L. C. G. Rogers scite author profile

This celebrated book has been prepared with readers' needs in mind, remaining a systematic treatment of the subject whilst retaining its vitality. The second volume follows on from the first, concentrating on stochastic integrals, stochastic differential equations, excursion theory and the general theory of processes. Much effort has gone into making these subjects as accessible as possible by providing many concrete examples that illustrate techniques of calculation, and by treating all topics from the ground up, starting from simple cases. Many of the examples and proofs are new; some important calculational techniques appeared for the first time in this book. Together with its companion volume, this book helps equip graduate students for research into a subject of great intrinsic interest and wide application in physics, biology, engineering, finance and computer science.

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Monte Carlo valuation of American options

Rogers

2002

Mathematical Finance

453

317

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This paper introduces a "dual" way to price American options, based on simulating the paths of the option payoff, and of a judiciously chosen Lagrangian martingale. Taking the pathwise maximum of the payoff less the martingale provides an upper bound for the price of the option, and this bound is sharp for the optimal choice of Lagrangian martingale. As a first exploration of this method, four examples are investigated numerically; the accuracy achieved with even very simple choices of Lagrangian martingale is surprising. The method also leads naturally to candidate hedging policies for the option, and estimates of the risk involved in using them. Copyright 2002 Blackwell Publishing, Inc..

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Estimating Variance From High, Low and Closing Prices

Rogers¹,

Satchell²

1991

Ann. Appl. Probab.

463

308

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Arbitrage with Fractional Brownian Motion

Rogers¹

1997

Mathematical Finance

479

256

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Fractional Brownian motion has been suggested as a model for the movement of log share prices which would allow long-range dependence between returns on different days. While this is true, it also allows arbitrage opportunities, which we demonstrate both indirectly and by constructing such an arbitrage. Nonetheless, it is possible by looking at a process similar to the fractional Brownian motion to model long-range dependence of returns while avoiding arbitrage.

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The value of an Asian option

Rogers

Shi

1995

Journal of Applied Probability

426

245

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L. C. G. Rogers

Diffusions, Markov Processes and Martingales

Monte Carlo valuation of American options

Estimating Variance From High, Low and Closing Prices

Arbitrage with Fractional Brownian Motion

The value of an Asian option

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