Every ω-regular positional property is expressible in LTL, with necessary and sufficient conditions for positional ω-regular properties and a proof that no such class can contain prefix-independent properties while remaining closed under Boolean operations.
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Positional Properties in Temporal Logic
Every ω-regular positional property is expressible in LTL, with necessary and sufficient conditions for positional ω-regular properties and a proof that no such class can contain prefix-independent properties while remaining closed under Boolean operations.