Fig 3 - The Concentration of Fractional Distances

Relative variance for data distributed as F Ã , as a function of p. We can see that a maximum is obtained for a rather large value of p, far from 1.

Go to figure page

Reference

The Concentration of Fractional Distances - Scientific Figure on ResearchGate. Available from: https://www.researchgate.net/figure/Relative-variance-for-data-distributed-as-F-A-as-a-function-of-p-We-can-see-that-a_fig2_3297722 [accessed 11 Dec, 2023]

Caption

Fig. 3. Relative variance for data distributed as F Ã , as a function of p. We can see that a maximum is obtained for a rather large value of p, far from 1.

Embed code

<a href="https://www.researchgate.net/figure/Relative-variance-for-data-distributed-as-F-A-as-a-function-of-p-We-can-see-that-a_fig2_3297722"><img src="https://www.researchgate.net/profile/Vincent-Wertz/publication/3297722/figure/fig2/AS:667649818247175@1536191529915/Relative-variance-for-data-distributed-as-F-A-as-a-function-of-p-We-can-see-that-a.ppm" alt="Relative variance for data distributed as F Ã , as a function of p. We can see that a maximum is obtained for a rather large value of p, far from 1."/></a>