Faster Dynamic Compressed d-ary Relations
November 20, 2019 Β· Declared Dead Β· π SPIRE
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Authors
Diego Arroyuelo, Guillermo de Bernardo, Travis Gagie, Gonzalo Navarro
arXiv ID
1911.08971
Category
cs.DS: Data Structures & Algorithms
Citations
5
Venue
SPIRE
Last Checked
4 months ago
Abstract
The $k^2$-tree is a successful compact representation of binary relations that exhibit sparseness and/or clustering properties. It can be extended to $d$ dimensions, where it is called a $k^d$-tree. The representation boils down to a long bitvector. We show that interpreting the $k^d$-tree as a dynamic trie on the Morton codes of the points, instead of as a dynamic representation of the bitvector as done in previous work, yields operation times that are below the lower bound of dynamic bitvectors and offers improved time performance in practice.
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