A new class of functions may lead to advances in proving Riemann's Hypothesis(http://www.sciencedaily.com/releases/2008/03/080313124415.htm).
Riemann's Hypothesis is important because it predicts the frequency with which prime numbers occur in the number. A proof of the hypothesis should give mathematicians insight into new algorithms for factoring very large prime numbers, a significant breakthrough in the area of cryptography and the search for a way to break RSA encryption.
For those interested, a good basic description of the hypothesis is found at http://primes.utm.edu/notes/rh.html and on Wolfram's MathWorld (http://mathworld.wolfram.com/RiemannHypothesis.html).
This site also has some interesting information and a plotter for the Riemann Zeta Function:
http://web.mala.bc.ca/pughg/RiemannZeta/RiemannZetaLong.html#ZetaFunction
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1 comment:
Man. This makes me wish I'd have taken more math in college. Then I'd be able to comprehend the math-news. Darn.
:)
Hooray for getting your blog going again!
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