Ryabogin, Dmitry - Department of Mathematics, Kent State University

• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Advances in Mathematics 226 (2011) 26292642 www.elsevier.com/locate/aim
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• January 13, 2011 A PROBLEM OF KLEE ON INNER SECTION FUNCTIONS OF CONVEX
• SOME PROPERTIES OF CONJUGATE HARMONIC FUNCTIONS IN A HALF-SPACE
• ON A QUESTION OF A. KOLDOBSKY ALEXEY GONCHAROV AND DMITRY RYABOGIN
• SOME PROBLEMS RELATED TO THE CALDER ON-ZYGMUND SINGULAR INTEGRAL OPERATORS WITH ROUGH KERNELS.
• -BOUNDED HOMOGENEOUS SINGULAR INTEGRALS NECESSARILY Lp
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis. Instructor: Dmitry Ryabogin
• Real Analysis. Instructor: Dmitry Ryabogin
• Real Analysis. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• HARDY SPACES AND PARTIAL DERIVATIVES OF CONJUGATE HARMONIC FUNCTIONS
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• HARDY SPACES AND PARTIAL DERIVATIVES OF CONJUGATE HARMONIC FUNCTIONS
• Real Analysis. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• ON THE LOCAL EQUATORIAL CHARACTERIZATION OF ZONOIDS AND INTERSECTION BODIES
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• A REMARK ON THE MAHLER CONJECTURE: LOCAL MINIMALITY OF THE UNIT CUBE
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• SOME PROBLEMS RELATED TO THE CALDERO'N-ZYGMUND SINGULAR INTEGRAL OPERATORS WITH ROUGH KERNELS.
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis. Instructor: Dmitry Ryabogin
• January 13, 2011 THE BEHAVIOR OF ITERATIONS OF THE INTERSECTION
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY
• ON A PAPER OF HUDSON. GEORGIY ARUTYUNYANTS AND DMITRY RYABOGIN
• Real Analysis II Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• January 13, * A PROBLEM OF KLEE ON INNER SECTION FUNCTIONS OF CONVEX
• PROJECTIONS OF CONVEX BODIES AND THE FOURIER TRANSFORM
• Real Analysis. Instructor: Dmitry Ryabogin
• Real Analysis. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• FOURIER ANALYTIC METHODS IN THE STUDY OF PROJECTIONS AND SECTIONS OF CONVEX BODIES
• A REMARK ON THE MAHLER CONJECTURE: LOCAL MINIMALITY OF THE UNIT CUBE
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• SOME PROPERTIES OF CONJUGATE HARMONIC FUNCTIONS IN A HALF-SPACE
• Real Analysis. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• HARDY SPACES AND PARTIAL DERIVATIVES OF CONJUGATE HARMONIC FUNCTIONS
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• THE k-DIMENSIONAL RADON TRANSFORM ON THE n-SPHERE AND
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• ARE L2-BOUNDED HOMOGENEOUS SINGULAR INTEGRALS NECESSARILY Lp-BOUNDED?
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis II. Instructor: Dmitry Ryabogin
• Singular integrals, generated by spherical measures Dmitry Ryabogin and Boris Rubin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• SINGULAR INTEGRAL OPERATORS GENERATED BY WAVELET TRANSFORMS
• Transform Methods & Special Functions, Varna'96 Proceedings of Second International Workshop, 23 -30 August 1996
• THE FOURIER TRANSFORM AND FIREY PROJECTIONS OF CONVEX BODIES
• WEAK-TYPE (p, p) ESTIMATES FOR CERTAIN MAXIMAL OPERATORS
• Real Analysis. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Wavelet Type Representations in Fractional Calculus By
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• HARDY SPACES AND PARTIAL DERIVATIVES OF CONJUGATE HARMONIC FUNCTIONS
• Complex Analysis, Spring 2011. Instructor: Dmitry Ryabogin
• Real Analysis, Math 821. Instructor: Dmitry Ryabogin
• ON A QUESTION OF A. KOLDOBSKY ALEXEY GONCHAROV AND DMITRY RYABOGIN
• DETECTING SYMMETRY IN STAR BODIES D. RYABOGIN AND V. YASKIN
• NON-UNIQUENESS OF CONVEX BODIES WITH PRESCRIBED VOLUMES OF SECTIONS AND PROJECTIONS
• ON COUNTEREXAMPLES IN QUESTIONS OF UNIQUE DETERMINATION OF CONVEX BODIES
• AN ASYMMETRIC CONVEX BODY WITH MAXIMAL SECTIONS OF CONSTANT VOLUME