论文信息 - Polynomials with laguerre weights in Lp

Polynomials with laguerre weights in Lp

For each p (0 < p ≤ ∞), s ≥ 0, and integer m ≥ 1 we consider the extremal problem $$E_{s,m,p} : = \inf \left\{ {\left\| {t^s e^{ - t} \left( {t^m - q_{m - 1} \left( t \right)} \right)} \right\|_L p:q_{m - 1} \in p_{m - 1} } \right\},$$ where the Lp-norm is taken over [0, ∞) and pm−1 is the collection of polynomials of degree at most m−1. The asymptotic behavior of Es,m,p as n:=s+m → ∞ and s/n → ϑ is determined along with the zero distribution for the associated Chebyshev polynomials. The paper includes the proofs of results announced in [7].

Edward B. Saff | H. Mhaskar | E. Saff | Hrushikesh N. Mhaskar

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