PII: 0022-314X

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Date: 2016-03-21 18:12:27 Mathematics Discrete mathematics Number theory Arithmetic functions Logarithms Prime number theorem Sieve theory Loglog plot Exponentiation Square-free integer Chebyshev function Brun sieve		PII: 0022-314X Add to Reading List Source URL: www.mast.queensu.ca Download Document from Source Website File Size: 613,72 KB Share Document on Facebook

	A SHORT PROOF OF THE PRIME NUMBER THEOREM FOR ARITHMETIC PROGRESSIONS IVAN SOPROUNOV Abstract. We give a short proof of the Prime Number Theorem for arithmetic progressions following the ideas of recent Newman’s short DocID: 1t9Fl - View Document
	Around the Möbius function Kaisa Matomäki (University of Turku), Maksym Radziwill (Rutgers University) The Möbius function plays a central role in number theory; both the prime number theorem and the Riemann Hypothesi DocID: 1sGzc - View Document
	Algorithms and Data Structures Winter TermExercises for Units 1 and 2 1. This sequence of exercises is supposed to illustrate that certain restrictions that we put on our RAM model are really necessary. If they DocID: 1r0l5 - View Document
	Reading Classics: Euler 1 Notes by Steven Miller2 March 7, Ohio DocID: 1qZLR - View Document
	Smooth number estimates Rome, January 2009 Lemma. Let a ∈ R>0 and let φa : R>0 −→ R be the function given by φa (x) = x log x + DocID: 1qEHx - View Document