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Zvavitch, Artem - Department of Mathematics, Kent State University
Midterm Exam (Hints): Maximal Grade is 100pts. You may use Notes, but must provide ALL details. If you use theorem/formula from the
Math 304 Syllabus (Winter Semester 2003) Instructor: Dr. Artem Zvavitch
A remark on p-summing norms of operators Artem Zvavitch
An Isomorphic Version of the Busemann{Petty Problem for Gaussian Measure
A REMARK ON THE MAHLER CONJECTURE: LOCAL MINIMALITY OF THE UNIT CUBE
Supremum of a Process in Terms of Trees Olivier Guedon1
RECONSTRUCTION OF CONVEX BODIES OF REVOLUTION FROM THE AREAS OF THEIR
GAUSSIAN MEASURE OF SECTIONS OF DILATES AND TRANSLATIONS OF CONVEX BODIES.
THE BUSEMANN-PETTY PROBLEM FOR ARBITRARY A. ZVAVITCH
N More on embedding subspaces of Lp into `p ,
PROJECTIONS OF CONVEX BODIES AND THE FOURIER TRANSFORM
n Isomorphic embedding of `p , 1 < p < 2, into
Preprint (1999), Embedding subspaces of Lp into `Np, 0 < p < 1
August 28, 2007 GAUSSIAN BRUNN-MINKOWSKI INEQUALITIES
ON THE LOCAL EQUATORIAL CHARACTERIZATION OF ZONOIDS AND INTERSECTION BODIES
AN ISOMORPHIC VERSION OF THE BUSEMANN-PETTY PROBLEM FOR GAUSSIAN
Gaussian Measure of Sections of convex A. Zvavitch
FOURIER ANALYTIC METHODS IN THE STUDY OF PROJECTIONS AND SECTIONS OF CONVEX BODIES
THE FOURIER TRANSFORM AND FIREY PROJECTIONS OF CONVEX BODIES
Math 315 (Mathematical Modeling II). Syllabus (Winter Semester 2004)
Math 314 (Mathematical Modeling I). Syllabus (Fall Semester 2003)
AN APPLICATION OF SHADOW SYSTEMS TO MAHLER'S CONJECTURE.
Introduction to Analysis Exam for fun 2
Harmonic Analysis and Uniqueness Questions in Convex Geometry
