Monotonic Lagrangian tori of non standard type in toric manifolds.

	In recent papers we constructed examples of non standard
lagrangian tori in compact simply connected toric symplectic manifolds.
Using  new ``pseudotoric'' technique one  explained the appearence of non
standard lagrangian tori of  Chekanov type
and proposed a topological obstruction which separates  them from the
standard one. In the talk we construct non standard tori which satisfy the
Bohr -Sommerfeld condition with respect to the anticanonical class.  Then
we prove that if it exists a standard monotonic lagrangian torus in
smooth simply connected toric Fano variety equipped with canonical
symplectic form then it must exist monotonic lagrangian torus of the
Chekanov type.