}}$$. (English)Zbl 1106.39004

MSC:  39A11 39A20
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Dynamics of a non-linear difference equation. (English)Zbl 1106.39011

MSC:  39A11 39A20
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Oscillation and asymptotic behavior of a class of higher order nonlinear recursive sequences. (English)Zbl 1106.39007

MSC:  39A11 39A20
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Global stability of a higher order rational recursive sequence. (English)Zbl 1105.39004

MSC:  39A11 39A20
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The study of a class of rational difference equations. (English)Zbl 1105.39012

MSC:  39A11 39A20
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The oscillatory character of the recursive sequence $$x_{n+1}= \frac {\alpha+\beta x_{n-k+1}}{A+Bx_{n-2k+1}}$$. (English)Zbl 1094.39006

MSC:  39A11 39A20
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Global behavior for a fourth-order rational difference equation. (English)Zbl 1083.39007

MSC:  39A11 39A20
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The qualitative behavior of solutions of a nonlinear difference equation. (English)Zbl 1128.39005

MSC:  39A11 39A20 65Q05
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Qualitative properties for a fourth-order rational difference equation. (English)Zbl 1082.39004

MSC:  39A11 39A20
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The rule of semicycle and global asymptotic stability for a fourth-order rational difference equation. (English)Zbl 1082.39005

Reviewer: Eduardo Liz (Vigo)
MSC:  39A11 39A20
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Global asymptotic stability of a nonlinear recursive sequence. (English)Zbl 1068.39014

MSC:  39A11 39A20
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Global attractivity in a recursive sequence. (English)Zbl 1063.39011

MSC:  39A11 39A12 39A20
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Global asymptotic stability for two recursive difference equations. (English)Zbl 1044.39006

MSC:  39A11 39A20
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On the recursive sequence $$x_{n+1} = \frac{\alpha+\beta x_{n}+\gamma x_{n-1}} {Bx_{n}+Cx_{n-1}}$$. (English)Zbl 1041.39001

MSC:  39A11 39A20
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Global asymptotic stability in a rational equation. (English)Zbl 1055.39014

MSC:  39A11 39A20
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Global stability of $$y_{n+1}=A+\frac{y_n}{y_{n-k}}$$. (English)Zbl 1049.39002

Reviewer: Fozi Dannan (Doha)
MSC:  39A11 39A20
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Global attractivity in a delay difference equation. (English)Zbl 1047.39015

Reviewer: Fozi Dannan (Doha)
MSC:  39A12 39A20 37B25

MSC:  39A11
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Sufficient conditions for permanence and global attractivity of the difference equations $$X_{n+1}=X_n^p f(X_n,X_{n-k_1},\dots ,X_{n-k_r})$$. (English)Zbl 1045.39004

MSC:  39A11 39A10 34C07

On the recursive sequence $$x_{n+1}=\frac{\alpha+\beta x_{n-1}}{1+g(x_n)}$$. (English)Zbl 1019.39011

MSC:  39A11 39B05

Global asymptotic stability for a nonlinear delay difference equation. (English)Zbl 1013.39003

Reviewer: Pavel Rehak (Brno)
MSC:  39A11
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MSC:  39A10

Properties of a certain Lyness equation. (English)Zbl 0896.39003

MSC:  39A12 39A10
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A condition for a normal semicycle to separate an orientable 3-graph. (English)Zbl 0913.05065

Bridges, D. S. (ed.) et al., Combinatorics, complexity, and logic. Proceedings of the 1st international conference on discrete mathematics and theoretical computer science, DMTCS ’96, Auckland, New Zealand, December 9–13, 1996. Berlin: Springer. 330-337 (1997).
MSC:  05C38

A duality for permutations. (English)Zbl 0663.05024

Reviewer: M.Skoviera
MSC:  05C10
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On functions which sum to zero on semicycles. (English)Zbl 0719.05044

MSC:  05C38 05C20

The existence of certain types of semiwalks in tournaments. (English)Zbl 0456.05030

Combinatorics, graph theory and computing, Proc. 11th southeast. Conf., Boca Raton/Florida 1980, Vol. II, Congr. Numerantium 29, 901-908 (1980).
MSC:  05C20

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