Lower Bounds for Real Solutions to Sparse Polynomial Systems

E. Soprunova and F. Sottile.

We show how to construct sparse polynomial systems that have non-trivial lower bounds on their numbers of real solutions. These are unmixed systems associated to certain polytopes. For the order polytope of a poset P this lower bound is the sign-imbalance of P and it holds if all maximal chains of P have length of the same parity. This theory also gives lower bounds in the real Schubert calculus through sagbi degeneration of the Grassmannian to a toric variety, and thus recovers a result of Eremenko and Gabrielov.



Talk by Soprunova on MSRI Streaming video.

The manuscript in postscript, and in pdf.
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