一起平行
发表于 2025-4-1 04:11:40
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变异
发表于 2025-4-1 07:51:25
https://doi.org/10.1007/978-1-4612-2418-1Diophantine approximation; calculus; number theory
欢腾
发表于 2025-4-1 11:58:52
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招惹
发表于 2025-4-1 17:26:42
Linear Diophantine Problems,The Frobenius number .(..) Let ... IN with .(..) = 1, n. If .we call this a representation or a g-representation of n by Ak (in order to distinguish between several types of representations that will be considered in the sequel). Then the Frobenius number .(..) is the greatest integer with no .-representation.
hidebound
发表于 2025-4-1 21:59:22
,A Remark on a Paper of Erdős and Nathanson,A set A of integers is said to be an . if every sufficiently large integer can be represented as a sum of . (not necessarily instinct) elements of A. In a recent paper [ENJ, Erdös and Nathanson prove the following interesting result.
Compass
发表于 2025-4-1 22:56:32
Towards a Classification of Hilbert Modular Threefolds,We begin with the classical (full) modular group and variety of which Hilbert modular groups and varieties are generalizations.