Nuprl Definition : uniform-evd-to-proof

uniform-evd-to-proof(G;evd) == let p ⟵ ν(ex.ex-evd-proof(ex;<[], G>;<λM.evd, [], []>)) in p

Definitions occuring in Statement : ex-evd-proof: ex-evd-proof(exname;sequent;F), nil: [], callbyvalueall: callbyvalueall, lambda: λx.A[x], pair: <a, b>
Definitions occuring in definition : callbyvalueall: callbyvalueall, ex-evd-proof: ex-evd-proof(exname;sequent;F), lambda: λx.A[x], pair: <a, b>, nil: []
FDL editor aliases : uniform-evd-to-proof

Latex:
uniform-evd-to-proof(G;evd) == let p \mleftarrow{}{} \mnu{}(ex.ex-evd-proof(ex;<[], G><\mlambda{}M.evd, [], []>)) in p Date html generated: 2016_05_15-PM-10_33_17 Last ObjectModification: 2015_09_25-PM-05_18_34 Theory : minimal-first-order-logic Home Index