The Joys of Haar Measure

For readers who have been exposed to a basic course in real variables, and have a certain degree of mathematical maturity, Diestal and Spalsbury highlight developments in the existence, uniqueness, and applications of invariant measures. They cover Lebesgue measure in Euclidean space, measures on metric spaces, topological groups, Banach and measure, compact groups have a Haar measure, applications, Haar measure on locally compact groups, metric invariance and Haar measure, Steinlage on Haar measure, and Oxtoby's view of Haar measure. Annotation ©2014 Ringgold, Inc., Portland, OR (protoview.com)