The weak convergence order of two Euler-type discretization schemes for the log-Heston model

Abstract

We study the weak convergence order of two Euler-type discretizations of the log-Heston Model where we use symmetrization and absorption, respectively, to prevent the discretization of the underlying CIR process from becoming negative. If the Feller index of the CIR process satisfies >1, we establish weak convergence order one, while for ≤ 1, we obtain weak convergence order -ε for ε>0 arbitrarily small. We illustrate our theoretical findings by several numerical examples.

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