We show that unstable attractors do not exist for smooth invertible dynamics. In systems lacking these properties, we draw simple conclusions about their stability indices and look at examples highlighting extreme cases of stability and attractiveness - characterized in terms of stability indices. In particular, we investigate the possibilities for great discrepancies between the local and non-local indices and σ(x), also depending on properties of the system. We show that while holds for all unstable attractors, it is not straightforward to uniquely identify them using stability indices.
We show that unstable attractors do not exist for smooth invertible dynamics. In systems lacking these properties, we draw simple conclusions about their stability indices and look at examples highlighting extreme cases of stability and attractiveness – characterized in terms of stability indices. In particular, we investigate the possibilities for great discrepancies between the local and non-local indices σloc(x) and σ(x), also depending on properties of the system. We show that while σloc(x) = -∞ holds for all unstable attractors, it is not straightforward to uniquely identify them using stability indices.