Score contribution per author:
α: calibrated so average coauthorship-adjusted count equals average raw count
In the context of a dynamic model with incomplete information, we isolate a novel mechanism of shock propagation. We term the mechanism confounding dynamics because it arises from agents' optimal signal extraction efforts on variables whose dynamics—as opposed to super-imposed noise—prevents full revelation of information. Employing methods in the space of analytic functions, we are able to obtain analytical characterizations of the equilibria that generalize the celebrated Hansen-Sargent optimal prediction formula. Our main theorem establishes conditions under which confounding dynamics emerge in equilibrium in general settings. We apply our results to a canonical one-sector real business cycle model with dispersed information. In that setting, confounding dynamics is shown to amplify the propagation of a productivity shock, producing hump-shaped impulse response functions.