Nuprl Definition : flattice-order

flattice-order(X;as;bs) ==  (∀b∈bs.(∃x∈b. (∃y∈b. y = flip-union(x) ∈ (X + X))) ∨ (∃a∈as. a ⊆ b))

Definitions occuring in Statement : flip-union: flip-union(x), l_contains: A ⊆ B, l_exists: (∃x∈L. P[x]), l_all: (∀x∈L.P[x]), or: P ∨ Q, union: left + right, equal: s = t ∈ T
Definitions occuring in definition : l_all: (∀x∈L.P[x]), or: P ∨ Q, equal: s = t ∈ T, flip-union: flip-union(x), l_exists: (∃x∈L. P[x]), l_contains: A ⊆ B, union: left + right
FDL editor aliases : flattice-order

Latex:
flattice-order(X;as;bs) == (\mforall{}b\mmember{}bs.(\mexists{}x\mmember{}b. (\mexists{}y\mmember{}b. y = flip-union(x))) \mvee{} (\mexists{}a\mmember{}as. a \msubseteq{} b)) Date html generated: 2017_02_21-AM-09_57_18 Last ObjectModification: 2017_01_24-AM-10_47_07 Theory : lattices Home Index