Extremal -norms of linear operators and self-similar functions

Asymptotic properties of extremal solutions of linear inclusions of order three with zero Lyapunov exponent are investigated. Under certain conditions it is shown that all extremal solutions of such inclusions tend to the same (up to a multiplicative factor) solution, which is central symmetric. The

## Abstract We show the existence of a unique analytic single parameter limiting survival function arising from the repeated composition of a coherent structure as the number of components tends to infinity. Examples include the repeated composition process of the bridge structure. © 2003 Wiley Per

## Abstract The first term of the asymptotics of the best constants in Markov‐type inequalities for higher derivatives of polynomials is determined in the two cases where the underlying norm is the __L__^2^ norm with Laguerre weight or the __L__^2^ norm with Gegenbauer weight. The coefficient in th

## Abstract A unified class of linear positive operators has been defined. Using these operators some approximation estimates have been obtained for unbounded functions. For particular linear positive operators these results sharpen and improve the earlier estimates due to Fuhua Cheng (J. Approx. T