The Fubini Theorem for Normal Lie Subgroups of Index 2n
Abstract
Let + be a normal subgroup of index 2n of a group and γi ∈ + be involutions. We first prove that if = + (Z2(γ1) × ·s × Z2(γn)) then = (+ Z2(γ1) ·s Z2(γi-1)) (Z2(γi) × ·s × Z2(γn)), where i=2,·s,n. Second, we use this result to prove the well-known Fubini theorem for a subgroup of index 2n of a compact Lie group. Finally, we present an application to invariant theory.
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