Zeta distribution

In probability theory and statistics, the zeta distribution is a discrete probability distribution. If X is a zeta-distributed random variable with parameter s, then the probability that X takes the integer value k is given by the probability mass function In probability theory and statistics, the zeta distribution is a discrete probability distribution. If X is a zeta-distributed random variable with parameter s, then the probability that X takes the integer value k is given by the probability mass function where ζ(s) is the Riemann zeta function (which is undefined for s = 1). The multiplicities of distinct prime factors of X are independent random variables. The Riemann zeta function being the sum of all terms k − s {displaystyle k^{-s}} for positive integer k, it appears thus as the normalization of the Zipf distribution. The terms 'Zipf distribution' and the 'zeta distribution' are often used interchangeably. But note that while the Zeta distribution is a probability distribution by itself, it is not associated to the Zipf's law with same exponent. See also Yule–Simon distribution The Zeta distribution is defined for positive integers k ≥ 1 {displaystyle kgeq 1} , and its probability mass function is given by where s > 1 {displaystyle s>1} is the parameter, and ζ ( s ) {displaystyle zeta (s)} is the Riemann zeta function.