On the measure of totally real algebraic integers

C. J. Smyth

doi:10.1017/S1446788700016426

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For totally real algebraic integers x of degree D(x), we examine the stucture of the set of values M(x)1D(x). where M(x) is the measure of x. We find a small limit point λ of this set, and show that the set is everywhere dense in (λ x).

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On the measure of totally real algebraic integers

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