Chunyan Tao scite author profile

We study the following max-type difference equation x n = max⁡{A n/x n−r, x n−k}, n = 1,2,…, where {A n}n=1 +∞ is a periodic sequence with period p and k, r ∈ {1,2,…} with gcd(k, r) = 1 and k ≠ r, and the initial conditions x 1−d, x 2−d,…, x 0 are real numbers with d = max⁡{r, k}. We show that if p = 1 (or p ≥ 2 and k is odd), then every well-defined solution of this equation is eventually periodic with period k, which generalizes the results of (Elsayed and Stevic´ (2009), Iričanin and Elsayed (2010), Qin et al. (2012), and Xiao and Shi (2013)) to the general case. Besides, we construct an example with p ≥ 2 and k being even which has a well-defined solution that is not eventually periodic.

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A Combinational Underwater Aided Navigation Algorithm Based on TERCOM/ICCP and Kalman Filter

Yuan

Zhang

Yuan

et al. 2011

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In order to solve the problem that the iterated closest contour point(ICCP) algorithm diverges easily when the initial INS error is large, the terrain contour matching (TERCOM) algorithm is firstly used to reduce the initial INS error, then ICCP algorithm is used to obtain the best matching position. Two matching difference is used as the measurement of Kalman filter, INS error is corrected and the optimal estimate is obtained. The correlative analysis MSD is only introduced in the coarse matching stage, and the sliding window is used in the precise matching stage to improve the algorithm efficiency. Simulations are performed and the results show that the proposed combinational algorithm matching process is more stable and the precision is higher than traditional algorithm.

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Non-wandering Sets for Dendrite Maps

Sun

Liu

Tao

et al. 2014

Qual. Theory Dyn. Syst.

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Chunyan Tao

Large deviation principle for a class of SPDE with locally monotone coefficients

Periodicity of the Positive Solutions of a Fuzzy Max-Difference Equation

Eventually Periodic Solutions of a Max-Type Difference Equation

A Combinational Underwater Aided Navigation Algorithm Based on TERCOM/ICCP and Kalman Filter

Non-wandering Sets for Dendrite Maps

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