Estimates for Norms of Random Polynomials
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This paper contains some estimates for the {\it integral-uniform} norm and the uniform norm of a wide class of random polynomials. The family of integral-uniform norms introduced by Kasin and Tzafriri is a natural generalization of the maximum norm taken over a net. We prove some properties of the integral-uniform norms. The given application of the established estimates demonstrates that the integral-uniform norms may be useful whenever one is interested in the properties of a function distribution. Key words: integral-uniform norm; random polynomials with respect to a general function system; trigonometric polynomials with random coefficients.
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On Average Modulus of Random Polynomials Over a Unit Circle and Disc
Computes average modulus of random polynomials with normal coefficients on unit circle and disk and derives Markov inequality bounds on maximum modulus for Gaussian and uniform coefficients.
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