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Marijn Heule

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Marijn Heule
Born (1979-03-12) March 12, 1979 (age 45)
Alma materDelft University of Technology
OccupationAssociate professor
EmployerCarnegie Mellon University
Known forUsing SAT solvers to solve mathematical conjectures
Websitehttp://www.cs.cmu.edu/~mheule/

Marienus Johannes Hendrikus Heule (born March 12, 1979, at Rijnsburg, The Netherlands)[1][2] is a Dutch computer scientist at Carnegie Mellon University who studies SAT solvers. Heule has used these solvers to resolve mathematical conjectures such as the Boolean Pythagorean triples problem, Schur's theorem number 5, and Keller's conjecture in dimension seven.

Career

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Heule received a PhD at Delft University of Technology, in the Netherlands, in 2008. He was a research scientist, later a research assistant professor, at the University of Texas at Austin from 2012 to 2019. Since 2019, he has been an associate professor in the Computer Science Department at Carnegie Mellon University.[2]

Visualization of a solution of the Pythagorean Triples Problem

In May 2016 he, along with Oliver Kullmann and Victor W. Marek, used SAT solving to solve the Boolean Pythagorean triples problem.[3][4] The statement of the theorem they proved is

Theorem — The set {1, . . . , 7824} can be partitioned into two parts, such that no part contains a Pythagorean triple, while this is impossible for {1, . . . , 7825}.[5]

To prove this theorem, the possible colorings of {1, ..., 7825} were divided into a trillion subcases using a heuristic. Each subclass was then solved a Boolean satisfiability solver. Creating the proof took about 4 CPU-years of computation over a period of two days on the Stampede supercomputer at the Texas Advanced Computing Center and generated a 200 terabyte propositional proof (which was compressed to 68 gigabytes in the form of the list of subcases used).[5] The paper describing the proof was published in the SAT 2016 conference,[5] where it won the best paper award.[5] A $100 award that Ronald Graham originally offered for solving this problem in the 1980s was awarded to Heule.[3]

He used SAT solving to prove that Schur number 5 was 160 in 2017.[4][6] He proved Keller's conjecture in dimension seven in 2020.[7]

In 2018, Heule and Scott Aaronson received funding from the National Science Foundation to apply SAT solving to the Collatz conjecture.[7]

In 2023 together with Subercaseaux, he proved that the packing chromatic number of the infinite square grid is 15[8][9]

See also

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References

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  1. ^ Calmthout, Martijn van (June 6, 2016). "Bewijs dat nét op 200 laptops past" (PDF). de Volkskrant (in Dutch). p. 23. Archived (PDF) from the original on January 5, 2022. Retrieved May 11, 2021.
  2. ^ a b Heule, Marijn (August 20, 2019). "Marijn J.H. Heule" (PDF). www.cs.cmu.edu. Retrieved June 15, 2021.
  3. ^ a b Lamb, Evelyn (May 26, 2016). "Two-hundred-terabyte maths proof is largest ever". Nature. 534 (7605): 17–18. Bibcode:2016Natur.534...17L. doi:10.1038/nature.2016.19990. PMID 27251254.
  4. ^ a b Hartnett, Kevin (August 26, 2020). "Computer Scientists Attempt to Corner the Collatz Conjecture". Quanta Magazine. Retrieved March 8, 2021.
  5. ^ a b c d Heule, Marijn J. H.; Kullmann, Oliver; Marek, Victor W. (2016). "Solving and Verifying the Boolean Pythagorean Triples problem via Cube-and-Conquer". In Creignou, Nadia; Le Berre, Daniel (eds.). Theory and Applications of Satisfiability Testing – SAT 2016: 19th International Conference, Bordeaux, France, July 5-8, 2016, Proceedings. Lecture Notes in Computer Science. Vol. 9710. pp. 228–245. arXiv:1605.00723. doi:10.1007/978-3-319-40970-2_15. ISBN 978-3-319-40969-6.
  6. ^ Heule, Marijn J. H. (2017). "Schur Number Five". arXiv:1711.08076 [cs.LO].
  7. ^ a b Hartnett, Kevin (August 19, 2020). "Computer Search Settles 90-Year-Old Math Problem". Quanta Magazine. Retrieved March 8, 2021.
  8. ^ Subercaseaux, Bernardo; Heule, Marijn J. H. (January 23, 2023). "The Packing Chromatic Number of the Infinite Square Grid is 15". arXiv:2301.09757 [cs.DM].
  9. ^ Hartnett, Kevin (April 20, 2023). "The Number 15 Describes the Secret Limit of an Infinite Grid". Quanta Magazine. Retrieved April 20, 2023.
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