# Difference between revisions of "Matroids seminar/ideas"

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* The same set of authors wrote a series of three papers called “Log-Concave Polynomials I, II, & III”: they develop basis counting algorithms & prove the strongest version of Mason's conjecture | * The same set of authors wrote a series of three papers called “Log-Concave Polynomials I, II, & III”: they develop basis counting algorithms & prove the strongest version of Mason's conjecture | ||

** LCP I: “First nontrivial deterministic basis-counting algorithm for general matroids” https://arxiv.org/abs/1807.00929 | ** LCP I: “First nontrivial deterministic basis-counting algorithm for general matroids” https://arxiv.org/abs/1807.00929 | ||

− | ** Randomized algorithm for basis-counting. They also prove a 30-year-old conjecture about the exchange graph of the bases https://arxiv.org/abs/1811.01816 | + | ** LCP II: Randomized algorithm for basis-counting. They also prove a 30-year-old conjecture about the exchange graph of the bases https://arxiv.org/abs/1811.01816 |

− | ** The self-contained proof of Mason’s conjecture. This one is very short. https://arxiv.org/abs/1811.01600 | + | ** LCP III: The self-contained proof of Mason’s conjecture. This one is very short. https://arxiv.org/abs/1811.01600 |

## Latest revision as of 15:17, 16 February 2019

Looking to come talk at matroids seminar? Don't know what to talk about? Look no further! This page houses the world's finest selection of matroid-related talk ideas that we'd like to hear. Feel free to pile on your own ideas.

- Kashyap, Navin; Soljanin, Emina; Vontobel, Pascal Applications of Matroid Theory & Combinatorial Optimization to Information and Coding theory
- Matroids in coding theory
- Matroids in combinatorial optimization
- Matroids in information theory
- The same set of authors wrote a series of three papers called “Log-Concave Polynomials I, II, & III”: they develop basis counting algorithms & prove the strongest version of Mason's conjecture
- LCP I: “First nontrivial deterministic basis-counting algorithm for general matroids” https://arxiv.org/abs/1807.00929
- LCP II: Randomized algorithm for basis-counting. They also prove a 30-year-old conjecture about the exchange graph of the bases https://arxiv.org/abs/1811.01816
- LCP III: The self-contained proof of Mason’s conjecture. This one is very short. https://arxiv.org/abs/1811.01600