Institutul de Matematică şi Informatică "Vladimir Andrunachievici"
Universitatea de Stat din MoldovaRO EN
The distribution of a planar random evolution with random start point.
Authors: Kolesnik Alexander
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Abstract
We consider the symmetric Markovian random evolution X(t) in the Euclidean plane ℜ2 starting from a random point whose coordinates are the independent standard Gaussian random variables. The integral and series representations of the transition density of X(t) are btained.E-mail:
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Contents
- Optimal control for one complex dynamic system.
- Conjugate-orthogonality and the complete multiplication group of a quasigroup.
- The graded Jacobson radical of associative rings.
- Applications of the integral operator to the class of meromorphic functions.
- Global Attractors of Non-autonomous Difference Equations.
- On free topological groups.
- On Topological Groupoids and Multiple Identities.
- The distribution of a planar random evolution with random start point.
- About the solvability of systems of integral equations with different degrees of differences in kernels.
- Nash equilibria in the noncooperative informational extended games.
- Professor Nicolae Vulpe 60th anniversary.
