Topological Complexity of Smooth Random Functions [electronic resource] :École d'Été de Probabilités de Saint-Flour XXXIX-2009 / by Robert J. Adler, Jonathan E. Taylor.
by Adler, Robert J [author.]; Taylor, Jonathan E [author.]; SpringerLink (Online service).
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BookSeries: Lecture Notes in Mathematics: 2019Publisher: Berlin, Heidelberg : Springer Berlin Heidelberg : 2011.Description: VIII, 122 p. 15 illus., 9 illus. in color. online resource.ISBN: 9783642195808.Subject(s): Mathematics | Geometry | Mathematical statistics | Mathematics | Geometry | Statistical Theory and MethodsDDC classification: 516 Online resources: Click here to access online | Item type | Current location | Call number | Status | Date due | Barcode |
|---|---|---|---|---|---|
| MAIN LIBRARY | QA440-699 (Browse shelf) | Available |
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| TA357-359 The Pi-Theorem | TK7800-8360 Low Power and Reliable SRAM Memory Cell and Array Design | QR74.8-99.5 Endospore-forming Soil Bacteria | QA440-699 Topological Complexity of Smooth Random Functions | QC1-QC999 Random Walks and Diffusions on Graphs and Databases | QA76.7-76.73 Languages and Compilers for Parallel Computing | QC19.2-20.85 Basic Concepts in Physics |
1 Introduction -- 2 Gaussian Processes -- 3 Some Geometry and Some Topology -- 4 The Gaussian Kinematic Formula -- 5 On Applications: Topological Inference -- 6 Algebraic Topology of Excursion Sets: A New Challenge.
These notes, based on lectures delivered in Saint Flour, provide an easy introduction to the authors’ 2007 Springer monograph “Random Fields and Geometry.” While not as exhaustive as the full monograph, they are also less exhausting, while still covering the basic material, typically at a more intuitive and less technical level. They also cover some more recent material relating to random algebraic topology and statistical applications. The notes include an introduction to the general theory of Gaussian random fields, treating classical topics such as continuity and boundedness. This is followed by a quick review of geometry, both integral and Riemannian, with an emphasis on tube formulae, to provide the reader with the material needed to understand and use the Gaussian kinematic formula, the main result of the notes. This is followed by chapters on topological inference and random algebraic topology, both of which provide applications of the main results.
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