I have a data set of ~500 points in 2D, with given coordinates (also implying I can refer to each point with a single integer) (x,y) between 0 and 10. Now I'm trying to divide the area into regular square cells by applying a grid. Note that this process is beeing repeated in an algorithm and at some point there will be >>>500 square cells.

What I want to achieve: Loop over all points, for each point find the square cell in which the point lies and save this information.

A few steps later: Loop over all points again, for each point identify its cell and the adjacent cells of the cell. Take all the points of these cells and add them to e.g. a list, for further usage.

My thought process: Since there will be alot of empty cells and I do not want to waste memory for them, use a tree.

Example: In cell_39_41 and cell_39_42 is a point.
First level: root-node with child 39

Second level: 39 node with children 41,42

Third level: 41 node with child point1 and 42 node with child point2

Fourth level: Nodes representing actual points

If I find more points in cell_39_41 or cell_39_42 they will be added as children of their respective third level nodes.

```
class Node(object):
def __init__(self, data):
self.data = data
self.children = []
def add_child(self, obj):
self.children.append(obj)
```

I left out an unrelevant method to return points in a cell.

Problems with this implementation:

1.If I add a second or third level node, I will have to refer to it to be able to add children or to find points in a certain cell and its adjacent cells. This means I have to do ALOT of costly linear searches since the children lists are not sorted.

2.I will be adding hundreds of nodes, but I need to able to refer to them by unique names. This might be a big personal fail, but I cannot think of a way to generate such names in a loop.

So I basically I'm pretty sure theres some mistake in my thought process or maybe the used implementation of a tree is not suitable. I have read alot of implementation of b-trees or similiar, but since this problem is limited to 2D I felt that they were just too much and not suited.