Pritsker, Igor - Department of Mathematics, Oklahoma State University

• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• Approximation of Conformal Mappings 1 Approximation of Conformal Mappings
• Suppose : [a, b] R2 is a path in the xy-plane. How does one compute the length of the corresponding Well suppose we break the interval [a,b] up into n subintervals of length
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• Electronic Transactions on Numerical Analysis. Volume 25, pp. 259-277, 2006.
• Paths and Curves in Rn We have used the notion of a path : R Rn several times already, I now want formalize this fundamental
• ELECTRONIC RESEARCH ANNOUNCEMENTS OF THE AMERICAN MATHEMATICAL SOCIETY
• ON A COUNTEREXAMPLE IN THE THEORY OF POLYNOMIALS HAVINGCONCEN-TRATION AT LOW DEGREES
• Submitted exclusively to the London Mathematical Society doi:10.1112/0000/000000
• DISTRIBUTION OF ALGEBRAIC NUMBERS IGOR E. PRITSKER
• Means of algebraic numbers in the unit disk Igor E. Pritsker 1
• THE MULTIVARIATE INTEGER CHEBYSHEV PROBLEM P. B. BORWEIN AND I. E. PRITSKER
• Inequalities for Products of Polynomials II I. E. Pritsker
• AN AREAL ANALOG OF MAHLER'S MEASURE IGOR E. PRITSKER
• Computational Methods and Function Theory Volume 00 (0000), No. 0, 1? CMFT-MS XXYYYZZ
• DOI: 10.1007/s00365-005-0595-8 Constr. Approx. (2006) 23: 103120
• SMALL POLYNOMIALS WITH INTEGER COEFFICIENTS IGOR E. PRITSKER
• DRAFT: Canad. J. Math. February 22, 2005 10:05 File: pritsker3382 pp.122 Page 1 Sheet 1 of 22 Canad. J. Math. Vol. XX (Y), ZZZZ pp. 122
• Computational Methods and Function Theory Volume 3 (2003), No. 1, 7994
• Derivatives of Faber polynomials and Markov inequalities Igor E. Pritsker*
• TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY
• Rational approximation with varying weights in the complex plane
• Weighted rational approximation in the complex plane Igor E. Pritker and Richard S. Varga
• Weighted Approximation on Compact Sets Igor E. Pritsker
• BOUNDARY SINGULARITIES OF FABER AND FOURIER SERIES Igor E. Pritsker and Richard S. Varga
• THE QUADRIC SURFACES Suppose we have a general quadratic equation in three variables
• Vectors and Vector Spaces, Cont'd 1. Equations of Lines and Planes
• Real-Valued Functions Recall that a function is simply a rule for associating with each element of a set A an element of another
• Partial Derivatives and Differentiability 1. Partial Derivatives
• Maxima and Minima Definition 11.1. Let f : Rn R be a real-valued function of several variables. A point xo Rn is called
• Vector Fields Definition 13.1. A vector field on Rn is a function F : A Rn Rn that assignes to each point x in
• Double Integrals over More General Regions We shall now develop the theory of integration over regions other than rectangles. To do this we will first
• Integrals over 3-Dimensional Regions 1. Integrals over Rectangular Boxes
• Integration by a Change of Variables 1. Introduction
• DOI: 10.1007/s003650010027 Constr. Approx. (2001) 17: 209225
• Selected Theorems for Test 2 We use the standard notation s =
• POLYNOMIAL INEQUALITIES, MAHLER'S MEASURE, AND MULTIPLIERS
• TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY
• A Sharp Version of Mahler's Inequality for Products of Polynomials Andras Kroo
• Vectors and Vector Spaces There are three fundamental ways of thinking about n-dimensional vectors
• Reverse Triangle Inequalities for Potentials I. E. Pritsker
• Weighted Polynomial Approximation in the Complex Plane
• Identities of Vector Analysis 1. Differential Operator Notation
• Directional Derivatives and the Gradient In this lecture we specialize to the case where f : Rn R is a real-valued function of several variables. For
• Electronic Transactions on Numerical Analysis. Volume 4, pp. 106-124, September 1996.
• Please give complete and clearly written solutions. You are required to draw pictures of the regions for all integrals.
• Canad. Math. Bull. Vol. XX (Y), ZZZZ pp. 115 Potential Theory of the Farthest-Point
• Integrals over Surfaces 1. Parameterized Surfaces
• Differentials and the Chain Rule In this lecture we will elaborate on notion of gradient that we introduced when we discussed the differen-
• CHEBYSHEV POLYNOMIALS WITH INTEGER COEFFICIENTS
• NORMS OF PRODUCTS AND FACTORS OF POLYNOMIALS
• The Divergence and Curl of a Vector Field 1. The Divergence of a Vector Field
• Asymptotic Zero Distribution 1 Asymptotic Zero Distribution of
• J. Math. Pures Appl. 80, 4 (2001) 373388 2001 ditions scientifiques et mdicales Elsevier SAS. All rights reserved
• Integration by a Change of Variables, Cont'd 1. How a Coordinate Changes : R2 R2 affects Small Areas
• Double Integrals over Rectangles For the last 10 lectures or so we have been developing the calculus of derivatives for functions of several
• Higher Order Derivatives and Taylor Expansions 1. Higher Order Derivatives
• Limits of Real-Valued Functions 1. Topology of Rn
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• MATHEMATICS OF COMPUTATION Volume 72, Number 244, Pages 19011916
• Convergence of Julia polynomials Igor E. Pritsker
• Reversing the Order of Integration Last time I presented the following theorem.
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• The Integral Theorems of Vector Analysis 1. The Fundamental Theorem of Calculus
• Integrals over Curves Recall that the arc length of a parameterized curve : [a,b] Rn is given by
• INEQUALITIES FOR PRODUCTS OF POLYNOMIALS I I. E. PRITSKER AND S. RUSCHEWEYH
• EQUIDISTRIBUTION OF POINTS VIA ENERGY IGOR E. PRITSKER
• Z .JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 216, 685 695 1997 ARTICLE NO. AY975699