In this paper we show that each polynomial exponential functor on complex
finite-dimensional inner product spaces is defined up to equivalence of
monoidal functors by an involutive solution to the Yang-Baxter equation (an
involutive R-matrix), which determines an extremal character on S∞.
These characters are classified by Thoma parameters, and Thoma parameters
resulting from polynomial exponential functors are of a special kind. Moreover,
we show that each R-matrix with Thoma parameters of this kind yield a
corresponding polynomial exponential functor.
In the second part of the paper we use these functors to construct a higher
twist over SU(n) for a localisation of K-theory that generalises the one
given by the basic gerbe. We compute the indecomposable part of the rational
characteristic classes of these twists in terms of the Thoma parameters of
their R-matrices.Comment: 40 pages (fixed a mistake in Sec. 3.2, which does not affect the main
result of the paper, Lemma 3.3 has been isolated and moved to an appendix,
this agrees (up to minor layout changes) with the version accepted for
publication
