Singular Integers and Kummer-Stickelberger relation

Abstract

Let p be an odd prime. Let Fp* be the no-null part of the finite field of p elements. Let K=(zeta) be a p-cyclotomic field and OK be its ring of integers. Let pi be the prime ideal of K lying over p. Let sigma : zeta --> zetav be the Q-isomorphism of K for a primitive root v mod p. The subgroup of exponent p of the class group of K can be seen as a direct sum oplusi=1r Gammai of groups of order p where the group Gammai is annihilated by a polynomial sigma-mui with mui ∈ Fp*. Let Gamma be one of the Gammai. From Kummer, there exist prime non-principal prime ideals Q of inertial degree 1 with Cl(Q) ∈ Gamma. We show that there exists singular semi-primary integers A such that A OK= Qp with Asigma-mu = alphap where alpha in K. Let E = alphapαp-1 and nu the positive integer defined by nu = vpi(E) -(p-1), where vpi(.) is the pi-adic valuation. The aims of this article are to describe the pi-adic expansions of the Gauss Sum g(Q) and of E and to derive an upper bound of nu from the Jacobi resolvents and Kummer-Stickelberger relation of the cyclotomic field K.

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