Worst-case optimal join algorithm

An illustration of properties of join algorithms. When performing a join between more than two relations on more than two attributes, binary join algorithms such as hash join operate over two relations at a time, and join them on all attributes in the join condition; worst-case optimal algorithms such as generic join operate on a single attribute at a time but join all the relations on this attribute.^[1]

A worst-case optimal join algorithm is an algorithm for computing relational joins with a runtime that is bounded by the worst-case output size of the join. Traditional binary join algorithms such as hash join operate over two relations at a time; joins between more than two relations are implemented by repeatedly applying binary joins. Worst-case optimal join algorithms are asymptotically faster in worst case than any join algorithm based on such iterated binary joins.

The first worst-case optimal join algorithm, generic join, was published in 2012.^[2] Worst-case optimal join algorithms have been implemented in commercial database systems, including the LogicBlox system.^[3]^[4] Worst-case optimal joins have been applied to build a worst-case optimal algorithm for e-matching.^[5]

References

Notes

^ Wang, Yisu Remy; Willsey, Max; Suciu, Dan (2023-01-27). "Free Join: Unifying Worst-Case Optimal and Traditional Joins". arXiv:2301.10841 [cs.DB].
^ Ngo, Hung Q.; Porat, Ely; Ré, Christopher; Rudra, Atri (2012-03-08). "Worst-case Optimal Join Algorithms". arXiv:1203.1952 [cs.DB].
^ Veldhuizen, Todd L. (2013-12-20). "Leapfrog Triejoin: a worst-case optimal join algorithm". arXiv:1210.0481 [cs.DB].
^ Freitag, Michael; Bandle, Maximilian; Schmidt, Tobias; Kemper, Alfons; Neumann, Thomas (2020-07-01). "Adopting worst-case optimal joins in relational database systems". Proceedings of the VLDB Endowment. 13 (12): 1891–1904. doi:10.14778/3407790.3407797. ISSN 2150-8097. S2CID 221115321.
^ Zhang, Yihong; Wang, Yisu Remy; Willsey, Max; Tatlock, Zachary (2022-01-12). "Relational e-matching". Proceedings of the ACM on Programming Languages. 6 (POPL): 35:1–35:22. doi:10.1145/3498696. S2CID 236924583.

Sources

Ngo, Hung Q.; Porat, Ely; Ré, Christopher; Rudra, Atri (2018-03-13). "Worst-case Optimal Join Algorithms". Journal of the ACM. 65 (3): 16:1–16:40. arXiv:1203.1952. doi:10.1145/3180143. ISSN 0004-5411.
Ngo, Hung Q; Ré, Christopher; Rudra, Atri (2014-02-28). "Skew strikes back: new developments in the theory of join algorithms". ACM SIGMOD Record. 42 (4): 5–16. doi:10.1145/2590989.2590991. ISSN 0163-5808. S2CID 6384477.

External links

A Gentle(-ish) Introduction to Worst-Case Optimal Joins

[1] Wang, Yisu Remy; Willsey, Max; Suciu, Dan (2023-01-27). "Free Join: Unifying Worst-Case Optimal and Traditional Joins". arXiv:2301.10841 [cs.DB].

[2] Ngo, Hung Q.; Porat, Ely; Ré, Christopher; Rudra, Atri (2012-03-08). "Worst-case Optimal Join Algorithms". arXiv:1203.1952 [cs.DB].

[3] Veldhuizen, Todd L. (2013-12-20). "Leapfrog Triejoin: a worst-case optimal join algorithm". arXiv:1210.0481 [cs.DB].

[4] Freitag, Michael; Bandle, Maximilian; Schmidt, Tobias; Kemper, Alfons; Neumann, Thomas (2020-07-01). "Adopting worst-case optimal joins in relational database systems". Proceedings of the VLDB Endowment. 13 (12): 1891–1904. doi:10.14778/3407790.3407797. ISSN 2150-8097. S2CID 221115321.

[5] Zhang, Yihong; Wang, Yisu Remy; Willsey, Max; Tatlock, Zachary (2022-01-12). "Relational e-matching". Proceedings of the ACM on Programming Languages. 6 (POPL): 35:1–35:22. doi:10.1145/3498696. S2CID 236924583.

[1]

[2]

[3]

[4]

[5]