Editing 113: Riemann-Zeta
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==Explanation== | ==Explanation== | ||
| β | A {{w|prime number}} is any natural number with exactly two natural factors (1 and itself). The set of prime numbers is infinite, but they are somewhat elusive; there is no known way to find very large prime numbers except by trial and error. Some regularities in the primes have been found, but none that can fully predict their distribution. | + | A {{w|prime number}} is any natural number with exactly two natural factors (1 and itself). The set of prime numbers is infinite, but they are somewhat elusive; there is no known way to find or identify very large prime numbers except by trial and error. Some regularities in the primes have been found, but none that can fully predict their distribution. |
The {{w|Riemann zeta function}}, errantly referred to as the Riemann-Zeta function in the comic, is a function that takes in {{w|complex numbers}} and returns complex numbers. It is defined for Re('s')>1 as <math>\zeta(s)=\sum_{n=1}^{\infty} \frac{1}{n^s}</math>. For the rest of its domain (all complex numbers except 1), it is defined with {{w|analytic continuation}}. Its magnitude can be graphed in 3D, producing the "rippled curtain" referenced and depicted in the comic. There is a particular relationship between the Riemann zeta function and prime numbers, which makes the function a viable target for those attempting to understand primes. | The {{w|Riemann zeta function}}, errantly referred to as the Riemann-Zeta function in the comic, is a function that takes in {{w|complex numbers}} and returns complex numbers. It is defined for Re('s')>1 as <math>\zeta(s)=\sum_{n=1}^{\infty} \frac{1}{n^s}</math>. For the rest of its domain (all complex numbers except 1), it is defined with {{w|analytic continuation}}. Its magnitude can be graphed in 3D, producing the "rippled curtain" referenced and depicted in the comic. There is a particular relationship between the Riemann zeta function and prime numbers, which makes the function a viable target for those attempting to understand primes. | ||
