For a $\nabla$-module M over the ring $K[[x]}_0$ of bounded functions over a p-adic local field K we define the notion of special and generic log-growth filtrations oil the base of the power series development of the solutions and horizontal sections. Moreover, if M also admits a Frobenius structure then it is endowed with generic and special Frobenius slope filtrations. We will show that in the case of M a $\phi-\nabla$-module of rank 2, the Frobenius polygon for M and the log-growth polygon for its dual, $M^\star$, coincide, this is proved by showing explicit relationships between the filtrations. This will lead us to formulate some conjectural links between the behaviours of the filtrations arising from the log-growth and Frobenius structures of the differential module. This coincidence between the two polygons was only known for the hypergeometric cases by Dwork.

Logarithmic growth and Frobenius filtrations for solutions of p-adic differential equations

CHIARELLOTTO, BRUNO;
2009

Abstract

For a $\nabla$-module M over the ring $K[[x]}_0$ of bounded functions over a p-adic local field K we define the notion of special and generic log-growth filtrations oil the base of the power series development of the solutions and horizontal sections. Moreover, if M also admits a Frobenius structure then it is endowed with generic and special Frobenius slope filtrations. We will show that in the case of M a $\phi-\nabla$-module of rank 2, the Frobenius polygon for M and the log-growth polygon for its dual, $M^\star$, coincide, this is proved by showing explicit relationships between the filtrations. This will lead us to formulate some conjectural links between the behaviours of the filtrations arising from the log-growth and Frobenius structures of the differential module. This coincidence between the two polygons was only known for the hypergeometric cases by Dwork.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11577/2376691
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