EXT : thm -> thm

SYNOPSIS
Derives equality of functions from extentional equivalence.

DESCRIBE
When applied to a theorem A |- !x. t1 x = t2 x, the inference rule EXT returns the theorem A |- t1 = t2.
    A |- !x. t1 x = t2 x
   ----------------------  EXT          [where x is not free in t1 or t2]
        A |- t1 = t2

FAILURE
Fails if the theorem does not have the form indicated above, or if the variable x is free either of the functions t1 or t2.

COMMENTS
This rule is expressed as an equivalence in the theorem boolTheory.FUN_EQ_THM.

SEEALSO  AP_THM,   ETA_CONV,   FUN_EQ_CONV

HOL  Kananaskis 0