Optimal high-frequency trading with limit and market orders

We propose a framework for studying optimal market making policies in a limit order book (LOB). The bid-ask spread of the LOB is modelled by a Markov chain with finite values, multiple of the tick size, and subordinated by the Poisson process of the tick-time clock. We consider a small agent who continuously submits limit buy/sell orders and submits market orders at discrete dates. The objective of the market maker is to maximize her expected utility from revenue over a short term horizon by a tradeoff between limit and market orders, while controlling her inventory position. This is formulated as a mixed regime switching regular/ impulse control problem that we characterize in terms of quasi-variational system by dynamic programming methods. In the case of a mean-variance criterion with martingale reference price or when the asset price follows a Levy process and with exponential utility criterion, the dynamic programming system can be reduced to a system of simple equations involving only the inventory and spread variables. Calibration procedures are derived for estimating the transition matrix and intensity parameters for the spread and for Cox processes modelling the execution of limit orders. Several computational tests are performed both on simulated and real data, and illustrate the impact and profit when considering execution priority in limit orders and market orders

[1]  Peter C. Anselmo,et al.  A Market Microstructure Model of Ultra High Frequency Trading , 2011 .

[2]  G. Barles,et al.  Convergence of approximation schemes for fully nonlinear second order equations , 1991 .

[3]  Frédéric Abergel,et al.  Econophysics: Empirical facts and agent-based models , 2009, 0909.1974.

[4]  Joachim Grammig,et al.  Liquidity supply and adverse selection in a pure limit order book market , 2005 .

[5]  Olivier Guéant,et al.  Dealing with the Inventory Risk , 2011 .

[6]  Mason A. Porter,et al.  The Limit Order Book: A Survey , 2010 .

[7]  Luitgard A. M. Veraart,et al.  Optimal Market Making in the Foreign Exchange Market , 2010 .

[8]  Erhan Bayraktar,et al.  LIQUIDATION IN LIMIT ORDER BOOKS WITH CONTROLLED INTENSITY , 2011, ArXiv.

[9]  Rama Cont,et al.  A Stochastic Model for Order Book Dynamics , 2008, Oper. Res..

[10]  Charles M. Jones,et al.  Does Algorithmic Trading Improve Liquidity? , 2010 .

[11]  Huyen Pham,et al.  Continuous-time stochastic control and optimization with financial applications / Huyen Pham , 2009 .

[12]  F. Abergel,et al.  Econophysics review: I. Empirical facts , 2011 .

[13]  Ionuţ Florescu,et al.  A Study of Persistence of Price Movement Using High Frequency Financial Data , 2011 .

[14]  Y. Amihud,et al.  Dealership market: Market-making with inventory , 1980 .

[15]  Laurent Grillet-Aubert,et al.  Négociation d'actions : une revue de la littérature à l'usage des régulateurs de marché , 2010 .

[16]  Sebastian Jaimungal,et al.  Modelling Asset Prices for Algorithmic and High-Frequency Trading , 2010 .

[17]  Sasha Stoikov,et al.  Option market making under inventory risk , 2008 .

[18]  Huyên Pham,et al.  Optimal Portfolio Liquidation with Execution Cost and Risk , 2009, SIAM J. Financial Math..

[19]  Christoph Kühn,et al.  Optimal portfolios of a small investor in a limit order market: a shadow price approach , 2010 .

[20]  Luitgard A. M. Veraart,et al.  Optimal investment in the foreign exchange market with proportional transaction costs , 2011 .

[21]  B. Øksendal,et al.  Applied Stochastic Control of Jump Diffusions , 2004, Universitext.

[22]  P. Lions,et al.  User’s guide to viscosity solutions of second order partial differential equations , 1992, math/9207212.

[23]  A. Menkveld High frequency trading and the new market makers , 2013 .

[24]  Rama Cont,et al.  Price Dynamics in a Markovian Limit Order Market , 2011, SIAM J. Financial Math..

[25]  M. Avellaneda,et al.  High-frequency trading in a limit order book , 2008 .