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Time is Money: The Equilibrium Trading Horizon and Optimal Arrival Price

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  • Kevin Patrick Darby

Abstract

Executing even moderately large derivatives orders can be expensive and risky; it's hard to balance the uncertainty of working an order over time versus paying a liquidity premium for immediate execution. Here, we introduce the Time Is Money model, which calculates the Equilibrium Trading Horizon over which to execute an order within the adversarial forces of variance risk and liquidity premium. We construct a hypothetical at-the-money option within Arithmetic Brownian Motion and invert the Bachelier model to compute an inflection point between implied variance and liquidity cost as governed by a central limit order book, each in real time as they evolve. As a result, we demonstrate a novel, continuous-time Arrival Price framework. Further, we argue that traders should be indifferent to choosing between variance risk and liquidity cost, unless they have a predetermined bias or an exogenous position with a convex payoff. We, therefore, introduce half-life factor asymptotics to the model based on a convexity factor and compare results to existing models. We also describe a specialization of the model for trading a basket of correlated instruments, as exemplified by a futures calendar spread. Finally, we establish groundwork for microstructure optimizations as well as explore short term drift and conditional expected slippage within the Equilibrium Horizon framework.

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  • Kevin Patrick Darby, 2021. "Time is Money: The Equilibrium Trading Horizon and Optimal Arrival Price," Papers 2104.05844, arXiv.org.
    • Handle: RePEc:arx:papers:2104.05844
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    References listed on IDEAS

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    1. David C. Shimko, 1994. "Options on futures spreads: Hedging, speculation, and valuation," Journal of Futures Markets, John Wiley & Sons, Ltd., vol. 14(2), pages 183-213, April.
    2. Schaefer, Matthew P., 2002. "Pricing And Hedging European Options On Futures Spreads Using The Bachelier Spread Option Model," 2002 Conference, April 22-23, 2002, St. Louis, Missouri 19055, NCR-134 Conference on Applied Commodity Price Analysis, Forecasting, and Market Risk Management.
    3. Jim Gatheral & Alexander Schied, 2011. "Optimal Trade Execution Under Geometric Brownian Motion In The Almgren And Chriss Framework," International Journal of Theoretical and Applied Finance (IJTAF), World Scientific Publishing Co. Pte. Ltd., vol. 14(03), pages 353-368.
    4. Cyril Grunspan, 2011. "A Note on the Equivalence between the Normal and the Lognormal Implied Volatility : A Model Free Approach," Papers 1112.1782, arXiv.org.
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