We study here a heat-type differential equation of order n greater than two, in the case where the time-derivative is supposed to be fractional. The corresponding solution can be described as the transition function of a pseudoprocess $\Psi_{n}$ (coinciding with the one governed by the standard, non-fractional, equation) with a time argument $T_{\alpha}$ which is itself random. The distribution of $T_{\alpha}$ is presented together with some features of the solution (such as analytic expressions for its moments)
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
In this paper, we study diffusion equations involving Hadamard-type time-fractional derivatives rela...
Let (X(t))t≥0 be the pseudo-process driven by the high-order heat-type equation ∂u = ± ∂Nu , ∂t ∂xN ...
In this article, we construct pseudo random walks (symmetric and asymmetric) that converge in law to...
We analyze here different types of fractional differential equations, under the assumption that thei...
25 pagesInternational audienceLet $(X(t))_{t \ge 0}$ be the pseudo-process driven by the high-order ...
In this paper we study pseudo-processes related to odd-order heat-type equations composed with L\'ev...
The book systematically presents the theories of pseudo-differential operators with symbols singular...
We propose a probabilistic construction for the solution of a general class of fractional high-order...
Publisher\u27s description: The book systematically presents the theories of pseudo-differential ope...
Abstract. Pseudoprocesses, constructed by means of the solutions of higher-order heat-type equations...
International audienceFix an integer n>2 and let $(X(t))_{t\ge 0}$ be the pseudo-process driven by t...
A complex fractional derivative can be derived by formally extending the integer k in the kth deriva...
AbstractConsider the high-order heat-type equation ∂u/∂t=(−1)1+N/2∂Nu/∂xN for an even integer N>2, a...
In this paper the solutions u(nu) = u(nu) (x, t) to fractional diffusion equations of order 0 = 1, w...
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
In this paper, we study diffusion equations involving Hadamard-type time-fractional derivatives rela...
Let (X(t))t≥0 be the pseudo-process driven by the high-order heat-type equation ∂u = ± ∂Nu , ∂t ∂xN ...
In this article, we construct pseudo random walks (symmetric and asymmetric) that converge in law to...
We analyze here different types of fractional differential equations, under the assumption that thei...
25 pagesInternational audienceLet $(X(t))_{t \ge 0}$ be the pseudo-process driven by the high-order ...
In this paper we study pseudo-processes related to odd-order heat-type equations composed with L\'ev...
The book systematically presents the theories of pseudo-differential operators with symbols singular...
We propose a probabilistic construction for the solution of a general class of fractional high-order...
Publisher\u27s description: The book systematically presents the theories of pseudo-differential ope...
Abstract. Pseudoprocesses, constructed by means of the solutions of higher-order heat-type equations...
International audienceFix an integer n>2 and let $(X(t))_{t\ge 0}$ be the pseudo-process driven by t...
A complex fractional derivative can be derived by formally extending the integer k in the kth deriva...
AbstractConsider the high-order heat-type equation ∂u/∂t=(−1)1+N/2∂Nu/∂xN for an even integer N>2, a...
In this paper the solutions u(nu) = u(nu) (x, t) to fractional diffusion equations of order 0 = 1, w...
The generalized diffusion equations with fractional order derivatives have shown be quite efficient ...
In this paper, we study diffusion equations involving Hadamard-type time-fractional derivatives rela...
Let (X(t))t≥0 be the pseudo-process driven by the high-order heat-type equation ∂u = ± ∂Nu , ∂t ∂xN ...