RT Web Page DB /z-wcorg/ DS http://worldcat.org ID 652792734 LA English UL http://purl.stanford.edu/yg805jw1021 T1 Methods and applications of topological data analysis A1 Kloke, Jennifer Novak., Carlsson, G., Kerckhoff, Steve,, Mazzeo, Rafe,, Stanford University., Department of Mathematics., YR 2010 AB The focus of this dissertation is the development of methods for topological analysis as well as the application of topological tools to real world problems. The first half of the dissertation focuses on an algorithm for de-noising high-dimensional data for topological data analysis. This method significantly extends the applicability of many topological data analysis methods. In particular, this method extends the use of persistent homology, a generalized notion of homology for discrete data points, to data sets that were previously inaccessible because of noise. The second half of this dissertation focuses on a method for using topology to simplify complex chemical structures and to define a metric to quantify similarity for use in screening large databases of chemical compounds. This method has shown very promising initial results in locating new materials for efficiently separating carbon dioxide from the exhaust of coal-burning power plants.