Graded Lie algebras with finite polydepth
Abstract
If A is a graded connected algebra then we define a new invariant, polydepth A, which is finite if ExtA*(M,A) ≠ 0 for some A-module M of at most polynomial growth. Theorem 1: If f : X Y is a continuous map of finite category, and if the orbits of H*( Y) acting in the homology of the homotopy fibre grow at most polynomially, then H*( Y) has finite polydepth. Theorem 2: If L is a graded Lie algebra and polydepth UL is finite then either L is solvable and UL grows at most polynomially or else for some integer d and all r, Σi=k+1k+d dim Li ≥ kr, k≥ some k(r).
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