Galois representations over function fields that are ramified at one prime
Abstract
Let Fq be the finite field with q elements, F:=Fq(T) and Fsep a separable closure of F. Set A to denote the polynomial ring Fq[T]. Let p be a non-zero prime ideal of A, and O be the completion of A at p. Given any integer r≥ 2, I construct a Galois representation :Gal(Fsep/F)→ GLr(O) which is unramified at all non-zero primes l≠ p of A, and whose image is a finite index subgroup of GLr(O). Moreover, if the degree of p is 1, then is also unramified at ∞.
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