Nuprl Definition : counit-unit-adjunction

F -| G ==
{p:nat-trans(B;B;functor-comp(G;F);1) × nat-trans(A;A;1;functor-comp(F;G))|
counit-unit-equations(A;B;F;G;fst(p);snd(p))}

Definitions occuring in Statement : counit-unit-equations: counit-unit-equations(D;C;F;G;eps;eta), id_functor: 1, functor-comp: functor-comp(F;G), nat-trans: nat-trans(C;D;F;G), pi1: fst(t), pi2: snd(t), set: {x:A| B[x]} , product: x:A × B[x]
Definitions occuring in definition : set: {x:A| B[x]} , product: x:A × B[x], nat-trans: nat-trans(C;D;F;G), id_functor: 1, functor-comp: functor-comp(F;G), counit-unit-equations: counit-unit-equations(D;C;F;G;eps;eta), pi1: fst(t), pi2: snd(t)
FDL editor aliases : counit-unit-adjunction

Latex:
F -| G == \{p:nat-trans(B;B;functor-comp(G;F);1) \mtimes{} nat-trans(A;A;1;functor-comp(F;G))| counit-unit-equations(A;B;F;G;fst(p);snd(p))\} Date html generated: 2020_05_20-AM-07_58_10 Last ObjectModification: 2017_01_16-PM-00_21_13 Theory : small!categories Home Index