/rtree

An R-tree implementation for Go

Primary LanguageGoMIT LicenseMIT

rtree

GoDoc

This package provides an in-memory R-Tree implementation for Go. It's designed for Tile38 and is optimized for fast rect inserts and replacements.

Cities

Usage

Installing

To start using rtree, install Go and run go get:

$ go get -u github.com/tidwall/rtree

Basic operations

// create a 2D RTree
var tr rtree.RTree

// insert a point
tr.Insert([2]float64{-112.0078, 33.4373}, [2]float64{-112.0078, 33.4373}, "PHX")

// insert a rect
tr.Insert([2]float64{10, 10}, [2]float64{20, 20}, "rect")

// search 
tr.Search([2]float64{-112.1, 33.4}, [2]float64{-112.0, 33.5}, 
 	func(min, max [2]float64, data interface{}) bool {
		println(data.(string)) // prints "PHX"
	},
)

// delete 
tr.Delete([2]float64{-112.0078, 33.4373}, [2]float64{-112.0078, 33.4373}, "PHX")

Support for Generics (Go 1.18+)

// create a 2D RTree
var tr rtree.RTreeG[string]

// insert a point
tr.Insert([2]float64{-112.0078, 33.4373}, [2]float64{-112.0078, 33.4373}, "PHX")

// insert a rect
tr.Insert([2]float64{10, 10}, [2]float64{20, 20}, "rect")

// search 
tr.Search([2]float64{-112.1, 33.4}, [2]float64{-112.0, 33.5}, 
 	func(min, max [2]float64, data string) bool {
		println(data) // prints "PHX"
	},
)

// delete 
tr.Delete([2]float64{-112.0078, 33.4373}, [2]float64{-112.0078, 33.4373}, "PHX")

Support for generic numeric types, like int, float32, etc.

// create a 2D RTree
var tr rtree.RTreeGN[float32, string]

// insert a point
tr.Insert([2]float32{-112.0078, 33.4373}, [2]float32{-112.0078, 33.4373}, "PHX")

// insert a rect
tr.Insert([2]float32{10, 10}, [2]float32{20, 20}, "rect")

// search 
tr.Search([2]float32{-112.1, 33.4}, [2]float32{-112.0, 33.5}, 
 	func(min, max [2]float32, data string) bool {
		println(data) // prints "PHX"
	},
)

// delete 
tr.Delete([2]float32{-112.0078, 33.4373}, [2]float32{-112.0078, 33.4373}, "PHX")

Algorithms

This implementation is a variant of the original paper:
R-TREES. A DYNAMIC INDEX STRUCTURE FOR SPATIAL SEARCHING

Inserting

Similar to the original paper. From the root to the leaf, the rects which will incur the least enlargment are chosen. Ties go to rects with the smallest area.

Added to this implementation: when a rect does not incur any enlargement at all, it's chosen immediately and without further checks on other rects in the same node. Also added is all child rectangles in every node are ordered by their minimum x value. This can dramatically speed up searching for intersecting rectangles on most modern hardware.

Deleting

A target rect is searched for from root to the leaf, and if found it's deleted. When there are no more child rects in a node, that node is immedately removed from the tree.

Searching

Same as the original algorithm.

Splitting

This is a custom algorithm. It attempts to minimize intensive operations such as pre-sorting the children and comparing overlaps & area sizes. The desire is to do simple single axis distance calculations each child only once, with a target 50/50 chance that the child might be moved in-memory.

When a rect has reached it's max number of entries it's largest axis is calculated and the rect is split into two smaller rects, named left and right. Each child rects is then evaluated to determine which smaller rect it should be placed into. Two values, min-dist and max-dist, are calcuated for each child.

  • min-dist is the distance from the parent's minumum value of it's largest axis to the child's minumum value of the parent largest axis.
  • max-dist is the distance from the parent's maximum value of it's largest axis to the child's maximum value of the parent largest axis.

When the min-dist is less than max-dist then the child is placed into the left rect. When the max-dist is less than min-dist then the child is placed into the right rect. When the min-dist is equal to max-dist then the child is placed into an equal bucket until all of the children are evaluated. Each equal rect is then one-by-one placed in either left or right, whichever has less children.

Finally, sort all the rects in the parent node of the split rect by their minimum x value.

License

rtree source code is available under the MIT License.