飞镖
发表于 2025-4-1 04:02:58
,Mahler’s Classification of Numbers Compared with Koksma’s, II,lgebraic numbers. Following Mahler [.], for any integer . ≥ 1, we denote by w.(ξ) the supremum of the exponents . for which . has infinitely many solutions in integer polynomials P(.) of degree at most . Here, H(.) stands for the naïve height of the polynomial P(.), that is, the maximum of the absol
cleaver
发表于 2025-4-1 07:19:59
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残忍
发表于 2025-4-1 11:16:50
Applications of the Subspace Theorem to Certain Diophantine Problems, 1970, as an evolution of slightly special cases related to an analogue of Roth’s Theorem for simultaneous rational approximations to several algebraic numbers. While Roth’s Theorem considers rational approximations to a given algebraic point on the line, the Subspace Theorem deals with approximatio
Gobble
发表于 2025-4-1 16:22:46
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束以马具
发表于 2025-4-1 22:02:08
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commute
发表于 2025-4-1 23:44:51
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北京人起源
发表于 2025-4-2 06:13:53
Counting Algebraic Numbers with Large Height I,r . and real number ., it is well known that the number . of points α in . having degree . over ℚ and satisfying . is finite. This is the one-dimensional case of Northcott’s Theorem [.] (see also ). The systematic study of the counting function ., and that of related functions in higher
Melodrama
发表于 2025-4-2 08:30:32
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IOTA
发表于 2025-4-2 11:34:03
On the Continued Fraction Expansion of a Class of Numbers,al reference is Chapter I of ). If ξ is irrational, then, by letting . tend to infinity, this provides infinitely many rational numbers ../x. with |ξ - x./x...... By contrast, an irrational real number ξ is said to be . if there exists a constant c. > 0 suchthat |ξ - ..... for each .. or,equival