具体 发表于 2025-3-23 11:44:48
gures. These two notions played an essential role in his mathematics and in his understanding of what he called ‛geometricity’. My paper is divided into four sections. The first section investigates the meaning of analysis and ‛analyzability‛, as well as their relation to ‛geometricity’ and shows thCryptic 发表于 2025-3-23 14:27:35
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Julius Zapperte beginning of the stay in Paris and mentioned in later philosophical texts. As a conclusion, I will sketch how this evolution of Leibniz’s philosophical ideas, which was provoked by mathematics, had a ricochet effect on his mathematical practice. This will provide evidence in a simple case of how m注意力集中 发表于 2025-3-24 19:13:01
Julius Zappertentify curves with polygons of infinitely many, infinitely small sides. The ‛aequipolence principle’, based on the notion of quadrature, became the fundamental principle of his infinitesimal geometry and of his differential calculus, too. The third section elaborates how Leibniz‛s classification ofCommission 发表于 2025-3-25 00:19:14
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