top | item 44958422

(no title)

> The advantage of this approach is that it generalizes efficiently to any number of dimensions.

I am unsure about whether this is true. The ratio of a ball’s volume to its enclosing hypercube’s volume should decrease to 0 as dimensionality increases. Thus, the approach should actually generalize very poorly.

discuss

alberto_balsam|6 months ago

Note that the author is not referring to the accept-reject method here

unknown|6 months ago

[deleted]

arvindh-manian|6 months ago

Ah I misread this, thanks

scythe|6 months ago

Let S = {S_i} be any set of cubes that covers a d-sphere. Choose a point in a cube and an integer i in [0, |S|). Now you have a random point in S. With a judicious choice of S you obtain a uniformly random point in the unit sphere with high probability.

unknown|6 months ago

[deleted]