whose action is defined on M the space V of weakly
-invariant
Lagrangians (i.e. Lagrangians whose motion equations
left hand sides are
-invariant)
is studied. The problem is
reformulated in terms of the double complex of Lie algebra cochains with
values in the complex of Lagrangians. Calculating the cohomology of this
complex using the method of spectral sequences we arrive at the
hierarchy in the space V corresponding to the cohomologies of the
Lie algebra
and
configuration space M. This hierarchy
reflects properties of corresponding quantum mechanical Hamiltonians.