Monodromy of Galois representations and equal-rank subalgebra equivalence

Abstract

We study l-independence of monodromy groups Gl of any compatible system of l-adic representations (in the sense of Serre) of number field K assuming semisimplicity. We prove that the formal character of the derived group of the identity component of Gl is independent of l and the (complexified) Lie algebra gl of Gl satisfies an equal-rank subalgebra equivalence for all l. This equivalence is equivalent to the l-independence of the number of An factors for all n belonging to 6,9,10,11,... and the parity of A4 factors in gl.