Refinement of Tate's discriminant bound and non-existence theorems for mod p Galois representations

Abstract.
Non-existence is proved of certain continuous irreducible
mod $p$ representations of degree 2 of the absolute
Galois group of the rational number field.
This extends previously known results,
the improvement based on a refinement of Tate's discriminant bound.

DVI and PDF files are here.
See also the published version in the Home Page of Documenta Mathematica.