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Disambiguation of "Vlad, Marcel Ovidiu"

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Discrete random walk representations for continuum stochastic dynamics

, and . Physica A: Statistical and Theoretical Physics, 159 (2): 239--255 (Aug 15, 1989)

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Vlad Manilici

Flow-based routing in community networks. TU Berlin, (2009)

Julia Vlad

Vlad Rojanschi

Vlad Giurgea

Ovidiu Avramescu

 

Other publications of authors with the same name

Physical approach to the ergodic behavior of stochastic cellular automata with generalization to random processes with infinite memory, and . Physica A: Statistical and Theoretical Physics, 229 (3-4): 273--294 (Aug 1, 1996)An inverse scaling approach to a multi-state random activation energy model. Physica A: Statistical and Theoretical Physics, 184 (3-4): 303--324 (Jul 1, 1992)A branched chain approach to fractal time. Physica A: Statistical and Theoretical Physics, 184 (3-4): 325--341 (Jul 1, 1992)Shlesinger-Hughes stochastic renormalization, iterated logarithmic tails and multiple hierarchical fractal aggregation. Physica A: Statistical and Theoretical Physics, 207 (4): 483--491 (Jun 15, 1994)A fractal time approach to continuous flow systems with stagnancy. Physica A: Statistical and Theoretical Physics, 197 (1-2): 182--190 (Jul 15, 1993)First passage step count number versus first passage time in age-dependent dynamics, and . Physica A: Statistical and Theoretical Physics, 155 (2): 311--336 (Feb 15, 1989)A physical interpretation of age-dependent master equations, and . Physica A: Statistical and Theoretical Physics, 155 (2): 276--310 (Feb 15, 1989)A fractal approach for the statistics of extremes with application to evolutionary biology. Chaos, Solitons & Fractals, 3 (5): 509--514 (00 1993)Crossover from geometrical to stochastic fractal statistics for translationally invariant random distributions of independent particles in n-dimensional Euclidean space, and . Chaos, Solitons & Fractals, 7 (3): 337--348 (March 1996)Fractional diffusion equation on fractals: Self-similar stationary solutions in a force field derived from a logarithmic potential. Chaos, Solitons & Fractals, 4 (2): 191--199 (February 1994)