Nuprl - hol_sum Citations of bool

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Def

== Unit+Unit

is mentioned by

Thm* 'a,'b:S, u,v:'a+'b. rep_sum(u) = rep_sum(v)  'a'b  u = v [hrep_sum_inj]

Thm* 'a,'b:S.
Thm* (x:'a+'b. abs_sum(rep_sum(x)) = x  'a+'b)
Thm* & (x:('a'b). is_sum_rep(x) = ((rep_sum(abs_sum(x))) = x)) [sum_iso]

Def is_sum_rep == f:'a'b. u:'a+'b. (f = (rep_sum(u))) [his_sum_rep]

Def abs_sum == f:'a'b. @u:'a+'b. (rep_sum(u) = f  'a'b) [habs_sum]

Def rep_sum
Def == u:'a+'b. InjCase(u
Def == u:'a+'b. InjCase; p. b:. x:'a. y:'b. (x = p)b
Def == u:'a+'b. InjCase; q. b:. x:'a. y:'b. (y = q)b) [hrep_sum]

In prior sections: bool 1 hol hol bool hol min

Try larger context: HOLlib IF YOU CAN SEE THIS go to /sfa/Nuprl/Shared/Xindentation_hack_doc.html

hol sum Sections HOLlib Doc

Thm* 'a,'b:S, u,v:'a+'b. rep_sum(u) = rep_sum(v) 'a'b u = v	[hrep_sum_inj]
Thm* 'a,'b:S. Thm* (x:'a+'b. abs_sum(rep_sum(x)) = x 'a+'b) Thm* & (x:('a'b). is_sum_rep(x) = ((rep_sum(abs_sum(x))) = x))	[sum_iso]
Def is_sum_rep == f:'a'b. u:'a+'b. (f = (rep_sum(u)))	[his_sum_rep]
Def abs_sum == f:'a'b. @u:'a+'b. (rep_sum(u) = f 'a'b)	[habs_sum]
Def rep_sum Def == u:'a+'b. InjCase(u Def == u:'a+'b. InjCase; p. b:. x:'a. y:'b. (x = p)b Def == u:'a+'b. InjCase; q. b:. x:'a. y:'b. (y = q)b)	[hrep_sum]