Andere Kunden interessierten sich auch für
![Turán Sieve]( "Turán Sieve")
Turán Sieve22,99 €![Turán Graph]( "Turán Graph")
Turán Graph22,99 €![The Mathematics of Paul Erd¿s I]( "The Mathematics of Paul Erd¿s I")
The Mathematics of Paul Erd¿s I111,99 €![The Mathematics of Paul Erd¿s II]( "The Mathematics of Paul Erd¿s II")
The Mathematics of Paul Erd¿s II148,99 €![Wirtinger's Inequality for Functions]( "Wirtinger's Inequality for Functions")
Wirtinger's Inequality for Functions22,99 €![Markov Brothers' Inequality]( "Markov Brothers' Inequality")
Markov Brothers' Inequality22,99 €![Brascamp Lieb Inequality]( "Brascamp Lieb Inequality")
Brascamp Lieb Inequality22,99 €
High Quality Content by WIKIPEDIA articles! The Turán Kubilius inequality is a mathematical theorem in probabilistic number theory. It is useful for proving results about the normal order of an arithmetic function. :305 308 The theorem was proved in a special case in 1934 by Paul Turán and generalized in 1956 and 1964 by Jonas Kubilius. Turán developed the inequality to create a simpler proof of the Hardy Ramanujan theorem about the normal order of the number (n) of distinct prime divisors of an integer n.:316 There is an exposition of Turán's proof in Hardy & Wright,
22.11. Tenenbaum:305 308 gives a proof of the Hardy Ramanujan theorem using the Turán Kubilus inequality and states without proof several other applications.
22.11. Tenenbaum:305 308 gives a proof of the Hardy Ramanujan theorem using the Turán Kubilus inequality and states without proof several other applications.