On some fractional evolution equations

## a b s t r a c t We consider the Cauchy problem for an abstract stochastic delay differential equation driven by fractional Brownian motion with the Hurst parameter H > 1 2 . We prove the existence and uniqueness for this problem, when the coefficients have enough regularity, the diffusion coeffi

In this paper, some nonhomogeneous fractional differential equations which have constant coefficients are treated by means of \(\mathrm{N}\)-fractional calculus.

In this paper, the nonlocal Cauchy problem is discussed for the fractional evolution equations in an arbitrary Banach space and various criteria on the existence and uniqueness of mild solutions are obtained. An example to illustrate the applications of main results is also given.

A system of fractional evolution equations results from employing the tool of the Fractional Calculus and following the method used by Dirac to obtain his well-known equation from Klein-Gordon's one. It represents a possible interpolation between Dirac and diffusion and wave equations in one space d