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Large and moderate deviation for rough slow-fast system with level 3 geometric rough path

Published 23 Sep 2025 in math.PR | (2509.18675v1)

Abstract: This work is to give the large deviation for a slow-fast system with level 3 random geometric rough path. Different from that driver rough path is of level 2, now the driver path comes from an anisotropic rough path that is lifted from the mixed fractional Brownian motion with Hurst parameter in $(1/4,1/3)$. Unlike the situation of level 2, it requires showing that the translation of mixed FBM in the direction of Cameron-Martin space can still be lifted to a geometric rough path. Firstly, we give the large deviation for the single-time scale system with level 3 random geometric rough path. We still utilize the variational representation and weak convergence method. However, the existence of third-level rough paths still makes the weak convergence analysis more complicated, where more elaborate controlled rough path calculations are needed. Besides, we also give the moderate deviation within more necessary assumptions. Different from large deviation, some boundedness result of the deviation component is required. Then, we extend the large deviation for the slow-fast system with level 3 random geometric rough path. To this end, we show that the controlled slow component weakly converges to the solution to the skeleton equation by averaging to the invariant measure of the fast equation and exploiting the continuity of the solution mapping. Here, the solution to the skeleton equation still could be well-defined in the Young sense within a variational setting.

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