Nuprl Definition : int_ring
ℤ-rng ==
<ℤ, λu,v. (u =z v), λu,v. u ≤z v, λu,v. (u + v), 0, λu.(-u), λu,v. (u * v), 1, λu,v. if (v =z 0) then inr ⋅ else inl \000C(u ÷ v) fi >
Definitions occuring in Statement :
le_int: i ≤z j,
ifthenelse: if b then t else f fi ,
eq_int: (i =z j),
it: ⋅,
lambda: λx.A[x],
pair: <a, b>,
inr: inr x ,
inl: inl x,
divide: n ÷ m,
multiply: n * m,
add: n + m,
minus: -n,
natural_number: $n,
int: ℤ
Definitions occuring in definition :
int: ℤ,
le_int: i ≤z j,
add: n + m,
minus: -n,
multiply: n * m,
pair: <a, b>,
lambda: λx.A[x],
ifthenelse: if b then t else f fi ,
eq_int: (i =z j),
natural_number: $n,
inr: inr x ,
it: ⋅,
inl: inl x,
divide: n ÷ m
Latex:
\mBbbZ{}-rng ==
<\mBbbZ{}
, \mlambda{}u,v. (u =\msubz{} v)
, \mlambda{}u,v. u \mleq{}z v
, \mlambda{}u,v. (u + v)
, 0
, \mlambda{}u.(-u)
, \mlambda{}u,v. (u * v)
, 1
, \mlambda{}u,v. if (v =\msubz{} 0) then inr \mcdot{} else inl (u \mdiv{} v) fi >
Date html generated:
2016_05_15-PM-00_25_37
Last ObjectModification:
2015_09_23-AM-06_26_05
Theory : rings_1
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