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Frobenius modules are difference modules with respect to a Frobenius operator. Here we show that over non-archimedean complete differential fields Frobenius modules define differential modules with the same Picard-Vessiot ring and the same Galois group schemes up to extension by constants. Moreover, these Frobenius modules are classified by unramified Galois representations over the base field. This leads among others to the solution of the inverse differential Galois problem for $p$ -adic differential...

From a polynomial Riemann hypothesis to alternating sign matrices.

Eğecioğlu, Ömer, Redmond, Timothy, Ryavec, Charles (2001)

The Electronic Journal of Combinatorics [electronic only]

From p-rigid elements to valuations (with a Galois-characterization of p-adic fields).

Jochen Koenigsmann (1995)

Journal für die reine und angewandte Mathematik

Frontières analytiques dans le disque unité d'un corps valué non archimédien complet et algébriquement clos

Yvette Amice (1968/1969)

Séminaire Delange-Pisot-Poitou. Théorie des nombres

Function Fileds of Pfister Forms.

T.Y. Lam, R. Elman, A.R. Wadsworth (1979)

Inventiones mathematicae

Functional equations stemming from numerical analysis [Book]

Tomasz Szostok (2015)

Functions without residue and a bilinear differential equation

Eduard Wirsing (1993)

Acta Arithmetica

Functoriality and the Inverse Galois problem II: groups of type $B_{n}$ and $G_{2}$

Chandrashekhar Khare, Michael Larsen, Gordan Savin (2010)

Annales de la faculté des sciences de Toulouse Mathématiques

This paper contains an application of Langlands’ functoriality principle to the following classical problem: which finite groups, in particular which simple groups appear as Galois groups over $ℚ$ ? Let $ℓ$ be a prime and $t$ a positive integer. We show that that the finite simple groups of Lie type $B_{n} (ℓ^{k}) = 3 D S O_{2 n + 1} {(𝔽_{ℓ^{k}})}^{d e r}$ if $ℓ \equiv 3, 5 (mod 8)$ and $G_{2} (ℓ^{k})$ appear as Galois groups over $ℚ$ , for some $k$ divisible by $t$ . In particular, for each of the two Lie types and fixed $ℓ$ we construct infinitely many Galois groups but we do not have a precise control...

Fundamental theorems of analysis in formally real fields.

Ilić Stepić, Angelina, Mijajlović, Žarko (2008)

Novi Sad Journal of Mathematics

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