| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 5499998 | Journal of Geometry and Physics | 2017 | 14 Pages |
Abstract
We prove that the Kontsevich tetrahedral flow PÌ=Qa:b(P), the right-hand side of which is a linear combination of two differential monomials of degree four in a bi-vector P on an affine real Poisson manifold Nn, does infinitesimally preserve the space of Poisson bi-vectors on Nn if and only if the two monomials in Qa:b(P) are balanced by the ratio a:b=1:6. The proof is explicit; it is written in the language of Kontsevich graphs.
Related Topics
Physical Sciences and Engineering
Mathematics
Mathematical Physics
Authors
A. Bouisaghouane, R. Buring, A. Kiselev,