Free Online Productivity Tools
i2Speak
i2Symbol
i2OCR
iTex2Img
iWeb2Print
iWeb2Shot
i2Type
iPdf2Split
iPdf2Merge
i2Bopomofo
i2Arabic
i2Style
i2Image
i2PDF
iLatex2Rtf
Sci2ools
EM
2010
2010
Chebyshev's Bias for Products of Two Primes
Under two assumptions, we determine the distribution of the difference between two functions each counting the numbers x that are in a given arithmetic progression modulo q and the product of two primes. The two assumptions are (i) the Extended Riemann Hypothesis for Dirichlet L-functions modulo q, and (ii) that the imaginary parts of the nontrivial zeros of these L-functions are linearly independent over the rationals. Our results are analogs of similar results proved for primes in arithmetic progressions by Rubinstein and Sarnak.
Real-time TrafficArithmetic Progression Modulo | Arithmetic Progressions | EM 2010 | Extended Riemann Hypothesis | Management |
| Added | 17 May 2011 |
| Updated | 17 May 2011 |
| Type | Journal |
| Year | 2010 |
| Where | EM |
| Authors | Kevin Ford, Jason Sneed |
Comments (0)
Researcher Info
|
