Some Sharp Inequalities for Algebraic Polynomials

Some inequalities associated with the Laplacian for trigonometric polynomials are given, which will be applied to investigate the behavior in approximation by trigonometric polynomials in higher dimensions and the best lower and upper estimates for some linear operators. In particular, we obtain a c

Let k be a finite field and assume that ⌳ is a finite dimensional associative Ž . k-algebra with 1. Denote by mod ⌳ the category of all finitely generated right ⌳-modules and by ind ⌳ the full subcategory in which every object is a representa-Ž . tive of the isoclass of an indecomposable right ⌳-mod

Let p n z be a polynomial of degree n and D α p n z its polar derivative. It has been proved that if p n z has no zeros in z < 1, then for δ ≥ 1 and α ≥ 1, 2π 0 D α p n e iθ δ dθ 1/δ ≤ n α + 1 F δ 2π 0 p n e iθ δ dθ 1/δ where F δ = 2π/ 2π 0 1 + e iθ δ dθ 1/δ . We also obtain analogous inequalities

We prove a weighted inequality for algebraic polynomials and their derivatives in L p [&1, 1] when 0< p<1. This inequality plays the same role in the proofs of inverse theorems for algebraic polynomial approximation in L p as the classical Bernstein inequality does in the case of trigonometric polyn