Nuprl - Definition Cascade for bi-tree

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	Who Cites bi-tree?

bi-tree	Def bi-tree(T;to;from) Def == bi-graph(T;to;from) Def == & (i,j:\|T\|. Def == & (p:Edge(T) List. Def == & (lconnects(p;i;j) & (q:Edge(T) List. lconnects(q;i;j) q = p)) Def == & (L:\|T\| List. i:\|T\|. (i L)) Def == & \|T\|

bi-graph-edge	Def Edge(G) == {l:IdLnk\| i:\|G\|. (l from(i)) }

bi-graph	Def bi-graph(G;to;from) Def == i:\|G\|. Def == (lto(i).destination(l) = i Def == & (G(source(l))) Def == & (l from(source(l))) Def == & (lnk-inv(l) from(i))) Def == & (lfrom(i).source(l) = i Def == & & (G(destination(l))) Def == & & (l to(destination(l))) Def == & & (lnk-inv(l) to(i)))

rset	Def \|R\| == {i:Id\| (R(i)) }

	Thm* R:(Id). \|R\| Type

l_all	Def (xL.P(x)) == x:T. (x L) P(x)

	Thm* T:Type, L:T List, P:(TProp). (xL.P(x)) Prop

l_member	Def (x l) == i:. i<\|\|l\|\| & x = l[i] T

	Thm* T:Type, x:T, l:T List. (x l) Prop

lconnects	Def lconnects(p;i;j) Def == lpath(p) Def == & (\|\|p\|\| = 0 i = j Id) Def == & (\|\|p\|\| = 0 i = source(hd(p)) & j = destination(last(p)))

	Thm* p:IdLnk List, i,j:Id. lconnects(p;i;j) Prop

assert	Def b == if b True else False fi

	Thm* b:. b Prop

lpath	Def lpath(p) Def == i:(\|\|p\|\|-1). Def == destination(p[i]) = source(p[(i+1)]) & p[(i+1)] = lnk-inv(p[i]) IdLnk

	Thm* p:IdLnk List. lpath(p) Prop

IdLnk	Def IdLnk == IdId

	Thm* IdLnk Type

Id	Def Id == Atom

	Thm* Id Type

last	Def last(L) == L[(\|\|L\|\|-1)]

	Thm* T:Type, L:T List. null(L) last(L) T

select	Def l[i] == hd(nth_tl(i;l))

	Thm* A:Type, l:A List, n:. 0n n<\|\|l\|\| l[n] A

length	Def \|\|as\|\| == Case of as; nil 0 ; a.as' \|\|as'\|\|+1 (recursive)

	Thm* A:Type, l:A List. \|\|l\|\|

	Thm* \|\|nil\|\|

nat	Def == {i:\| 0i }

	Thm* Type

ldst	Def destination(l) == 1of(2of(l))

	Thm* l:IdLnk. destination(l) Id

hd	Def hd(l) == Case of l; nil "?" ; h.t h

	Thm* A:Type, l:A List. \|\|l\|\|1 hd(l) A

lsrc	Def source(l) == 1of(l)

	Thm* l:IdLnk. source(l) Id

int_seg	Def {i..j} == {k:\| i k < j }

	Thm* m,n:. {m..n} Type

lelt	Def i j < k == ij & j<k

le	Def AB == B<A

	Thm* i,j:. (ij) Prop

not	Def A == A False

	Thm* A:Prop. (A) Prop

lnk-inv	Def lnk-inv(l) == <1of(2of(l)),1of(l),2of(2of(l))>

nth_tl	Def nth_tl(n;as) == if n0 as else nth_tl(n-1;tl(as)) fi (recursive)

	Thm* A:Type, as:A List, i:. nth_tl(i;as) A List

pi2	Def 2of(t) == t.2

	Thm* A:Type, B:(AType), p:(a:AB(a)). 2of(p) B(1of(p))

pi1	Def 1of(t) == t.1

	Thm* A:Type, B:(AType), p:(a:AB(a)). 1of(p) A

tl	Def tl(l) == Case of l; nil nil ; h.t t

	Thm* A:Type, l:A List. tl(l) A List

le_int	Def ij == j<i

	Thm* i,j:. (ij)

lt_int	Def i<j == if i<j true ; false fi

	Thm* i,j:. (i<j)

bnot	Def b == if b false else true fi

	Thm* b:. b