Right half-plane

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Robinson's joint consistency theorem is an important theorem of mathematical logic. It is related to Craig interpolation and Beth definability.

The classical formulation of Robinson's joint consistency theorem is as follows:

Let T1 and T2 be first-order theories. If T1 and T2 are consistent and the intersection T1T2 is complete (in the common language of T1 and T2), then the union T1T2 is consistent. Note that a theory is complete if it decides every formula, i.e. either Tφ or T¬φ.

Since the completeness assumption is quite hard to fulfill, there is a variant of the theorem:

Let T1 and T2 be first-order theories. If T1 and T2 are consistent and if there is no formula φ in the common language of T1 and T2 such that T1φ and T2¬φ, then the union T1T2 is consistent.

References

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