We study the multiplicity of periodic solutions of nonautonomous delay differential equations which are asymptotically linear both at zero and at infinity.

In this paper, we consider a nonautonomous high-order delay differential equation with [Formula: see text] lags. The [Formula: see text]-periodic orbits are ...

In this paper, we consider a nonautonomous high-order delay differential equation with 2r − 1 lags. The 4r-periodic orbits are obtained by using the ...

Nov 19, 2013 · The existence of the nontrivial periodic solutions for nonautonomous second-order delay differential equation is investigated, where , , .

The existence of the nontrivial periodic solutions for nonautonomous second-order delay differential equation is investigated, where λ>π2/τ2, τ>0, ...

We study the multiplicity of periodic solutions of nonautonomous delay differential equations which are asymptotically linear both at zero and at infinity.

We study the multiplicity of periodic solutions of nonautonomous delay differential equations which are asymptotically linear both at zero and at infinity.

In this paper, we provide some sufficient conditions for the existence, uniqueness and asymptotic stability of time ω -periodic mild solutions for a class ...

Li, J, He, X: Multiple periodic solutions of differential delay equations created by asymptotically linear Hamiltonian systems. Nonlinear Anal. 31(1/2), 45 ...

A technique is presented for determining when periodic solutions to nonautonomous periodic difference equations exist. Under certain constraints, stable ...