Abstract
Advances in fractional analysis suggest a new way for the understanding of Riemann's conjecture. This analysis shows that any divisible natural number may be related to phase angles naturally associated with a certain class of non integer integro differential operators. It is shown that the subset of prime numbers is most likely related to a phase angle of ±π/4 to a 1/2-order differential equations and with their singularities. Riemann's conjecture asserting that, if s is a complex number, the non trivial zeros of zeta function in the gap [0,1], is characterized by, can be understood as a consequence of the properties of 1/2-order fractional differential equations on the prime number set. This physical interpretation suggests opportunities for revisiting flitter and cryptographic methodologies.
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