Abstract
In recent years, especially in the subject of harmonic analysis, there has been interest in geometric phenomena of RN as N → ∞. In the present paper we examine several specific geometric phenomena in Euclidean space and calculate the asymptotics as the dimension gets large.
Author Information
Steven G. Krantz received his B.A. degree from the University of California at Santa Cruz in 1971. He earned the Ph.D. from Princeton University in 1974. He has taught at UCLA, Princeton University, Penn State, and Washington University in St. Louis. Krantz is the holder of the UCLA Alumni Foundation Distinguished Teaching Award, the Chauvenet Prize, and the Beckenbach Book Prize. He is the author of 150 papers and 50 books. His research interests include complex analysis, real analysis, harmonic analysis, and partial differential equations. Krantz is currently the Deputy Director of the American Institute of Mathematics.
American Institute of Mathematics, 360 Portage Avenue,
Palo Alto, CA 94306
skrantz@aimath.org
Technologies Used in This Article
Keywords
- geometry
- Euclidean space
- volume
- dimension
- centroid
Publication data
- Published Ocober, 2007; article ID 1612
- Copyright © 2007, by Steven G. Krantz
Article Link
Steven G. Krantz, "Higher Dimensional Conundra," Convergence (October 2007)