Geometric Analysis and Function Spaces
Geometric Analysis and Function Spaces

Author: Steven George Krantz

Publisher: American Mathematical Soc.

Published: 1993-01-01

Total Pages: 224

ISBN-13: 9780821889251

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This book brings into focus the synergistic interaction between analysis and geometry by examining a variety of topics in function theory, real analysis, harmonic analysis, several complex variables, and group actions. Krantz's approach is motivated by examples, both classical and modern, which highlight the symbiotic relationship between analysis and geometry. Creating a synthesis among a host of different topics, this book is useful to researchers in geometry and analysis and may be of interest to physicists, astronomers, and engineers in certain areas. The book is based on lectures presented at an NSF-CBMS Regional Conference held in May 1992.

101 Ways to Bug Your Teacher
101 Ways to Bug Your Teacher

Author: Lee Wardlaw

Publisher: Putnam Juvenile

Published: 2004

Total Pages: 0

ISBN-13: 9780803726581

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Steve "Sneeze" Wyatt attempts to thwart his parents' plan to have him skip eighth grade, but he has bigger problems when his friends disapprove of his new list and Mrs. "Fierce" Pierce threatens to keep him from the Invention Convention.

Algebraic Topology
Algebraic Topology

Author: Mark E. Mahowald

Publisher: American Mathematical Soc.

Published: 1989

Total Pages: 366

ISBN-13: 0821851020

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This book will provide readers with an overview of some of the major developments in current research in algebraic topology. Representing some of the leading researchers in the field, the book contains the proceedings of the International Conference on Algebraic Topology, held at Northwestern University in March, 1988. Several of the lectures at the conference were expository and will therefore appeal to topologists in a broad range of areas. The primary emphasis of the book is on homotopy theory and its applications. The topics covered include elliptic cohomology, stable and unstable homotopy theory, classifying spaces, and equivariant homotopy and cohomology. Geometric topics--such as knot theory, divisors and configurations on surfaces, foliations, and Siegel spaces--are also discussed. Researchers wishing to follow current trends in algebraic topology will find this book a valuable resource.