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On some Extremal Problems of Landau

Révész, Szilárd — 2007

Serdica Mathematical Journal

2000 Mathematics Subject Classification: Primary: 42A05. Secondary: 42A82, 11N05. The prime number theorem with error term presents itself as &pi'(x) = ∫2x [dt/ logt] + O ( x e- K logL x). In 1909, Edmund Landau provided a systematic analysis of the proof seeking better values of L and K. At a key point of his 1899 proof de la Vallée Poussin made use of the nonnegative trigonometric polynomial 2/3 (1+cos x)2 = 1+4/3 cosx +1/3 cos2x. Landau considered more general positive definite...

Schur-type inequalities for complex polynomials with no zeros in the unit disk.

Révész, Szilárd Gy. — 2007

Journal of Inequalities and Applications [electronic only]

Bernstein's inequality for multivariate polynomials on the standard simplex.

Milev, Lozko B.; Révész, Szilárd Gy. — 2005

Journal of Inequalities and Applications [electronic only]

Effective oscillation theorems for a general class of real-valued remainder terms

Szilárd Révész — 1988

Acta Arithmetica

A comparative analysis of Bernstein type estimates for the derivative of multivariate polynomials

Szilárd Gy. Révész — 2006

Annales Polonici Mathematici

We compare the yields of two methods to obtain Bernstein type pointwise estimates for the derivative of a multivariate polynomial in a domain where the polynomial is assumed to have sup norm at most 1. One method, due to Sarantopoulos, relies on inscribing ellipses in a convex domain K. The other, pluripotential-theoretic approach, mainly due to Baran, works for even more general sets, and uses the pluricomplex Green function (the Zaharjuta-Siciak extremal function). When the inscribed ellipse method...

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