The analytic expression of the special points on the intersection of two cones with their axes intersecting(ITCTAI) is given. It also presents a method to construct the special points graphically according to the anal...The analytic expression of the special points on the intersection of two cones with their axes intersecting(ITCTAI) is given. It also presents a method to construct the special points graphically according to the analytic expression of them. Finally, with computer programming language, it gives a program to generate the intersection in several different cases.展开更多
Let G be a graph and f : G → G be a continuous map. Denote by P(f), R(f), SA(f) and UF(f) the sets of periodic points, recurrent points, special α-limit points and unilateral γ-limit points of f, respectiv...Let G be a graph and f : G → G be a continuous map. Denote by P(f), R(f), SA(f) and UF(f) the sets of periodic points, recurrent points, special α-limit points and unilateral γ-limit points of f, respectively. In this paper, we show that R(f) SA(f) = UP(f) ∪ P(f) R(f).展开更多
文摘The analytic expression of the special points on the intersection of two cones with their axes intersecting(ITCTAI) is given. It also presents a method to construct the special points graphically according to the analytic expression of them. Finally, with computer programming language, it gives a program to generate the intersection in several different cases.
基金supported by National Natural Science Foundation of China (Grant No.10861002)Natural Science Foundation of Guangxi Province (Grnat Nos. 2010GXNSFA013106,2011GXNSFA018135)SF of Education Department of Guangxi Province (Grant No. 200911MS212)
文摘Let G be a graph and f : G → G be a continuous map. Denote by P(f), R(f), SA(f) and UF(f) the sets of periodic points, recurrent points, special α-limit points and unilateral γ-limit points of f, respectively. In this paper, we show that R(f) SA(f) = UP(f) ∪ P(f) R(f).
