Centrala begrepp
Yablo's paradox, which avoids self-reference, can be transformed into genuine mathematical theorems in Linear Temporal Logic by showing that certain operators do not have fixed-points in this logic.
Sammanfattning
The paper presents a formal treatment of Yablo's paradox in the framework of Linear Temporal Logic (LTL). The authors show that Yablo's paradox, which was designed to avoid self-reference, can be transformed into genuine mathematical theorems in LTL.
Key highlights:
- Yablo's paradox can be formalized in LTL as a fixed-point equation involving the "next" and "always" temporal operators.
- The authors prove that the operator x → #2¬x (which corresponds to the original Yablo paradox) does not have any fixed-points in LTL, making this a valid theorem.
- They also prove that the operators x → ¬2x and x → 2¬x do not have any fixed-points in LTL.
- The authors extend this approach to other versions of Yablo's paradox, such as the "sometimes", "almost always", and "infinitely often" variants, and derive corresponding theorems in LTL.
- The proofs follow the same logical structure as Yablo's original paradox, but are formalized within the LTL framework.