arXiv:1710.03312 Abstract | arXiv Analytics

arXiv:1710.03312 [math.CO]Abstract References Reviews Resources

Tropicalization, symmetric polynomials, and complexity

Published 2017-10-09Version 1

D. Grigoriev-G. Koshevoy recently proved that tropical Schur polynomials have (at worst) polynomial tropical semiring complexity. They also conjectured tropical skew Schur polynomials have at least exponential complexity; we establish a polynomial complexity upper bound. Our proof uses results about (stable) Schubert polynomials, due to R. P. Stanley and S. Billey-W. Jockusch-R. P. Stanley, together with a sufficient condition for polynomial complexity that is connected to the saturated Newton polytope property.

Comments: 8 pages

Categories: math.CO, cs.CC

Keywords: symmetric polynomials, polynomial complexity upper bound, tropicalization, conjectured tropical skew schur polynomials, saturated newton polytope property

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arXiv:1710.03312 [math.CO]Abstract References Reviews Resources

Tropicalization, symmetric polynomials, and complexity

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Tropicalization, symmetric polynomials, and complexity

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arXiv:1710.03312 [math.CO]Abstract References Reviews Resources