Minimal $N$-Point Diameters and $f$-Best-Packing Constants in $R^d$

Details Minimal $N$-Point Diameters and $f$-Best-Packing Constants in $R^d$ Minimal $N$-Point Diameters and $f$-Best-Packing Constants in $R^d$

2012-04-19

arxiv.org/abs/1204.4403v1

Physics

Mathematical Physics

Scientific paper

In terms of the minimal $N$-point diameter $D_d(N)$ for $R^d,$ we determine, for a class of continuous real-valued functions $f$ on $[0,+\infty],$ the $N$-point $f$-best-packing constant $\min\{f(\|x-y\|)\, :\, x,y\in \R^d\}$, where the minimum is taken over point sets of cardinality $N.$ We also show that $$ N^{1/d}\Delta_d^{-1/d}-2\le D_d(N)\le N^{1/d}\Delta_d^{-1/d}, \quad N\ge 2,$$ where $\Delta_d$ is the maximal sphere packing density in $\R^d$. Further, we provide asymptotic estimates for the $f$-best-packing constants as $N\to\infty$.

Affiliated with

Also associated with

No associations

Rating

Minimal $N$-Point Diameters and $f$-Best-Packing Constants in $R^d$ does not yet have a rating. At this time, there are no reviews or comments for this scientific paper.

If you have personal experience with Minimal $N$-Point Diameters and $f$-Best-Packing Constants in $R^d$, we encourage you to share that experience with our LandOfFree.com community. Your opinion is very important and Minimal $N$-Point Diameters and $f$-Best-Packing Constants in $R^d$ will most certainly appreciate the feedback.

Rate now

Comments { 0 }

Profile ID: LFWR-SCP-O-35364