AbstractSingular exponential nonlinearities of the form $$e^{h(x)\epsilon ^{-1}}$$
e
h
(
x
)
ϵ
-
1
with $$\epsilon >0$$
ϵ
>
0
small occur in many different applications. These terms have essential singularities for $$\epsilon =0$$
ϵ
=
0
leading to very different behaviour depending on the sign of h. In this paper, we consider two prototypical singularly perturbed oscillators with such exponential nonlinearities. We apply a suitable normalization for both systems such that the $$\epsilon \rightarrow 0$$
ϵ
→
0
limit is a piecewise smooth system. The convergence to this nonsmooth system is exponential due to the nonlinearities we study. By working on the two model systems we use a blow-up approach to demonstrate that this exponential convergence can be harmless in some cases while in other scenarios it can lead to further degeneracies. For our second model system, we deal with such degeneracies due to exponentially small terms by extending the space dimension, following the approach in Kristiansen (Nonlinearity 30(5): 2138–2184, 2017), and prove—for both systems—existence of (unique) limit cycles by perturbing away from singular cycles having desirable hyperbolicity properties.
A fast sparse spectral method for nonlinear integro-differential Volterra equations with general kernels
