Semistar operations on Dedekind domains
Abstract
We give an explicit description of the lattice (D) of all semistar operations on any Dedekind domain D from its set (D) of maximal ideals. This descpription is constructive if (D) is finite. As a corollary we show that 2n [n/2] ≤ |(D)| ≤ 22n if n = |(D)| is finite; we compute |(D)| if |(D)| ≤ 7; and we show that if (D) is infinite then (D) has cardinality 22|(D)|.
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