In symplectic geoemtry, the notion of monotinicity is an analogue of that of positive curvature in algebraic geometry.
A symplectic manifold is said to be strongly monotone if for some constant &:tau > 0, one has the cohomological relation:
In symplectic geoemtry, the notion of monotinicity is an analogue of that of positive curvature in algebraic geometry.
A symplectic manifold is said to be strongly monotone if for some constant &:tau > 0, one has the cohomological relation: