Description
Equivariant Cohomology in Algebraic Geometry provides a rigorous and systematic introduction to equivariant cohomology theory and its powerful applications in modern algebraic geometry. Written by leading experts David Anderson and William Fulton, this volume covers fundamental concepts including equivariant Chow groups, localization theorems, and the geometry of torus actions on varieties.
The text develops the theory from first principles while maintaining connections to classical algebraic geometry. It addresses both theoretical foundations and computational techniques essential for researchers studying group actions on algebraic varieties. The book includes detailed examples and exercises that illuminate the interplay between algebraic topology and geometric invariant theory.
Designed for graduate students and researchers, this advanced text serves as both a comprehensive reference and a foundation for further study in equivariant geometry, intersection theory, and related fields.
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