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Line 1: The '''Karmarkar-Karp bin packing ~~algorithm~~algorithms''' isare anseveral related [[approximation algorithm]] for the [[bin packing problem]].<ref name=":12">{{cite journal\|last1=Karmarkar\|first1=Narendra\|last2=Karp\|first2=Richard M.\|date=November 1982\|title=An efficient approximation scheme for the one-dimensional bin-packing problem\|url=https://ieeexplore.ieee.org/document/4568405/references#references\|journal=23rd Annual Symposium on Foundations of Computer Science (SFCS 1982)\|pages=312–320\|doi=10.1109/SFCS.1982.61\|s2cid=18583908}}</ref> The bin packing problem is a problem of packing items of different sizes into bins of identical capacity, such that the total number of bins is as small as possible. Finding the optimal solution is [[NP-hardness\|computationally hard]]. [[Narendra Karmarkar\|Karmarkar]] and [[Richard M. Karp\|Karp]] devised an algorithm that runs in [[Polynomial-time\|polynomial time]] and finds a solution with at most <math>\mathrm{OPT} + \mathcal{O}(\log^2(OPT))</math> bins, where OPT is the number of bins in the optimal solution. Their algorithm was considered a breakthrough in the study of bin packing: the previously-known algorithms found multiplicative approximation, where the number of bins was at most <math>r\cdot \mathrm{OPT}+s</math> for some constants <math>r>1, s>0</math>, or at most <math>(1+\varepsilon)\mathrm{OPT} + 1</math>.<ref>{{cite journal\|last1=Fernandez de la Vega\|first1=W.\|last2=Lueker\|first2=G. S.\|date=1981\|title=Bin packing can be solved within 1 + ε in linear time\|journal=Combinatorica\|language=en\|volume=1\|issue=4\|pages=349–355\|doi=10.1007/BF02579456\|issn=1439-6912\|s2cid=10519631}}</ref> Their techniques were improved later, to provide even better approximations: an algorithm by Rothvoss<ref name=":2">{{Cite journal\|last=Rothvoß\|first=T.\|date=2013-10-01\|title=Approximating Bin Packing within O(log OPT * Log Log OPT) Bins\|url=https://ieeexplore.ieee.org/document/6686137\|journal=2013 IEEE 54th Annual Symposium on Foundations of Computer Science\|volume=\|pages=20–29\|arxiv=1301.4010\|doi=10.1109/FOCS.2013.11\|isbn=978-0-7695-5135-7\|via=\|s2cid=15905063}}</ref> uses at most <math>\mathrm{OPT} + O(\log(\mathrm{OPT})\cdot \log\log(\mathrm{OPT}))</math>bins, and an algorithm by Hoberg and Rothvoss<ref name=":3">{{Citation\|last1=Hoberg\|first1=Rebecca\|title=A Logarithmic Additive Integrality Gap for Bin Packing\|date=2017-01-01\|url=https://epubs.siam.org/doi/abs/10.1137/1.9781611974782.172\|work=Proceedings of the 2017 Annual ACM-SIAM Symposium on Discrete Algorithms\|pages=2616–2625\|series=Proceedings\|publisher=Society for Industrial and Applied Mathematics\|doi=10.1137/1.9781611974782.172\|isbn=978-1-61197-478-2\|access-date=2021-02-10\|last2=Rothvoss\|first2=Thomas\|s2cid=1647463}}</ref> uses at most <math>\mathrm{OPT} + O(\log(\mathrm{OPT}))</math> bins. Their techniques were improved later, to provide even better approximations: an algorithm by Rothvoss<ref name=":2">{{Cite journal\|last=Rothvoß\|first=T.\|date=2013-10-01\|title=Approximating Bin Packing within O(log OPT * Log Log OPT) Bins\|url=https://ieeexplore.ieee.org/document/6686137\|journal=2013 IEEE 54th Annual Symposium on Foundations of Computer Science\|volume=\|pages=20–29\|arxiv=1301.4010\|doi=10.1109/FOCS.2013.11\|isbn=978-0-7695-5135-7\|via=\|s2cid=15905063}}</ref> uses at most <math>\mathrm{OPT} + O(\log(\mathrm{OPT})\cdot \log\log(\mathrm{OPT}))</math>bins, and an algorithm by Hoberg and Rothvoss<ref name=":3">{{Citation\|last1=Hoberg\|first1=Rebecca\|title=A Logarithmic Additive Integrality Gap for Bin Packing\|date=2017-01-01\|url=https://epubs.siam.org/doi/abs/10.1137/1.9781611974782.172\|work=Proceedings of the 2017 Annual ACM-SIAM Symposium on Discrete Algorithms\|pages=2616–2625\|series=Proceedings\|publisher=Society for Industrial and Applied Mathematics\|doi=10.1137/1.9781611974782.172\|isbn=978-1-61197-478-2\|access-date=2021-02-10\|last2=Rothvoss\|first2=Thomas\|s2cid=1647463}}</ref> uses at most <math>\mathrm{OPT} + O(\log(\mathrm{OPT}))</math> bins. == Input == Line 17 ⟶ 15: == Guarantees == Karmarkar and Karp ~~actually present~~presented four different algorithms. ~~Their~~The run-time of all these algorithms depends on a function <math>T(\cdot,\cdot)</math>, which is a polynomial function describing the time it takes to solve the [[configuration linear program]]: <math>T(m,n)\in O(m^8\log{m}\log^2{n} + m^4 n \log{m}\log{n} )</math>. The algorithms attain the following guarantees: * At most <math>\mathrm{OPT} + \mathcal{O}(\log^2 OPT)</math> bins, with run-time in <math>O(T(FOPT,n))</math>. Line 24 ⟶ 22: * At most <math>(1+\epsilon)\mathrm{OPT} + \mathcal{O}(\epsilon^{-2})</math> bins, with run-time in <math>O(T(\epsilon^{-2},n))</math>, where <math>\epsilon>0</math> is a constant. == ~~Algorithm~~Algorithms == == References ==

Karmarkar–Karp bin packing algorithms: Difference between revisions