Models describing evolution of physical, chemical, biological, social and financial processes are often formulated as differential equations with the understanding that they are large-scale equations for averages of quantities describing intrinsically random processes. Explicit account of randomness may lead to significant changes in the asymptotic behaviour (anomalous scaling) in such models especially in low spatial dimensions, which in many cases may be captured with the use of the renormalization group. Anomalous scaling and memory effects may also be introduced with the use of fractional derivatives and fractional noise. Construction of renormalized stochastic field theory with fractional derivatives and fractional noise in the underly...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
How does a systematic time-dependence of the diffusion coefficient D(t) affect the ergodic and stati...
This book is devoted to a number of stochastic models that display scale invariance. It primarily fo...
Models describing evolution of physical, chemical, biological, social and financial processes are of...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
We discuss a family of random fields indexed by a parameter s ∈ R which we call the fractional Gauss...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
A fractional version of the heat equation, involving fractional powers of the negative Laplacian ope...
Fractal behavior and long-range dependence have been observed in an astonishing number of physical, ...
Impact of correlated noises on dynamical systems is investigated by considering Fokker-Planck type e...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
We discuss a family of random fields indexed by a parameter s ∈ Rwhich we call the fractional Gaussi...
AbstractFractal Gaussian models have been widely used to represent the singular behavior of phenomen...
We consider in this work stochastic differential equation (SDE) model for particles in contact with ...
International audienceThis book is organized around the notions of scaling phenomena and scale invar...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
How does a systematic time-dependence of the diffusion coefficient D(t) affect the ergodic and stati...
This book is devoted to a number of stochastic models that display scale invariance. It primarily fo...
Models describing evolution of physical, chemical, biological, social and financial processes are of...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
We discuss a family of random fields indexed by a parameter s ∈ R which we call the fractional Gauss...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
A fractional version of the heat equation, involving fractional powers of the negative Laplacian ope...
Fractal behavior and long-range dependence have been observed in an astonishing number of physical, ...
Impact of correlated noises on dynamical systems is investigated by considering Fokker-Planck type e...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
We discuss a family of random fields indexed by a parameter s ∈ Rwhich we call the fractional Gaussi...
AbstractFractal Gaussian models have been widely used to represent the singular behavior of phenomen...
We consider in this work stochastic differential equation (SDE) model for particles in contact with ...
International audienceThis book is organized around the notions of scaling phenomena and scale invar...
A new stochastic fractal model based on a fractional Laplace equation is developed. Exact representa...
How does a systematic time-dependence of the diffusion coefficient D(t) affect the ergodic and stati...
This book is devoted to a number of stochastic models that display scale invariance. It primarily fo...