Nuprl Definition : uniform-evd-proof
uniform-evd-proof(G;evd) == let p ⟵ ν(ex.fun-evd-proof(ex;<[], G>;<λM.evd, λx.(exception(ex; x))>)) in p
Definitions occuring in Statement :
fun-evd-proof: fun-evd-proof(exname;sequent;F),
uniform-evd-proof: uniform-evd-proof(sequent;fullevd),
nil: [],
callbyvalueall: callbyvalueall,
lambda: λx.A[x],
pair: <a, b>
Definitions occuring in definition :
lambda: λx.A[x],
pair: <a, b>,
nil: [],
fun-evd-proof: fun-evd-proof(exname;sequent;F),
callbyvalueall: callbyvalueall,
uniform-evd-proof: uniform-evd-proof(sequent;fullevd)
FDL editor aliases :
uniform-evd-proof
uniform-evd-proof
Latex:
uniform-evd-proof(G;evd) == let p \mleftarrow{}{} \mnu{}(ex.fun-evd-proof(ex;<[], G><\mlambda{}M.evd, \mlambda{}x.(exception(ex; x))>)\000C) in p
Date html generated:
2017_01_19-PM-02_32_29
Last ObjectModification:
2017_01_18-PM-06_44_46
Theory : minimal-first-order-logic
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