Beyond Cartesian Limits: Leibniz's Passage from Algebraic to “Transcendental” Mathematics (2006)
This article deals with Leibniz's reception of Descartes' geometry. Leibnizian mathematics was based on five fundamental notions: calculus, characteristic, art of invention, method, and freedom. On the basis of methodological considerations Leibniz criticized Descartes' restriction of geometry to objects that could be given in terms of algebraic (i.e., finite) equations: Descartes's mind was the limit of science. The failure of algebra to solve equations of higher degree led Leibniz to develop linear algebra, and the failure of algebra to deal with transcendental problems led him to conceive of a science of the infinite. Hence Leibniz reconstructed the mathematical corpus, created new (transcendental) notions, and redefined known notions (equality, exactness, construction), thus establishing a veritable complement of algebra for the transcendentals: infinite equations, i.e., infinite series, became inestimable tools of mathematical research.
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