Marginal density expansions for diffusions and stochastic volatility, part I: Theoretical Foundations
Abstract: Density expansions for hypoelliptic diffusions $(X1,...,Xd)$ are revisited. In particular, we are interested in density expansions of the projection $(X_T1,...,X_Tl)$, at time $T>0$, with $l \leq d$. Global conditions are found which replace the well-known "not-in-cutlocus" condition known from heat-kernel asymptotics. Our small noise expansion allows for a "second order" exponential factor. As application, new light is shed on the Takanobu--Watanabe expansion of Brownian motion and Levy's stochastic area. Further applications include tail and implied volatility asymptotics in some stochastic volatility models, discussed in a compagnion paper.
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