Add to ORKGFor differential operators of Calabi-Yau type, Candelas, de la Ossa and van Straten conjecture the appearance of $p$-adic zeta values in the matrix entries of their $p$-adic Frobenius structure expressed in the standard basis of solutions near a MUM-point. We prove that this phenomenon holds for simplicial and hyperoctahedral families of Calabi-Yau hypersurfaces in $n$ dimensions, in which case the Frobenius matrix entries are rational linear combinations of products of $\zeta_p(k)$ with $1 < k < n$
Cette thèse se situe à la interface entre la théorie de nombres et la théorie des équations différen...
International audienceWe define the $p^m$-curvature map on the sheaf of differential operators of le...
We study the relationship between recent conjectures on slopes of overconvergent p ‐adic modular for...
Sei $\pi:X\rightarrow S$ eine \"uber $\Z$ definierte Familie von Calabi-Yau Varietaten der Dim...
We show the residue formula of the Frobenius intertwiners on hypergeometric differential equations, ...
Frobenius structures are omnipresent in arithmetic geometry. In this note we show that over suitabl...
Moment zeta functions provide a diophantineformulation for the distribution of rational points on af...
In this article we review the observation, due originally to Dwork, that the zeta-function of an ari...
We study the spectrum of the operator D∗D, where the operator D, introduced in Klimek et al. [e-prin...
In this survey, we explain Shimura's theory in [Shi90] on the differential operators and the Lie alg...
In this article we give an example of a matrix version of the famous congruence for hypergeometric f...
We study the relationship between recent conjectures on slopes of overconvergent -adic modular forms...
This thesis is at the interface between the theory of numbers and the theory of differential equatio...
AbstractLet X be the projective line minus 0,1, and ∞ over Qp. The aim of the following is to give a...
Abstract. We set up the basic theory of P-adic modular forms over certain unitary PEL Shimura curves...
Cette thèse se situe à la interface entre la théorie de nombres et la théorie des équations différen...
International audienceWe define the $p^m$-curvature map on the sheaf of differential operators of le...
We study the relationship between recent conjectures on slopes of overconvergent p ‐adic modular for...
Sei $\pi:X\rightarrow S$ eine \"uber $\Z$ definierte Familie von Calabi-Yau Varietaten der Dim...
We show the residue formula of the Frobenius intertwiners on hypergeometric differential equations, ...
Frobenius structures are omnipresent in arithmetic geometry. In this note we show that over suitabl...
Moment zeta functions provide a diophantineformulation for the distribution of rational points on af...
In this article we review the observation, due originally to Dwork, that the zeta-function of an ari...
We study the spectrum of the operator D∗D, where the operator D, introduced in Klimek et al. [e-prin...
In this survey, we explain Shimura's theory in [Shi90] on the differential operators and the Lie alg...
In this article we give an example of a matrix version of the famous congruence for hypergeometric f...
We study the relationship between recent conjectures on slopes of overconvergent -adic modular forms...
This thesis is at the interface between the theory of numbers and the theory of differential equatio...
AbstractLet X be the projective line minus 0,1, and ∞ over Qp. The aim of the following is to give a...
Abstract. We set up the basic theory of P-adic modular forms over certain unitary PEL Shimura curves...
Cette thèse se situe à la interface entre la théorie de nombres et la théorie des équations différen...
International audienceWe define the $p^m$-curvature map on the sheaf of differential operators of le...
We study the relationship between recent conjectures on slopes of overconvergent p ‐adic modular for...