A number of scholars have recently maintained that a theorem in an unpublished treatise by Leibniz written in 1675 establishes a rigorous foundation for the infinitesimal calculus. I argue that this is a misinterpretation
Newton and Gottfried Leibniz both used infinitesimals—numbers which are nonzero, yet smaller in magn...
Abstract. In 1693, Gottfried Whilhelm Leibniz published in the Acta Eruditorum a geometrical proof o...
We present a characterization of the completeness of the field of real numbers in the form of a coll...
A number of scholars have recently maintained that a theorem in an unpublished treatise by Leibniz w...
International audienceIt has long been thought that Leibniz’s conceptions of infinitesimals were a l...
The paper deals with Leibniz's manuscript writings on the foundation of infinitesimal calculus since...
When Newton and Leibniz first developed calculus, they did so by using infinitesimals (really really...
A study of the work of Leibniz is of importance for at least two reasons. In the first place, Leibni...
SUMMARY. — In his Quadratura arithmetica circuli ellipseos et hyperbolae cujus corollarium est trigo...
In contrast with some recent theories of infinitesimals as non-Archimedean entities, Leibniz’s matur...
peer reviewedRecent Leibniz scholarship has sought to gauge which foundational framework provides t...
Contains fulltext : 18721.pdf ( ) (Open Access)Report No. 991516 p
Mathematical theories, and mainly infinitesimal Calculus, was applied by Leibniz to many other scien...
We apply Benacerraf’s distinction between mathematical ontology and mathematical practice (or the st...
The infinitesimal has played an interesting role in the history of analysis. It was initially used t...
Newton and Gottfried Leibniz both used infinitesimals—numbers which are nonzero, yet smaller in magn...
Abstract. In 1693, Gottfried Whilhelm Leibniz published in the Acta Eruditorum a geometrical proof o...
We present a characterization of the completeness of the field of real numbers in the form of a coll...
A number of scholars have recently maintained that a theorem in an unpublished treatise by Leibniz w...
International audienceIt has long been thought that Leibniz’s conceptions of infinitesimals were a l...
The paper deals with Leibniz's manuscript writings on the foundation of infinitesimal calculus since...
When Newton and Leibniz first developed calculus, they did so by using infinitesimals (really really...
A study of the work of Leibniz is of importance for at least two reasons. In the first place, Leibni...
SUMMARY. — In his Quadratura arithmetica circuli ellipseos et hyperbolae cujus corollarium est trigo...
In contrast with some recent theories of infinitesimals as non-Archimedean entities, Leibniz’s matur...
peer reviewedRecent Leibniz scholarship has sought to gauge which foundational framework provides t...
Contains fulltext : 18721.pdf ( ) (Open Access)Report No. 991516 p
Mathematical theories, and mainly infinitesimal Calculus, was applied by Leibniz to many other scien...
We apply Benacerraf’s distinction between mathematical ontology and mathematical practice (or the st...
The infinitesimal has played an interesting role in the history of analysis. It was initially used t...
Newton and Gottfried Leibniz both used infinitesimals—numbers which are nonzero, yet smaller in magn...
Abstract. In 1693, Gottfried Whilhelm Leibniz published in the Acta Eruditorum a geometrical proof o...
We present a characterization of the completeness of the field of real numbers in the form of a coll...