Polynomial Approximation in L2 of the Double Exponential via Complex Analysis
Abstract
We study the polynomial approximation problem in L2(μ1) where μ1(dx) = e-|x|/2 dx. We show that for any absolutely continuous function f, Σk=1∞ 2(e+k) f, Pk 2 \ ≤ C ( ∫R 2(e+ x ) f2 \, dμ1 \ + \ ∫R (f')2 \, dμ1 ) for some universal constant C>0, where (Pk)k ∈ N are the orthonormal polynomials associated with μ1. This inequality is tight in the sense that 2(e +k) on the left hand-side cannot be replaced by ak 2(e +k) with a sequence ak ∞. When the right hand-side is bounded this inequality implies a logarithmic rate of approximation for f, which was previously obtained by Lubinsky. We also obtain some rates of approximation for the product measure μ1 d in Rd via a tensorization argument. Our proof relies on an explicit formula for the generating function of orthonormal polynomials associated with the weight 12(π x/2) and some complex analysis.
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