quasitransitivity

Summary

quasitransitivity is a mathematical property^[1].

Key Facts

• quasitransitivity's instance of is recorded as mathematical property^[2].
• quasitransitivity's facet of is recorded as quasitransitive relation^[3].
• quasitransitivity's defining formula is recorded as \forall x,y,z \in X (x \mathcal{R} y \land \neg(y \mathcal{R} x) \land y \mathcal{R} z \land \neg(z \mathcal{R} y) \implies x \mathcal{R} z \land \neg(z \mathcal{R} x))^[4].
• quasitransitivity's maintained by WikiProject is recorded as WikiProject Mathematics^[5].
• quasitransitivity's characteristic of is recorded as binary relation^[6].