# SZS status Theorem
# SZS status Theorem
# SZS output start CNFRefutation.
fof(1, conjecture,![X1]:![X2]:![X3]:s(t_bool,h4s_bools_in(s(X1,X2),s(t_fun(X1,t_bool),h4s_enumerals_enumeral(s(t_h4s_totos_toto(X1),X3),s(t_h4s_enumerals_bt(X1),h4s_enumerals_nt)))))=s(t_bool,f),file('i/f/enumeral/IN__bt__to__set_c0', ch4s_enumerals_INu_u_btu_u_tou_u_setu_c0)).
fof(3, axiom,~(p(s(t_bool,f))),file('i/f/enumeral/IN__bt__to__set_c0', aHLu_FALSITY)).
fof(6, axiom,![X5]:![X6]:((p(s(t_bool,X6))=>p(s(t_bool,X5)))=>((p(s(t_bool,X5))=>p(s(t_bool,X6)))=>s(t_bool,X6)=s(t_bool,X5))),file('i/f/enumeral/IN__bt__to__set_c0', ah4s_bools_IMPu_u_ANTISYMu_u_AX)).
fof(11, axiom,![X1]:![X7]:~(p(s(t_bool,h4s_bools_in(s(X1,X7),s(t_fun(X1,t_bool),h4s_predu_u_sets_empty))))),file('i/f/enumeral/IN__bt__to__set_c0', ah4s_predu_u_sets_NOTu_u_INu_u_EMPTY)).
fof(12, axiom,![X1]:![X3]:s(t_fun(X1,t_bool),h4s_enumerals_enumeral(s(t_h4s_totos_toto(X1),X3),s(t_h4s_enumerals_bt(X1),h4s_enumerals_nt)))=s(t_fun(X1,t_bool),h4s_predu_u_sets_empty),file('i/f/enumeral/IN__bt__to__set_c0', ah4s_enumerals_btu_u_tou_u_setu_c0)).
# SZS output end CNFRefutation
