Proof of proveit.logic.sets.equivalence.fold_set_not_equiv theorem¶
In [1]:
import proveit
from proveit.logic.sets.equivalence import set_not_equiv_def
theory = proveit.Theory() # the theorem's theory
In [2]:
%proving fold_set_not_equiv
With these allowed/disallowed theorem/theory presumptions (e.g., to avoid circular dependencies), we begin our proof of
fold_set_not_equiv:
(see dependencies)
fold_set_not_equiv:
(see dependencies)
In [3]:
set_not_equiv_def
In [4]:
set_not_equiv_def_inst = set_not_equiv_def.instantiate()
set_not_equiv_def_inst: ⊢ 
In [5]:
set_not_equiv_def_inst.derive_left_via_equality(assumptions=[set_not_equiv_def_inst.rhs])
