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Functional equation for the crossover in the model of one-dimensional Weierstrass random walks walks of the Weierstrass type using two-parameter scaling for the transition probability. We construct a
Novel approach to calculation of box dimension of fractal functions to our new approach. On the example of the Weierstrass function we show that the new method almost 3
Functional equation for the crossover in the one-dimensional model of Weierstrass random walksFunctional equation for the crossover in the one-dimensional model of Weierstrass random walks
Survey paper : The derivation of the generalized functional equations describing self-similar processes on this idea the new solutions for the well-known Weierstrass- Mandelbrot function were obtained
Novel approach to calculation of box dimension of fractal functions to our new approach. On the example of the Weierstrass function we show that the new method almost 3
Functional equation for the crossover in a model of one-dimensional Weierstrass random walksSummary (translated from the Russian): "Within the framework of the Weierstrass-type Markov random
Analog of theWeierstrass Theorem and the Blaschke Product for A(z)-analytic Functions(z)-analytic functions analogs of the Weierstrass theorem and of the Blaschke theorem are proved
On the univalence of derivatives of functions which are univalent in angular domainsWe consider functions f that are univalent in a plane angular domain of angle απ, 0 < α ≤ 2
Survey paper : The derivation of the generalized functional equations describing self-similar processes on this idea the new solutions for the well-known Weierstrass- Mandelbrot function were obtained
On the univalence of derivatives of functions which are univalent in angular domainsWe consider functions f that are univalent in a plane angular domain of angle απ, 0 < α ≤ 2
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