Functionally perturbed stochastic differential equations

Interest in singularly perturbed delay and functional differential equations stems from both the analytical mathematics that emerges and from realistic applications where both delays and perturbations play a role. The discussion in the next section examines possible appearances of singular perturbat

## Abstract We give constructive proof of the existence of vanishing at infinity oscillatory solutions for a second‐order perturbed nonlinear differential equation. In contrast to most results reported in the literature, we do not require oscillatory character of the associated unperturbed equation

## Abstract Stochastic differential equations in ℝ^__n__^ with random coefficients are considered where one continuous driving process admits a generalized quadratic variation process. The latter and the other driving processes are assumed to possess sample paths in the fractional Sobolev space __W