Relationships between conjectures on the structure of pro-p Galois groups unramified outside p

Abstract

We consider the canonical representation of the absolute Galois group of the rational numbers in the outer automorphism group of the pro-p completion of the fundamental group of the projective line minus 0,1, and infinity. Deligne has conjectured that a certain graded Zp-Lie algebra arising from this representation becomes a free p-adic Lie algebra on one element in each odd degree starting with 3 when tensored with the Qp. We construct good choices of these elements and use them to examine the structure of the Zp-Lie algebra. In particular, we consider how its structure depends upon the regularity of the prime p by examining a consequence of Greenberg's conjecture in multivariable Iwasawa theory.

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