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Enhancing vehicle-mountable multiple object tracking systems with embeddable Ising machines. [PDF]
Nat CommunTatsumura K +4 more
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Efficient optimization accelerator framework for multi-state spin Ising problems. [PDF]
Nat CommunGarg C, Salahuddin S.
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Permutation-based combinatorial optimization problems in Fourier space [PDF]
Elorza Deias, Anne
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Towards a General Framework for Predicting and Explaining the Hardness of Graph-based Combinatorial Optimization Problems using Machine Learning and Association Rule Mining [PDF]
Bharat Sharman, Elkafi Hassini
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Oberwolfach Reports, 2022
Combinatorial Optimization deals with optimization problems defined on combinatorial structures such as graphs and networks. Motivated by diverse practical problem setups, the topic has developed into a rich mathematical discipline with many connections to other fields of Mathematics (such as, e.g., Combinatorics, Convex Optimization and Geometry, and ...
Karen I. Aardal +3 more
openaire +2 more sources
Combinatorial Optimization deals with optimization problems defined on combinatorial structures such as graphs and networks. Motivated by diverse practical problem setups, the topic has developed into a rich mathematical discipline with many connections to other fields of Mathematics (such as, e.g., Combinatorics, Convex Optimization and Geometry, and ...
Karen I. Aardal +3 more
openaire +2 more sources
Oberwolfach Reports, 2006
For more than 30 years, meetings on Combinatorial Optimization have established a long and successful tradition at Oberwolfach. In fact, Combinatorial Optimization is a particularly active research area with links to many other areas in mathematics, e.g., to Combinatorics, Graph Theory, Geometry and Integer Programming. Furthermore, there are important
Rainer E. Burkard +2 more
+4 more sources
For more than 30 years, meetings on Combinatorial Optimization have established a long and successful tradition at Oberwolfach. In fact, Combinatorial Optimization is a particularly active research area with links to many other areas in mathematics, e.g., to Combinatorics, Graph Theory, Geometry and Integer Programming. Furthermore, there are important
Rainer E. Burkard +2 more
+4 more sources
Oberwolfach Reports, 2009
Combinatorial Optimization remains a very lively discipline with strong connections to Combinatorics, Graph Theory, Geometry, and Integer Programming. For over thirty years, Oberwolfach workshops have had a central role in shaping the field, being the unique setting where the entire spectrum of the subject is covered, from fundamental theory to ...
William J. Cook +2 more
openaire +2 more sources
Combinatorial Optimization remains a very lively discipline with strong connections to Combinatorics, Graph Theory, Geometry, and Integer Programming. For over thirty years, Oberwolfach workshops have had a central role in shaping the field, being the unique setting where the entire spectrum of the subject is covered, from fundamental theory to ...
William J. Cook +2 more
openaire +2 more sources
Oberwolfach Reports, 2015
Combinatorial Optimization is an area of mathematics that thrives from a continual influx of new questions and problems from practice. Attacking these problems has required the development and combination of ideas and techniques from different mathematical areas including graph theory, matroids and combinatorics, convex and nonlinear optimization ...
Gérard P. Cornuéjols +2 more
openaire +1 more source
Combinatorial Optimization is an area of mathematics that thrives from a continual influx of new questions and problems from practice. Attacking these problems has required the development and combination of ideas and techniques from different mathematical areas including graph theory, matroids and combinatorics, convex and nonlinear optimization ...
Gérard P. Cornuéjols +2 more
openaire +1 more source