Integrating Market Makers, Limit Orders, and Continuous Trade in Prediction Markets

We provide the first concrete algorithm for combining market makers and limit orders in a prediction market with continuous trade. Our mechanism is general enough to handle both bundle orders and arbitrary securities defined over combinatorial outcome spaces. We define the notion of an e-fair trading path, a path in security space along which no order executes at a price more than e above its limit, and every order executes when its market price falls more than e below its limit. We show that, under a certain supermodularity condition, a fair trading path exists for which the endpoint is efficient, but that under general conditions reaching an efficient endpoint via an e-fair trading path is not possible. We develop an algorithm for operating a continuous market maker with limit orders that respects the e-fairness conditions in the general case. We conduct simulations of our algorithm using real combinatorial predictions made during the 2008 US presidential election and evaluate it against a natural baseline according to trading volume, social welfare, and violations of the two fairness conditions.

[1]  Jennifer Wortman Vaughan,et al.  Efficient Market Making via Convex Optimization, and a Connection to Online Learning , 2013, TEAC.

[2]  R. Hanson LOGARITHMIC MARKETS CORING RULES FOR MODULAR COMBINATORIAL INFORMATION AGGREGATION , 2012 .

[3]  Stephen P. Boyd,et al.  Convex Optimization , 2004, Algorithms and Theory of Computation Handbook.

[4]  H. Vincent Poor,et al.  Aggregating Large Sets of Probabilistic Forecasts by Weighted Coherent Adjustment , 2011, Decis. Anal..

[5]  Miroslav Dudík,et al.  A tractable combinatorial market maker using constraint generation , 2012, EC '12.

[6]  L. Shapley,et al.  Trade Using One Commodity as a Means of Payment , 1977, Journal of Political Economy.

[7]  Michael P. Wellman,et al.  Betting boolean-style: a framework for trading in securities based on logical formulas , 2003, EC '03.

[8]  Leslie R. Fine,et al.  Inducing liquidity in thin financial markets through combined-value trading mechanisms , 2002 .

[9]  Efe A. Ok Real analysis with economic applications , 2007 .

[10]  Thomas A. Rietz,et al.  Results from a Dozen Years of Election Futures Markets Research , 2008 .

[11]  Henry G. Berg,et al.  Hanson's Automated Market Maker , 2012 .

[12]  David M. Pennock,et al.  A Utility Framework for Bounded-Loss Market Makers , 2007, UAI.

[13]  N. Economides A Parimutuel Market Microstructure for Contingent Claims , 2001 .

[14]  Anthony Man-Cho So,et al.  A Convex Parimutuel Formulation for Contingent Claim Markets , 2006 .

[15]  Donald M. Topkis,et al.  Minimizing a Submodular Function on a Lattice , 1978, Oper. Res..

[16]  Leon Hirsch,et al.  Fundamentals Of Convex Analysis , 2016 .

[17]  Tuomas Sandholm,et al.  Liquidity-Sensitive Automated Market Makers via Homogeneous Risk Measures , 2011, WINE.

[18]  Zizhuo Wang,et al.  A Unified Framework for Dynamic Prediction Market Design , 2011, Oper. Res..

[19]  Zizhuo Wang,et al.  A unified framework for dynamic pari-mutuel information market design , 2009, EC '09.

[20]  Sanmay Das,et al.  Price Evolution in a Continuous Double Auction Prediction Market With a Scoring-Rule Based Market Maker , 2015, AAAI.

[21]  Robin Hanson,et al.  Combinatorial Information Market Design , 2003, Inf. Syst. Frontiers.

[22]  Alexander Schied,et al.  Convex measures of risk and trading constraints , 2002, Finance Stochastics.

[23]  David M. Pennock,et al.  The Extent of Price Misalignment in Prediction Markets , 2014, Algorithmic Finance.

[24]  L. Harris Trading and Exchanges: Market Microstructure for Practitioners , 2002 .