- 1982 Ph.D., St. Petersburg State University, Russia
- MATH 1500 Analytic Geometry and Calculus
- MATH 1700 Calculus II
- MATH 4700/7700 Advanced Calculus of One Real Variable
- MATH 4900/7900 Advanced Multivariable Calculus
Convex geometry, harmonic and functional analysis, probability
- authored by Alexander Koldobsky
- reviewed by Alexander Koldobsky
B.Klartag, A.Koldobsky, An example related to the slicing inequality for general measures, J. Funct. Anal. 274 (2018), 2089-2112
A.Giannopoulos, A.Koldobsky, Volume difference inequalities, Trans. Amer. Math. Soc. 370 (2018), 4351--4372
A.Koldobsky, A.Merkurjev, V.Yaskin, On polynomially integrable convex bodies, Advances in Mathematics 320 (2017), 876--886
A.Koldobsky, Slicing inequalities for measures of convex bodies, Advances in Mathematics 283 (2015), 473-488.
A.Koldobsky, Fourier analysis in convex geometry, Mathematical Surveys and Monographs, American Mathematical Society, Providence, RI, 170 p.
A.Koldobsky, A \sqrt{n} estimate for measures of sections of convex bodies, Advances in Mathematics 254 (2014), 33-40.
A.Koldobsky, V.Yaskin, The interface between convex geometry and harmonic analysis, CBMS Regional Conference Series, American Mathematical Society, Providence, RI, 2008, 107 p.
A.Koldobsky, A functional analytic approach to intersection bodies, GAFA (Geometric and Functional Analysis) 10 (2000), 1507-1526.
R.J.Gardner, A.Koldobsky, Th.Schlumprecht, An analytic solution to the Busemann-Petty problem on sections of convex bodies, Annals of Mathematics 149 (1999), 691-703.
A.Koldobsky, The Schoenberg problem on positive definite functions, Algebra & Analysis 3 (1991), 78-85; translation in St Petersburg Math. J. 3 (1992), 563-570