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Log-Concave Polynomials III: Mason's Ultra-Log-Concavity Conjecture for Independent Sets of Matroids.

, , , and . CoRR, (2018)

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Log-concave polynomials IV: approximate exchange, tight mixing times, and near-optimal sampling of forests., , , , and . STOC, page 408-420. ACM, (2021)Log-Concave Polynomials, Entropy, and a Deterministic Approximation Algorithm for Counting Bases of Matroids., , and . FOCS, page 35-46. IEEE Computer Society, (2018)Log-Concave Polynomials IV: Exchange Properties, Tight Mixing Times, and Faster Sampling of Spanning Trees., , , and . CoRR, (2020)Edges of the Barvinok-Novik Orbitope.. Discret. Comput. Geom., 46 (3): 479-487 (2011)Computing Hermitian determinantal representations of hyperbolic curves., , , and . Int. J. Algebra Comput., 25 (8): 1327-1336 (2015)Log-concave polynomials II: high-dimensional walks and an FPRAS for counting bases of a matroid., , , and . STOC, page 1-12. ACM, (2019)Log-Concave Polynomials III: Mason's Ultra-Log-Concavity Conjecture for Independent Sets of Matroids., , , and . CoRR, (2018)Determinantal representations of hyperbolic plane curves: An elementary approach., and . J. Symb. Comput., (2013)Lower bounds for optimal alignments of binary sequences.. Discret. Appl. Math., 157 (15): 3341-3346 (2009)Log-Concave Polynomials II: High-Dimensional Walks and an FPRAS for Counting Bases of a Matroid., , , and . CoRR, (2018)