Dwork conjecture
WebDWORK'S CONJECTURE THEOREM 1.1. For every integer k, the kth unit root zeta function L(Unk, T) is p-adic meromorphic. The general tool for p-adic meromorphic continuation of L-functions is to use Dwork's trace formula. It expresses the unit root zeta function as an alter-nating product of the Fredholm determinants of several continuous … WebApr 1, 2024 · In this paper, we answer a question due to Y. André related to B. Dwork's conjecture on a specialization of the logarithmic growth of solutions of p-adic linear differential equations. Precisely ...
Dwork conjecture
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WebDwork in 1960. All the conjectures except Weil's Riemann hypothesis follow in a 'formal' way from the existence of a suitable theory of homology groups so that the Lefschetz for mula can be applied. One such theory was Grothendieck's etale theory developed by him in collaboration .with MArtin and others. WebWhether or not I succeeded in doing so - or producing anything novel in the process - I cannot say for sure (probably not), but if it'd be helpful here is a copy: On a Theorem of …
Webby Dwork before the development of Etale cohomology, though his proof did not give nearly as much information. 3 Cohomology of manifolds and Grothendieck’s Dream Let’s recall how ‘ordinary’ topological Cech cohomology works, and then we’ll see why an appropriate analogue would be useful in proving the Weil conjectures. Web2. The Bombieri-Dwork conjecture The Bombieri-Dwork conjecture is an attempt to characterize which differential equations are of geometric origin. Before we introduce this conjecture, let us first look at an interesting example. The Legendre family of elliptic curves is defined by the equation Eλ: y2 = x(x − 1)(x−λ), λ ∈ C− {0,1 ...
• Jean-Benoît Bost, Algebraic leaves of algebraic foliations over number fields, Publications Mathématiques de L'IHÉS, Volume 93, Number 1, September 2001 • Yves André, Sur la conjecture des p-courbures de Grothendieck–Katz et un problème de Dwork, in Geometric Aspects of Dwork Theory (2004), editors Alan Adolphson, Francesco Baldassarri, Pierre Berthelot, Nicholas Katz, François Loeser WebNov 5, 2016 · We investigate an analogue of the Grothendieck p-curvature conjecture, where the vanishing of the p-curvature is replaced by the stronger condition, that the …
WebSep 23, 2013 · Using Dwork's theory, we prove a broad generalisation of his famous p-adic formal congruences theorem. This enables us to prove certain p-adic congruences for …
WebNov 1, 1999 · Introduction In this article, we introduce a systematic new method to investigate the conjectural p-adic meromorphic continuation of Professor Bernard … cynon taff health boardWebOct 24, 2024 · 1La conjecture de Weil. II. Inst. Hautes Etudes Sci. Publ. Math. No. 52 ... The methods of Dwork are p-adic. For Xa non-singular hypersurface in a projective space they also provided him with a cohomological interpretation of the zeros and poles, and the functional equation. They inspired the crystalline theory of Grothendieck and cynon taffWebtechniques) of the first one was also found by B. Dwork [Dw60]. The third conjecture was proved by P. Deligne about ten years later [De74]. We state these conjectures following Weil [We49] rather closely. We assume that Xis a projective scheme over Fq such that X×Spec(Fq) Spec(Fq) is irreducible and nonsingular. 1.3.1. Rationality. billy navarre sulphurWebThe Dwork conjecture states that his unit root zeta function is p-adic meromorphic everywhere.[1] This conjecture was proved by Wan .[2][3][4] In mathematics, the Dwork … cynon tracksWebIn mathematics, the Dwork unit root zeta function, named after Bernard Dwork, is the L-function attached to the p-adic Galois representation arising from the p-adic etale … billy navarre service sulphur laWebJul 1, 2024 · Dwork defined the log-growth Newton polygons of system (1.1) which presents the data of log-growth of all solutions of (1.1) at x = 0 and x = t. Moreover Dwork conjectured the following: Conjecture 1.3 [7, Conjecture 2] The log-growth Newton polygon at x = 0 is above the log-growth Newton polygon at x = t. billy navarre service sulphurWebLes conjectures de Weil ont largement influencé les géomètres algébristes depuis 1950 ; elles seront prouvées par Bernard Dwork, Alexandre Grothendieck (qui, pour s'y attaquer, mit sur pied un gigantesque programme visant à transférer les techniques de topologie algébrique en théorie des nombres), Michael Artin et enfin Pierre Deligne ... billy navarre sulphur la hours of operation