Includes bibliographical references (pages 205-211) and index.
Contents
Volume preserving homeomorphisms of the cube -- Introduction to part I and II (compact manifolds) -- Measure preserving homeomorphisms -- Discrete approximations -- Transitive homeomorphisms of In and Rn -- Fixed points and area preservation -- Measure preserving lusin theorem -- Ergodic homeomorphisms -- Uniform approximation in g[In, delta] and generic properties in M[In, delta] -- Measure preserving homeomorphisms of a compact manifold -- Measures on compact manifolds -- Dynamics on compact manifolds -- Oeasure preserving homeomorphisms of a noncompact manifold -- Ergodic volume preserving homeomorphisms of Rn -- Manifolds where ergodicity is not generic -- Noncompact manifolds and ends -- Ergodic homeomorphisms: the results -- Ergodic homeomorphisms: proofs -- Other properties typical in M[X, u].
Local Note
eBooks on EBSCOhost EBSCO eBook Subscription Academic Collection - North America