Codimension Growth of Lie algebras with a generalized action

Abstract

Let L be a finite dimensional Lie F-algebra endowed with a generalized action by an associative algebra H. We investigate the exponential growth rate of the sequence of H-graded codimensions cnH(L) of L which is a measure for the number of non-polynomial H-identities of L. More precisely, we construct the first example of an S-graded Lie algebra having a non-integer, even irrational, exponential growth rate n→ ∞ [n]cnS(L). Hereby S is a semigroup and an exact value is given. On the other hand, returning to general H, if L is semisimple and also semisimple for the H-action we prove the analog of Amitsur's conjecture (i.e. n→ ∞ [n]cnH(L) ∈ Z). Moreover if H=FS is a semigroup algebra the semisimplicity on L can be dropped which is in strong contract to the associative setting.