Riemann zeta function/Record lists: Difference between revisions

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Revision as of 23:01, 10 April 2025

Zero-based metrics

Zeta metrics corresponding to regions between zeros on the critical line (σ = 0.5). The Riemann hypothesis is the equivalent to the statement that these correspond directly to peaks.

Record type
Zeta integral
Zeta gap

σ = 1/2

Record type
Absolute zeta peak
Absolute zeta integer
Real zeta peak
Real zeta integer

σ = 1

Record type
Absolute zeta peak
Absolute zeta integer
Real zeta peak
Real zeta integer

σ = 3/2

For σ = 3/2, the record lists for real zeta are identical to those for absolute zeta out to 8539edo.

Record type 1 2 3 5 7 10 12 19 31 41 53 72 130 171 224 270 494 1106 1578 2460 2684 3395 5585 8269 8539
Zeta peak
Zeta integer

No-twos tritave divisions

Record type 1 2 4 9 13 17 26 39 88 114 131 712 800 914 1342 1757 2426 3624 3755 6181
Zeta peak
Zeta integer

σ = 2

For σ = 2, the record lists for real zeta are identical to those for absolute zeta out to 8539edo.

Record type 1 2 3 5 7 10 12 19 31 41 53 130 171 270 494 1106 1578 2460 2684 3395 5585 6079 8269 8539
Zeta peak (cosine mu peak)
Zeta integer (cosine mu integer)

No-twos tritave divisions

Record type 1 2 4 9 13 17 26 39 88 114 131 800 914 1342 1757 2426 3624 3755 6181
Zeta peak (cosine mu peak)
Zeta integer (cosine mu integer)