in short intervals
For any sufficiently large real number , the interval contains at least one integer having at most two prime factors .
-adic Abelian Stark conjectures at
A -adic version of Stark’s Conjecture at is attributed to J.-P. Serre and stated (faultily) in Tate’s book on the Conjecture. Building instead on our previous paper (and work of Rubin) on the complex abelian case, we give a new approach to such a conjecture for real ray-class extensions of totally real number fields. We study the coherence of our -adic conjecture and then formulate some integral refinements, both alone and in combination with its complex analogue. A ‘Weak Combined Refined’ version...
-adic analysis and Bell numbers of two variables. (Analyse -adique et nombres de Bell à deux variables.)
-adic analytic spaces.
-adic chaos and random number generation.
-adic Clifford algebras
-adic Differential Operators on Automorphic Forms on Unitary Groups
The goal of this paper is to study certain -adic differential operators on automorphic forms on . These operators are a generalization to the higher-dimensional, vector-valued situation of the -adic differential operators constructed for Hilbert modular forms by N. Katz. They are a generalization to the -adic case of the -differential operators first studied by H. Maass and later studied extensively by M. Harris and G. Shimura. The operators should be useful in the construction of certain -adic...
-adic dynamical systems and formal groups
-adic estimates for exponential sums and the theorem of Chevalley-Warning
-adic Fourier theory.
-adic heights for semi-stable abelian varieties
-adic interpolation of convolutions of Hilbert modular forms
In this paper we construct -adic measures related to the values of convolutions of Hilbert modular forms of integral and half-integral weight at the negative critical points under the assumption that the underlying totally real number field has class number . This extends the result of Panchishkin [Lecture Notes in Math., 1471, Springer Verlag, 1991 ] who treated the case that both modular forms are of integral weight. In order to define the measures, we need to introduce the twist operator...
-adic interpolation of logarithmic derivatives associated to certain Lubin-Tate formal groups
The purpose of this paper is to generalize, to certain commutative formal groups of dimension one and height greater than one defined over the ring of integers of a finite extension of , some results on -adic interpolation developed by Kubota, Leopoldt, Iwasawa, Mazur, Katz and others notably for the multiplicative group , and which they used to construct -adic -functions.
-adic interpolation of special values of Hecke L-functions
-adic -functions attached to characters of -power order
-adic -functions for elliptic curves with complex multiplication I
-adic -functions for modular forms
-adic -functions for unitary Shimura varieties. I: Construction of the Eisenstein measure.
-adic -functions of Hilbert modular forms
We construct -adic -functions (in general case unbounded) attached to “motivic" primitive Hilbert cusp forms as a non-archimedean Mellin transform of the corresponding admissible measure. In order to prove the growth conditions of the appropriate complex-valued distributions we represent them as Rankin type representation and use Atkin–Lehner theory and explicit form of Fourier coefficients of Eisenstein series.
-adic measures attached to Siegel modular forms
We study the critical values of the complex standard--function attached to a holomorphic Siegel modular form and of the twists of the -function by Dirichlet characters. Our main object is for a fixed rational prime number to interpolate -adically the essentially algebraic critical -values as the Dirichlet character varies thus providing a systematic control of denominators of critical values by generalized Kummer congruences. In order to organize this information we prove the existence of...