Galois representations ramified at one prime and with suitably large image

Abstract

Let p≥ 7 be a prime and n>1 be a natural number. We show that there exist infinitely many Galois representations :Gal(Q/Q)→ GLn(Zp) which are unramified outside \p, ∞\ with large image. More precisely, the Galois representations constructed have image containing the kernel of the mod-pt reduction map SLn(Zp)→ SLn(Z/ptZ), where t:=8(n2-n)(3+ logp(2n+1))+8. The results are proven via a purely Galois theoretic lifting construction. When p 14, our results are conditional since in this case, we assume a very weak version of Vandiver's conjecture.