Time-Like Graphical Models

Häftad, Engelska, 2019

1 189 kr

Slutsåld

The author studies continuous processes indexed by a special family of graphs. Processes indexed by vertices of graphs are known as probabilistic graphical models. In 2011, Burdzy and Pal proposed a continuous version of graphical models indexed by graphs with an embedded time structure-- so-called time-like graphs. The author extends the notion of time-like graphs and finds properties of processes indexed by them. In particular, the author solves the conjecture of uniqueness of the distribution for the process indexed by graphs with infinite number of vertices.The author provides a new result showing the stochastic heat equation as a limit of the sequence of natural Brownian motions on time-like graphs. In addition, the author's treatment of time-like graphical models reveals connections to Markov random fields, martingales indexed by directed sets and branching Markov processes.

Produktinformation

Utgivningsdatum2019-12-30
Mått178 x 254 x 16 mm
Vikt365 g
FormatHäftad
SpråkEngelska
SerieMemoirs of the American Mathematical Society
Antal sidor174
FörlagAmerican Mathematical Society
ISBN9781470436858

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Matematisk statistik inom Naturvetenskap och teknik

IntroductionPart 1. Construction and properties: Geometry of time-like graphsProcesses indexed by time-like graphsMarkov properties of processes indexed by TLG'sFiltrations, martingales and stopping timesPart 2. Natural Brownian motion and the stochastic heat equation: Maximums of Gaussian processes Random walk and stochastic heat equation reviewedLimit of the natural Brownian motion on a rhombus gridPart 3. Processes on general and random time-like graphs: Non-simple TLG'sProcesses on non-simple TLG'sGalton-Watson time-like trees and the Branching Markov processesOpen questions and appendix: Open questionsAppendix A. Independence and processesAcknowledgmentsBibliographyIndex.