On the Measure of Totally Real Algebraic Integers. II
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Publication:3931489
DOI10.2307/2007513zbMath0475.12001OpenAlexW4250628995MaRDI QIDQ3931489
Publication date: 1981
Full work available at URL: https://doi.org/10.2307/2007513
Polynomials (irreducibility, etc.) (11R09) Algebraic numbers; rings of algebraic integers (11R04) Totally real fields (11R80)
Related Items (16)
Sur le diamètre transfini entier d'un intervalle à extrémités rationnelles. (On the integer transfinite diameter of intervals with rational end points.) ⋮ Constructing totally p-adic numbers of small height ⋮ Abelian spiders and real cyclotomic integers ⋮ The total distance for algebraic integers having all their conjugates in a sector ⋮ Upper bounds for the usual measures of totally positive algebraic integers with house less than 5.8 ⋮ The \(N\)-measure for algebraic integers having all their conjugates in a sector ⋮ On the heights of totally \(p\)-adic numbers ⋮ On the essential minimum of Faltings’ height ⋮ Bounds for the trace of small Salem numbers ⋮ The Mahler measure and its areal analog for totally positive algebraic integers ⋮ The measure of totally positive algebraic integers ⋮ On the Zhang–Zagier measure ⋮ Siegel's trace problem and character values of finite groups ⋮ Zhang-Zagier heights of perturbed polynomials ⋮ On the absolute Mahler measure of polynomials having all zeros in a sector. III ⋮ Totally positive algebraic integers of small trace
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