Harmonic entropy: Difference between revisions
add way more zeta HE stuff |
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We have succeeded in representing Harmonic Rényi Entropy in simple terms of two convolution products, each of which can be computed in <math>O(N log N)</math> time. | We have succeeded in representing Harmonic Rényi Entropy in simple terms of two convolution products, each of which can be computed in <math>O(N log N)</math> time. | ||
=Extending HE to <math>N=\infty</math>= | =Extending HE to <math>N=\infty: zeta-HE</math>= | ||
All of the models described above involve a finite set of rational numbers, bounded by some complexity function, and where the complexity is less than some max value <math>N</math>. | All of the models described above involve a finite set of rational numbers, bounded by some complexity function, and where the complexity is less than some max value <math>N</math>. | ||