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Some results on the upper convex densities for the self-similar sets |
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| Authors: | Shaoyuan Xu Zuoling Zhou |
| Institution: | a Department of Mathematics, Nanchang University, Nanchang 330031, PR China b School of Mathematics and Computer Science, Gannan Normal University, Ganzhou 341000, PR China c Lingnan College, Zhongshan University, Guangzhou 510275, PR China |
| Abstract: | In this paper, by means of a basic result concerning the estimation of the lower bounds of upper convex densities for the self-similar sets, we show that in the Sierpinski gasket, the minimum value of the upper convex densities is achieved at the vertices. In addition, we get new lower bounds of upper convex densities for the famous classical fractals such as the Koch curve, the Sierpinski gasket and the Cartesian product of the middle third Cantor set with itself, etc. One of the main results improves corresponding result in the relevant reference. The method presented in this paper is different from that in the work by Z. Zhou and L. Feng The minimum of the upper convex density of the product of the Cantor set with itself, Nonlinear Anal. 68 (2008) 3439-3444]. |
| Keywords: | Self-similar set Upper convex density Hausdorff measure and Hausdorff dimension Sierpinski gasket |
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