1
vote
2answers
37 views

Point as an element of an affine space vs point as an element of a topological space?

I am searching for the "most natural" definition of a (geometrical/space) point as an element of "something" in mathematics (I am trying to design a small computational geometry library on strong ...
0
votes
0answers
129 views

Decomposition of multidimensional point set

I am trying to use point sets to define the subdivisions of a multidimensional space and use a hash table to store the subvisions. This approach requires decomposing the multidimensional space into ...
0
votes
1answer
88 views

How to compute this set operation?

Suppose there are two sets (spaces) X and Y. Given N subsets of $X \times Y$: $S_1, \dots, S_N \subseteq X \times Y$. I need to compute the following set $S_X \subseteq X$: $$ S_X = \{x \in X : ...
2
votes
3answers
72 views

Explanation of the following notation

I am having a hard time understanding the meaning of the union operation in this equation. $$C(A)=\bigcup_{x \in A}C(x)$$ For context, here is the sentence: The candidate set for $x$ is $S \cap ...
2
votes
3answers
267 views

What does “identity map $id$” mean?

What does "identity map $id$" mean in this context? Two metrics $d_1$ and $d_2$ on $X$ are said to be Lipschitz equivalent if the identity map $id\colon (X,d_1)\to (X,d_2)$ is bilipschitz.