Add kd-tree revisited post
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content/posts/2024-08-11-kd-tree-revisited/index.md
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content/posts/2024-08-11-kd-tree-revisited/index.md
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---
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title: "Kd Tree Revisited"
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date: 2024-08-17T14:20:22+01:00
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draft: false # I don't care for draft mode, git has branches for that
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description: "Simplifying the nearest neighbour search"
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tags:
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- algorithms
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- data structures
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- python
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categories:
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- programming
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series:
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- Cool algorithms
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favorite: false
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disable_feed: false
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---
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After giving it a bit of thought, I've found a way to simplify the nearest
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neighbour search (i.e: the `closest` method) for the `KdTree` I implemented in
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[my previous post]({{< relref "../2024-08-10-kd-tree/index.md" >}}).
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<!--more-->
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## The improvement
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That post implemented the nearest neighbour search by keeping track of the
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tree's boundaries (through `AABB`), and each of its sub-trees (through
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`AABB.split`), and testing for the early exit condition by computing the
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distance of the search's origin to each sub-tree's boundaries.
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Instead of _explicitly_ keeping track of each sub-tree's boundaries, we can
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implicitly compute it when recursing down the tree.
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To check for the distance between the queried point and the splitting plane of
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inner nodes: we simply need to project the origin onto that plane, thus giving
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us a minimal bound on the distance of the points stored on the other side.
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This can be easily computed from the `axis` and `mid` values which are stored in
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the inner nodes: to project the node on the plane we simply replace its
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coordinate for this axis by `mid`.
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## Simplified search
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With that out of the way, let's now see how `closest` can be implemented without
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needing to track the tree's `AABB` at the root:
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```python
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# Wrapper type for closest points, ordered by `distance`
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@dataclasses.dataclass(order=True)
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class ClosestPoint[T](NamedTuple):
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point: Point = field(compare=False)
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value: T = field(compare=False)
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distance: float
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class KdTree[T]:
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def closest(self, point: Point, n: int = 1) -> list[ClosestPoint[T]]:
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assert n > 0
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res = MaxHeap()
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# Instead of passing an `AABB`, we give an initial projection point,
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# the query origin itself (since we haven't visited any split node yet)
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self._root.closest(point, res, n, point)
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return sorted(res)
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class KdNode[T]:
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def closest(
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self,
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point: Point,
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out: MaxHeap[ClosestPoint[T]],
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n: int,
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projection: Point,
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) -> None:
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# Same implementation
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self.inner.closest(point, out, n, bounds)
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class KdLeafNode[T]:
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def closest(
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self,
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point: Point,
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out: MaxHeap[ClosestPoint[T]],
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n: int,
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projection: Point,
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) -> None:
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# Same implementation
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for p, val in self.points.items():
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item = ClosestPoint(p, val, dist(p, point))
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if len(out) < n:
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out.push(item)
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elif out.peek().distance > item.distance:
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out.pushpop(item)
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class KdSplitNode[T]:
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def closest(
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self,
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point: Point,
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out: list[ClosestPoint[T]],
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n: int,
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projection: Point,
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) -> None:
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index = self._index(point)
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self.children[index].closest(point, out, n, projection)
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# Project onto the splitting plane, for a minimum distance to its points
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projection = projection.replace(self.axis, self.mid)
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# If we're at capacity and can't possibly find any closer points, exit
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if len(out) == n and dist(point, projection) > out.peek().distance:
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return
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# Otherwise recurse on the other side to check for nearer neighbours
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self.children[1 - index].closest(point, out, n, projection)
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```
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As you can see, the main difference is in `KdSplitNode`'s implementation, where
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we can quickly compute the minimum distance between the search's origin and all
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potential points in that subspace.
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