Probability on algebraic and geometric structures
Probability on algebraic and geometric structures
Gregory Budzban, Harry Randolph Hughes, Henri Schurz, Philip J. Feinsilver
Details
- OL Work ID
- OL22321637W
Subjects
Differential equationsCombinatorial geometryProbability theory and stochastic processes -- Stochastic analysis -- Stochastic calculus of variations and the Malliavin calculusCalculus of variations and optimal control; optimization -- Miscellaneous topics -- Applications of optimal control and differential gamesGeneral topology -- Maps and general types of spaces defined by maps -- Algebraic properties of function spacesProbability theory and stochastic processes -- Probability theory on algebraic and topological structures -- Probability measures on groups or semigroups, Fourier transforms, factorizationMarkov processesCombinatorics -- Graph theory -- Graphs and linear algebra (matrices, eigenvalues, etc.).CongressesProbability theory and stochastic processes -- Stochastic analysis -- Stochastic partial differential equationsProbability measuresLinear and multilinear algebra; matrix theory -- Basic linear algebra -- Clifford algebras, spinorsProbability theory and stochastic processes -- Stochastic analysis -- Applications of stochastic analysis (to PDE, etc.).Probability theory and stochastic processes -- Markov processes -- Discrete-time Markov processes on general state spacesProbability theory and stochastic processes -- Stochastic processes -- Sums of independent random variables; random walksProbabilitiesGeometry