Linking Numbers and the Tame Fontaine-Mazur Conjecture
Abstract
Let p be an odd prime, let S be a finite set of primes q congruent to 1 mod p but not mod p2 and let GS be the Galois group of the maximal p-extension of Q un-ramified outside of S. If r is a continuous homomorphism of GS into GL2(Zp) then under certain conditions on the linking numbers of S we show that r=1 if its reduction mod p is 1. We also show that the reduction of r mod p is 1 if r can be put in triangular form mod p3.
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