Hilbert series of modules over Lie algebroids
Abstract
We consider modules M over Lie algebroids gA which are of finite type over a local noetherian ring A. Using ideals J⊂ A such that gA · J⊂ J and the length gA(M/JM)< ∞ we can define in a natural way the Hilbert series of M with respect to the defining ideal J. This notion is in particular studied for modules over the Lie algebroid of k-linear derivations gA=TA/k(I) that preserve an ideal I⊂ A, for example when A= On, the ring of convergent power series. Hilbert series over Stanley-Reisner rings are also considered.
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