Abstract
We were able to predict stable entrainments for an open-loop neural circuit in which an endogenously rhythmic neuron is driven by two periodic inputs separated by a fixed delay, using linear stability analysis about an assumed entrainment as well as a local linearization of the measured phase resetting curve. An example using Morris Lecar oscillators found multistable entrainments for a fixed delay. A fixed delay could be applicable to interneurons that exhibit post-inhibitory rebound bursting. This research is part of an effort to extend the applicability of our previously developed methods to analyze circuits that underlie central pattern generation.
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