HODGE THEORY OF PROJECTIVE MANIFOLDS, THE
Summary
This book is a written-up and expanded version of eight lectures on the Hodge theory of projective manifolds. It assumes very little background and aims at describing how the theory becomes progressively richer and more beautiful as one specializes from Riemannian, to Kähler, to complex projective manifolds. Though the proof of the Hodge Theorem is omitted, its consequences -- topological, geometrical and algebraic -- are discussed at some length. The special properties of complex projective manifolds constitute an important body of knowledge and readers are guided through it with the help of selected exercises. Despite starting with very few prerequisites, the concluding chapter works out, in the meaningful special case of surfaces, the proof of a special property of maps between complex projective manifolds, which was discovered only quite recently.
Similar Books
-
Reflection Groups and Coxeter Groups
by James E. Humphreys
-
Lagrangian & Hamiltonian Mechanics
by M.G. Calkin
-
Differential Analysis on Complex Manifolds
by Raymond O'Neil Wells
-
Differential Geometric Structures
by Walter A. Poor
-
Elementary Lie Group Analysis and Ordinary Differential Equations
by N. H. Ibragimov
-
Algebraic Topology
by C.R.F. Maunder
-
Applied Mathematics Methods in Theoretical Physics
by Michio Masujima
-
Geometric Asymptotics
by Victor W. Guillemin
-
Integral Equations
by B.L. Moiseiwitsch
-
-
-
Introduction to Combinatorics
by Alan Slomson
-
Relativistic Quantum Mechanics
by Hartmut M. Pilkuhn
-
Projective Modules over Lie Algebras of Cartan Type
by Daniel Ken Nakano