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Rudolf Otto Sigismund Lipschitz. Biography MathSciNet. Dr. phil. Universität Berlin 1853. Dissertation: Determinatio status magnetici viribus inducentibus commoti in ellipsoide. Click here to see the students listed in chronological order. According to our current on-line database, Rudolf Lipschitz has 3 students and 79000 descendants. We ...
Rudolf Otto Sigismund Lipschitz (14. května 1832 Královec, Prusko – 7. října 1903 Bonn, Německé císařství) byl německý matematik, žák Dirichleta a učitel Felixe Kleina. Zabýval se mnoha oblastmi matematiky , například matematickou analýzou , teorií spojitosti , teorií čísel , algebry s umocňováním , diferenciální geometrií či klasickou mechanikou .
A Wikimédia Commons tartalmaz Rudolf Lipschitz témájú médiaállományokat. Sablon • Wikidata • Segítség Rudolf Otto Sigismund Lipschitz ( Königsberg , 1832 .
Rudolf Otto Sigismund Lipschitz, nato a Königsberg il 14 maggio 1832, è celebre per i suoi studi in Analisi ed in particolare è ricordato per la cosiddetta "condizione di Lipschitz", che individua una classe funzionale (quella delle funzioni per cui è d(f(x),f(y))<K·d(x,y)) per la quale è assicurata l'unicità della soluzione nei problemi di Cauchy relativi ad equazioni differenziali ...
Rudolf Otto Sigismund Lipschitz (1832–1903) was a German mathematician. External links. O’Connor, John J.; Robertson, Edmund F., “Rudolf Otto Sigismund Lipschitz”, MacTutor History of Mathematics archive, University of St Andrews, . Rudolf Lipschitz entry at ProofWiki
The scientific estate of the mathematician Rudolf Lipschitz (1832-1903) was given to the University of Bonn by his heirs about thirty years ago. Since then. these papers have not been ordered, not even cataloged. The estate includes an extended scientific correspondence which was completely unknown up to now.
Rudolf Otto Sigismund Lipschitz. 1832-1903. German mathematician whose most important work was in the areas of quadratic differential forms and mechanics in physics. His work on Hamilton-Jacobi methods of integrating equations of motion were readily applied to celestial mechanics to great effect. He also described the "Lipschitz condition"—an ...
