Exact L2 Bernstein-Markov inequalities for generalized weights
Abstract
In this paper, we obtain some exact L2 Bernstein-Markov inequalities for generalized Hermite and Gegenbauer weight. More precisely, we determine the exact values of the extremal problem Mn2(L2(Wλ), D):=0≠ p∈Pn∫I| D p(x)|2Wλ(x) dx∫I| p(x)|2Wλ(x) dx,\ λ>0, where Pn denotes the set of all algebraic polynomials of degree at most n, D is the differential operator given by D=\aligned& d dx\ or\ Dλ, && if\ Wλ(x)=|x|2λe-x2\ and\ I= R, \\&(1-x2)12\, d dx\ or\ (1-x2)12\,Dλ, && if\ Wλ(x):=|x|2λ(1-x2)μ- 12,μ>-12\ and\ I=[-1,1],aligned and Dλ is the univariate Dunkl operator, i.e., Dλ f(x)=f'(x)+λ(f(x)-f(-x))/x. Furthermore, the corresponding extremal polynomials are also obtained.
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