The fundamental theorem of asset pricing under proportional transaction costs

TL;DR

This paper extends the fundamental theorem of asset pricing to models with proportional transaction costs and different interest rates, establishing conditions for no arbitrage via an embedded friction-free model.

Contribution

It introduces a characterization of arbitrage-free models with transaction costs through an embedded friction-free model with a martingale property.

Findings

Arbitrage-free models can be represented by an embedded friction-free model.

Existence of a martingale measure corresponds to no arbitrage.

The proof combines finite-dimensional separation theorems with duality in linear optimization.

Abstract

We extend the fundamental theorem of asset pricing to a model where the risky stock is subject to proportional transaction costs in the form of bid-ask spreads and the bank account has different interest rates for borrowing and lending. We show that such a model is free of arbitrage if and only if one can embed in it a friction-free model that is itself free of arbitrage, in the sense that there exists an artificial friction-free price for the stock between its bid and ask prices and an artificial interest rate between the borrowing and lending interest rates such that, if one discounts this stock price by this interest rate, then the resulting process is a martingale under some non-degenerate probability measure. Restricting ourselves to the simple case of a finite number of time steps and a finite number of possible outcomes for the stock price, the proof follows by combining classical arguments based on finite-dimensional separation theorems with duality results from linear optimisation.