Publication at Faculty of Mathematics and Physics |
2022
Abstract
We introduce a ring of Z-valued functions on a complete fan Δcalled Grothendieck weights to describe the ordinary operational K-theory of the associated toric variety X. These functions satisfy a K-theoretic analogue of the balancing condition for Minkowski weights, which is induced by a presentation of the Grothendieck group of X.
We explicitly give a combinatorial presentation in low dimensions, and relate Grothendieck weights to other fan-based invariants such as piecewise exponential functions and Minkowski weights. As an application, we give an example of a projective toric surface Xsuch that the forgetful map K°T(X) RIGHTWARDS ARROWK°(X)is not surjective.