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01-11-2015 | Research Article

Robustness of equilibrium in the Kyle model of informed speculation

Authors: Alex Boulatov, Dan Bernhardt

Published in: Annals of Finance | Issue 3-4/2015

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Abstract

We analyze a static Kyle (Continuous auctions and insider trading. Princeton University, Princeton, 1983) model in which a risk-neutral informed trader can use arbitrary (linear or non-linear) deterministic strategies, and a finite number of market makers can use arbitrary pricing rules. We establish a strong sense in which the linear Kyle equilibrium is robust: the first variation in any agent’s expected payoff with respect to a small variation in his conjecture about the strategies of others vanishes at equilibrium. Thus, small errors in a market maker’s beliefs about the informed speculator’s trading strategy do not reduce his expected payoffs. Therefore, the original equilibrium strategies remain optimal and still constitute an equilibrium (neglecting the higher-order terms). We also establish that if a non-linear equilibrium exists, then it is not robust.

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Boulatov et al. (2013) prove uniqueness of equilibrium for the Kyle (1985) model.

We will show that $Y(\cdot )$ is monotonic and therefore invertible.

Although our reaction-function notation emphasizes the choice of the function $X\left( \cdot \right) $, the condition (29) leads to a definition of Nash equilibrium logically equivalent to that in Kyle (1983, 1985). The two definitions are equivalent since the informed trader’s optimization problem decomposes into separate state-by-state optimization problems for each realization of v.

This follows from the following representation of the Dirac’s delta function, $\delta \left( \cdot \right) $:

$$\begin{aligned} \lim _{J\rightarrow \infty }\ \left( J-1\right) Y^{J-1}\left( Y+z\right) ^{-J}=\delta \left( z\right) . \end{aligned}$$

Since the standard notion of a differential is a particular case of the functional one, we sometimes use short hand notation, by analogy with the standard notation of the full derivative $\Delta _{X}F\left( x;X\left( \cdot \right) ,\delta X\left( \cdot \right) \right) =\delta _{X}F\left( x;X\left( \cdot \right) ,\delta X\left( \cdot \right) \right) $, having in mind that scalar arguments x may also be functionals of the conjectures $X\left( \cdot \right) $.

Barelli, P.: Consistency of beliefs and epistemic conditions for Nash and correlated equilibria. Games Econ Behav 67(2), 363–375 (2009)CrossRef

Boulatov, A., Kyle, A.S., Livdan, D.: Uniqueness of Equilibrium in Static Kyle (1985) Model, Mimeo. Berkeley: UC Berkeley (2013)

Kolmogorov, A.N., Fomin, S.V.: Elements of the Theory of Functions and Functional Analysis. New York: Dover (1999)

Kyle, A.S.: Continuous Auctions and Insider Trading, Mimeo. Princeton: Princeton University (1983)

Kyle, A.S.: Continuous auctions and insider trading. Econometrica 53, 1315–1335 (1985)CrossRef

Stauber, R.: Belief Types and Equilibria for Cautious Players. In: Working paper, The Australian National University (2006)

Stauber, R.: Knightian games and robustness to ambiguity. J Econ Theory 146(1), 248–274 (2011)CrossRef

Weisstein, E.W. Hermite Polynomial. From MathWorld—A Wolfram Web Resource. http://mathworld.wolfram.com/HermitePolynomial.html

Title: Robustness of equilibrium in the Kyle model of informed speculation
Authors: Alex Boulatov
Dan Bernhardt
Publication date: 01-11-2015
Publisher: Springer Berlin Heidelberg
Published in: Annals of Finance / Issue 3-4/2015
Print ISSN: 1614-2446
Electronic ISSN: 1614-2454
DOI: https://doi.org/10.1007/s10436-015-0264-2

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