Chapter 9: Option Pricing Using Monte Carlo Methods
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Published:2020
Satya R. Chakravarty, Palash Sarkar, 2020. "Option Pricing Using Monte Carlo Methods", An Introduction to Algorithmic Finance, Algorithmic Trading and Blockchain, Satya R. Chakravarty, Palash Sarkar
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Monte Carlo simulation is a very general technique with wide applications. In this chapter, we briefly review the technique in the context of option pricing.
Recall that the Wiener process is a family (Wt)t≥0, where W0 = 0, Wt ∼ N(0, t) for all t ≥ 0, ΔWt = Wt+Δt − Wt on non-overlapping time intervals are independent, and Wt depend continuously on t. Here N(μ, σ2) denotes the normal distribution with mean μ and variance σ2. As a consequence of the definition, Wt − Ws ∼ N(0, t − s) and so E[Wt − Ws] = 0, Var(Wt − Ws) = t − s implying E[(ΔWt)2] = Δt. So, ΔW are independent and normally distributed with mean 0 and variance Δt.
