Independence relations induced by ideals
Abstract
Inspired by the non-meager independence nm introduced by Krupiński [3], we study further possible independence relations induced by ideals and provide a general framework for this topic. We show that the independence relation Haar induced by Haar null ideals is a good example for locally compact groups and provide an example showing Haar≠ nm. Moreover, we introduce an order on the collection of all well-behaved independence relations and conjecture that nm is the maximum one for Polish groups. We prove the conjecture under the extra hypothesis of σ-compactness. For Lie groups, we discuss SO(3) and SE(2) as examples, and prove that the independence relation is unique for nilpotent Lie groups.
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