Institutul de Matematică şi Informatică "Vladimir Andrunachievici"
Universitatea de Stat din Moldova
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BASM n.2 (57), 2008
/
Symmetric random evolution in the space ℜ
6
.
Authors:
Kolesnik Alexander
Abstract
A closed-form expression for the transition density of a symmetric Markovian random evolution in the Euclidean space ℜ
6
is presented.
E-mail:
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Contents
Fuzzy subquasigroups with respect to a s-norm.
Ideal Theory in Commutative Semirings.
A closed form asymptotic solution for the FitzHugh-Nagumo model.
Non-fundamental 2-isohedral tilings of the sphere.
Discrete Optimal Control Problem with Varying Time of States Transactions of Dynamical System and Algorithm for its solving.
Measure of quasistability of a vector integer linear programming problem with generalized principle of optimality in the Helder metric.
Moments of the Markovian random evolutions in two and four dimensions.
A virtual analog of Pollaczek-Khintchin transform equation.
Resolvability of some special algebras with topologies.
Groups with many hypercentral subgroups.
The Euler Tour of n-Dimensional Manifold with Positive Genus.
Symmetric random evolution in the space ℜ
6
.
On numerical algorithms for solving multidimensional analogs of the Kendall functional equation.
Classification of Aff(2, ℜ)-orbit's dimensions for quadratic differential system.
Professor Mihail Popa - 60th anniversary.
Academician Radu Miron - Eighty Years of Life and Sixty Years of Efforts.