Sequences: by H. Halberstam and K.F. Roth, Том 1Clarendon Press, 1966 |
Содержание
Schnirelmann density and Schnirelmanns theorems Besico | 3 |
28853 | 40 |
Knesers theorem | 58 |
Авторские права | |
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Часто встречающиеся слова и выражения
a₁ applications asymptotic basis asymptotic density b₁ B₂-sequence Borel-Cantelli lemma chapter completes the proof condition congruence classes connexion consists constant contains corresponding counting number dB(A defined Definition degenerate modulo disjoint divisors Erdös estimate exists fact finite Furthermore Hence implies inequality infinite integer sequences interval large sieve lim sup Linnik log log logarithmic density math measurable space modulo g multiples natural numbers non-empty non-negative integers notation number of elements number theory numbers satisfying obtain order h pair prime factors prime number prime number theorem primitive sequence probability space probability theory proof of Theorem random variables real numbers relation remark Rényi residue classes result right-hand side rn(w Schnirelmann density Selberg set function sieve methods square-free subset suffices to prove sufficiently Suppose Theorem 16 tion union whilst write zero Σ Σ