Abstract. Continuing the investigation of Müntz type problems for Bernstein polynomials $x^{k_j}(1-x)^{n-k_j}$ started in [3], we introduce the notion of density of the sequence $\{k_j\} $, and prove convergence theorems when this density is at least $1/2$. A particular borderline-case ($k_j=2j$) is reformulated and solved in terms of self-reciprocal polynomials, whose approximation theoretic properties are of independent interest. Approximation by positive linear combinations of the above mentioned Bernstein polynomials is also considered.
AMS Subject Classification
(1991): 41A10, 41A17, 41A29
Received April 29, 1994. (Registered under 5645/2009.)
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