Riemann zeta function/Record lists: Difference between revisions

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Revision as of 20:00, 11 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

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
Absolute zeta peak
Absolute zeta integer
Real zeta peak
Real zeta integer

No-twos tritave divisions

Record type 1 2 4 9 13 17 26 39 88 114 131 415 712 800 914 1342 1757 2426 3624 3755 6181
Absolute zeta peak
Absolute zeta integer
Real zeta peak
Real 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
Real zeta peak (cosine mu peak)
Absolute zeta integer
Real zeta peak (cosine mu peak)
Real 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
Absolute zeta peak
Absolute zeta integer
Real zeta peak (cosine mu peak)
Real zeta integer (cosine mu integer)