Numbers m such that d(m) < d(k) for all k < m, where d is the normalized delta defined as d(m) = (z(m+1) - z(m))*(log(z(m)/(2*Pi))/(2*Pi)) where z(k) is the imaginary part of the k-th Riemann zeta zero.

A328656

Numbers m such that d(m) < d(k) for all k < m, where d is the normalized delta defined as d(m) = (z(m+1) - z(m))*(log(z(m)/(2*Pi))/(2*Pi)) where z(k) is the imaginary part of the k-th Riemann zeta zero.

Terms

    a(0) =1a(1) =2a(2) =4a(3) =9a(4) =13a(5) =27a(6) =34a(7) =135a(8) =159a(9) =186a(10) =212a(11) =315a(12) =363a(13) =453a(14) =693a(15) =922a(16) =1496a(17) =4765a(18) =6709a(19) =44555a(20) =73997a(21) =82552a(22) =87761a(23) =95248a(24) =415587a(25) =420891a(26) =1115578a(27) =8546950a(28) =24360732a(29) =41820581

External references