The Quasisimple Case of the k(GV)-Conjecture

Let d ! 2 and p a prime coprime to d. For f ðxÞ 2 ðZ p \ QÞ½x, let NP 1 ðf mod pÞ denote the first slope of the Newton polygon of the L-function of the exponential sums X x2F p ' z Tr F p ' =Fp ðf ðxÞÞ p : We prove that there is a Zariski dense open subset U in the space A d of degree-d monic polyn

We prove more special cases of the Fontaine Mazur conjecture regarding p-adic Galois representations unramified at p, and we present evidence for and consequences of a generalization of it. ## 1999 Academic Press Conjecture 1 (Fontaine, Mazur). There do not exist a number field K and an infinite e

## In this article we prove that in the case 1 and v is not divisible by 15, then the Second Multiplier Theorem holds without the assumption n, > A. This improves a result due to McFarland.

The \(4^{3} \Sigma_{g}^{+} v=4 \sim 3^{3} \Pi_{g} v=6\) and \(4^{3} \Sigma_{g}^{+} v=14 \sim 2^{3} \Pi_{1 g} v=68\) perturbations of \(\mathrm{Na}_{2}\) have been observed by perturbation facilitated optical-optical double resonance spectroscopy via \(b^{3} \Pi_{u}\) \(v^{\prime}=14\) intermediate l