James M. Borger
Published 2013-10-11, updated 2015-09-09Version 2
We extend the big and $p$-typical Witt vector functors from commutative rings to commutative semirings. In the case of the big Witt vectors, this is a repackaging of some standard facts about monomial and Schur positivity in the combinatorics of symmetric functions. In the $p$-typical case, it uses positivity with respect to an apparently new basis of the $p$-typical symmetric functions. We also give explicit descriptions of the big Witt vectors of the natural numbers and of the nonnegative reals, the second of which is a restatement of Edrei's theorem on totally positive power series. Finally we give some negative results on the relationship between truncated Witt vectors and $k$-Schur positivity, and we give ten open questions.
Comments: The form as it will appear in the published volume. Some minor improvements to the text, some new references
Boolean Witt vectors and an integral Edrei-Thoma theorem
KP solitons and total positivity for the Grassmannian
Acyclic matchings on Bruhat intervals and applications to total positivity
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