The number of powers of 2 in a representation of large even integers. I
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Publication:1297615
DOI10.1007/BF02879030zbMath1029.11049OpenAlexW4249700450MaRDI QIDQ1297615
Tianze Wang, Ming-Chit Liu, Liu, Jianya
Publication date: 9 February 2004
Published in: Science in China. Series A (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02879030
Goldbach-type theorems; other additive questions involving primes (11P32) Applications of the Hardy-Littlewood method (11P55) Applications of sieve methods (11N36)
Related Items (12)
Computers as a novel mathematical reality. IV: The Goldbach problem ⋮ Two results on powers of 2 in Waring-Goldbach problem ⋮ On unlike powers of primes and powers of 2 ⋮ Extremal values for the sum \(\sum^\tau_{r=1} e(a2^r/q)\) ⋮ On Linnik's approximation to Goldbach's problem. II ⋮ On Linnik's almost Goldbach theorem ⋮ Cancellation in a short exponential sum ⋮ Diophantine approximation with two primes and powers of two ⋮ On the almost Goldbach problem of Linnik ⋮ Landau's problems on primes ⋮ The number of powers of 2 in a representation of large even integers. II ⋮ Representation of even integers as sums of squares of primes and powers of 2
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