. . "The Kolmogorov entropy is an important measure which describes the degree of chaoticity of systems. It gives the average rate of information loss about a position of the phase point on the attractor. Numerically, the Kolmogorov entropy can be estimated as the R\u00E9nyi entropy. A special case of R\u00E9nyi entropy is the information theory of Shannon entropy. The product of Shannon entropy and Boltzmann constant is the thermodynamic entropy. Fractal structures are characterized by their fractal dimension. There exists an infinite family of fractal dimensions. A generalized fractal dimension can be defined in an E-dimensional space. The R\u00E9nyi entropy and generalized fractal dimension are connected by known relation."@en . "RIV/00216305:26310/12:PU99789" . "[8BDBE1E4B7B1]" . "The Kolmogorov entropy is an important measure which describes the degree of chaoticity of systems. It gives the average rate of information loss about a position of the phase point on the attractor. Numerically, the Kolmogorov entropy can be estimated as the R\u00E9nyi entropy. A special case of R\u00E9nyi entropy is the information theory of Shannon entropy. The product of Shannon entropy and Boltzmann constant is the thermodynamic entropy. Fractal structures are characterized by their fractal dimension. There exists an infinite family of fractal dimensions. A generalized fractal dimension can be defined in an E-dimensional space. The R\u00E9nyi entropy and generalized fractal dimension are connected by known relation." . . "DE - Spolkov\u00E1 republika N\u011Bmecko" . "192" . "134501" . "Entropy of fractal systems"@en . "2"^^ . . "26310" . . "1" . . . "Zme\u0161kal, Old\u0159ich" . "Entropy of fractal systems" . . . . . "RIV/00216305:26310/12:PU99789!RIV13-MPO-26310___" . "Entropy of fractal systems" . . "P(FR-TI1/144)" . . . . "2194-5357" . . "1"^^ . . . . "1"^^ . . "Entropy of fractal systems"@en . "Advances in Intelligent Systems and Computing" . . "Fractal physics, Fractal geometry, Fractal dimension, Fractal measure, Kolmogorov entropy, R\u00E9nyi entropy, Shannon entropy, Thermodynamic entropy"@en .