The Phase of the Riemann Zeta Function and the Inverted Harmonic Oscillator

Astronomy; Avinash Khare(Institute of Physics; Bhubaneswar-751 005; Canada L8S 4M1); Guelph; Hamilton; INDIA.); J. Law( Guelph Waterloo Program for Graduate Work in Physics; McMaster University; N1G 2W1)

arxiv: chao-dyn/9406006 · v1 · submitted 1994-06-16 · chao-dyn · hep-th· nlin.CD

The Phase of the Riemann Zeta Function and the Inverted Harmonic Oscillator

R.K. Bhaduri(Department of Physics , Astronomy , McMaster University , Hamilton , Ontario , Canada L8S 4M1) , Avinash Khare(Institute of Physics , Sachivalaya Marg

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Bhubaneswar-751 005 INDIA.) J. Law( Guelph Waterloo Program for Graduate Work in Physics Physics Department University of Guelph Guelph Ont N1G 2W1)

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classification chao-dyn hep-thnlin.CD

keywords functionzetazerosdiagraminvertedoscillatorphaseriemann

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The Argand diagram is used to display some characteristics of the Riemann Zeta function. The zeros of the Zeta function on the complex plane give rise to an infinite sequence of closed loops, all passing through the origin of the diagram. This leads to the analogy with the scattering amplitude, and an approximate rule for the location of the zeros. The smooth phase of the Zeta function along the line of the zeros is related to the quantum density of states of an inverted oscillator.

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The Phase of the Riemann Zeta Function and the Inverted Harmonic Oscillator

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