2022
DOI: 10.1111/fire.12295
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Empirical Ross recovery without discretization

Abstract: We propose a new continuous-state method for empirically recovering the key objects in the Ross recovery theory which avoids discretization. The new method is based on a key bivariate orthogonal Hermite representation of the state price transition kernel, which leads to an elegant correspondence of the eigenvalue-eigenfunction system of the transition kernel and the eigenvalue-eigenvector system of the expansion coefficient matrix. Using S&P 500 index option prices, we demonstrate how our method can generate w… Show more

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