We construct families of Newton-Okounkov bodies for the free group character varieties and configuration spaces of any connected reductive group. We use this construction to give a proof that these spaces are Cohen- Macaulay.
|Number of pages||25|
|Journal||Transactions of the American Mathematical Society|
|State||Published - 2016|
Bibliographical notePublisher Copyright:
© 2015 American Mathematical Society.
- Character variety
- Configuration space
- Newton-Okounkov body
ASJC Scopus subject areas
- Mathematics (all)
- Applied Mathematics