z-logo
open-access-imgOpen Access
Identification in auctions with selective entry
Author(s) -
Matthew Gentry,
Tong Li
Publication year - 2012
Language(s) - English
Resource type - Reports
DOI - 10.1920/wp.cem.2012.3812
Subject(s) - identification (biology) , common value auction , business , computer science , biology , economics , microeconomics , botany
This paper considers nonparametric identification of a two-stage entry and bidding model for auctions which we call the Affiliated-Signal (AS) model. This model assumes that potential bidders have private values, observe imperfect signals of their true values prior to entry, and choose whether to undertake a costly entry process. The AS model is a theoretically appealing candidate for the structural analysis of auctions with entry: it accommodates a wide range of entry processes, in particular nesting the Levin and Smith (1994) and Samuelson (1985) models as special cases. To date, however, the model's identification properties have not been well understood. We establish identification results for the general AS model, using variation in factors affecting entry behavior (such as potential competition or entry costs) to construct identified bounds on model fundamentals. If available entry variation is continuous, the AS model may be point identified; otherwise, it will be partially identified. We derive constructive identification results in both cases, which can readily be refined to produce the sharp identified set. We also consider policy analysis in environments where only partial identification is possible, and derive identified bounds on expected seller revenue corresponding to a wide range of counterfactual policies while accounting for endogenous and arbitrarily selective entry. Finally, we establish that our core results extend to environments with asymmetric bidders and nonseperable auction-level unobserved heterogeneity

The content you want is available to Zendy users.

Already have an account? Click here to sign in.
Having issues? You can contact us here