M. A. Mamedov scite author profile

In this paper we develop the method suggested by S. Pehlivan and M. A. Ž . Mamedov ''Statistical Cluster Points and Turnpike,'' submitted , where it was proved that under some conditions optimal paths have the same unique stationary limit point᎐stationary cluster point. This notion was introduced by J. A. Fridy Ž . 1993, Proc. Amer. Math. Soc. 118, 1187᎐1192 and it turns out to be a very useful and interesting tool in turnpike theory. The purpose of this paper is to avoid the convexity conditions. Here the turnpike theorem is proved under conditions that are quite different from those of Pehlivan and Mamedov and may be satisfied for the mappings with nonconvex images and for nonconcave functions in the definition of functionals.

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Statistical Cluster Points of Sequences in Finite Dimensional Spaces

Pehli̇van¹,

Güncan²,

Mamedov³

2004

Czechoslovak Mathematical Journal

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A turnpike theorem for continuous‐time control systems when the optimal stationary point is not unique

Mamedov

2003

Abstract and Applied Analysis

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Asymptotical stability of optimal paths in nonconvex problems

Mamedov

2009

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M. A. Mamedov

Statistical cluster points and turnpike^*

Statistical Cluster Points and Turnpike Theorem in Nonconvex Problems

Statistical Cluster Points of Sequences in Finite Dimensional Spaces

A turnpike theorem for continuous‐time control systems when the optimal stationary point is not unique

Asymptotical stability of optimal paths in nonconvex problems

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M. A. Mamedov

Statistical cluster points and turnpike*

Statistical Cluster Points and Turnpike Theorem in Nonconvex Problems

Statistical Cluster Points of Sequences in Finite Dimensional Spaces

A turnpike theorem for continuous‐time control systems when the optimal stationary point is not unique

Asymptotical stability of optimal paths in nonconvex problems

Contact Info

Product

Resources

About

Statistical cluster points and turnpike^*