Logarithmic growth filtrations for $(\varphi ,\nabla )$-modules over the bounded Robba ring

In the 1970s, Dwork defined the logarithmic growth (log-growth for short) filtrations for $p$-adic differential equations $Dx=0$ on the $p$-adic open unit disc $|t|<1$, which measure the asymptotic behavior of solutions $x$ as $|t|\to 1^{-}$. Then, Dwork calculated the log-growth filtration for $p$-adic Gaussian hypergeometric differential equation. In the late 2000s, Chiarellotto and Tsuzuki proposed a fundamental conjecture on the log-growth filtrations for $(\varphi ,\nabla )$-modules over $K[\![t]\!]_0$, which can be regarded as a generalization of Dwork's calculation. In this paper, we prove a generalization of the conjecture to $(\varphi ,\nabla )$-modules over the bounded Robba ring. As an application, we prove a generalization of Dwork's conjecture proposed by Chiarellotto and Tsuzuki on the specialization property for log-growth Newton polygons.

[1]  N. Tsuzuki Slope filtration of quasi-unipotent overconvergent F-isocrystals , 1998 .

[2]  Y. Andre Dwork’s conjecture on the logarithmic growth of solutions of p-adic differential equations , 2008, Compositio Mathematica.

[3]  Bernard Dwork,et al.  Lectures on p-adic Differential Equations , 1982 .

[4]  A. Robert,et al.  A Course in p-adic Analysis , 2000 .

[5]  Ruochuan Liu Slope filtrations in families , 2008, Journal of the Institute of Mathematics of Jussieu.

[6]  Takahiro Nakagawa The logarithmic growth of element of Robba ring which satisfies Frobenius equation over bounded Robba ring , 2013 .

[7]  David R. Morrison Picard-Fuchs equations and mirror maps for hypersurfaces , 1991 .

[8]  Richard Taylor,et al.  A family of Calabi-Yau varieties and potential automorphy , 2010 .

[9]  K. Kedlaya Semistable reduction for overconvergent F-isocrystals, IV: local semistable reduction at nonmonomial valuations , 2006, Compositio Mathematica.

[10]  B. Chiarellotto,et al.  Log-growth filtration and Frobenius slope filtration of $F$-isocrystals at the generic and special points , 2011, Documenta Mathematica.

[11]  Slope filtrations revisited. , 2005, math/0504204.

[12]  Shun Ohkubo A Note on Logarithmic Growth Newton Polygons of p-Adic Differential Equations , 2013, 1312.7789.

[13]  B. Dwork On P-Adic Differential Equations. III. On P-Adically Bounded Solutions of Ordinary Linear Differential Equations with Rational Function Coefficients. , 1973 .

[14]  Richard Crew Finiteness theorems for the cohomology of an overconvergent isocrystal on a curve , 1998 .

[15]  B. Dwork On p-Adic Differential Equations II: The p-Adic Asymptotic Behavior of Solutions of Ordinary Linear Differential Equations with Rational Function Coefficients , 1973 .

[16]  P. Robba On the Index of p-adic Differential Operators I , 1975 .

[17]  A. J. Jong Homomorphisms of Barsotti-Tate groups and crystals in positive characteristic , 1998 .

[18]  Slope filtrations for relative Frobenius , 2006, math/0609272.

[19]  V. Drinfeld,et al.  Slopes of indecomposable F-isocrystals , 2016, 1604.00660.

[20]  Shun Ohkubo On the rationality and continuity of logarithmic growth filtration of solutions of p-adic differential equations , 2015, 1502.03804.

[21]  LOCAL MONODROMY OF p-ADIC DIFFERENTIAL EQUATIONS: AN OVERVIEW , 2005, math/0501361.

[22]  A p-adic local monodromy theorem , 2001, math/0110124.

[23]  B. Chiarellotto,et al.  Logarithmic growth and Frobenius filtrations for solutions of p-adic differential equations , 2009, Journal of the Institute of Mathematics of Jussieu.

[24]  K. Kedlaya p-adic Differential Equations , 2010 .

[25]  B. Dwork Bessel functions as $p$-adic functions of the argument , 1974 .