concretizes at some time
Alan Ruttenberg: This is a binary version of a ternary time-indexed, instance level, relation. The BFO reading of the binary relation 'concretizes at some time@en' is: exists t, exists_at(x,t) & exists_at(y,t) & 'concretizes@en'(x,y,t)
You may concretize a piece of software by installing it in your computer
You may concretize a recipe that you find in a cookbook by turning it into a plan which exists as a realizable dependent continuant in your head.
b concretizes c at t means: b is a specifically dependent continuant & c is a generically dependent continuant & for some independent continuant that is not a spatial region d, b s-depends_on d at t & c g-depends on d at t & if c migrates from bearer d to another bearer e than a copy of b will be created in e. (axiom label in BFO2 Reference: [075-002])
concretizes_st
(forall (x y t) (if (genericallyDependsOnAt x y t) (exists (z) (and (concretizesAt z x t) (specificallyDependsOnAt z y t))))) // axiom label in BFO2 CLIF: [076-001]
concretizesAt
(forall (x y t) (if (concretizesAt x y t) (and (SpecificallyDependentContinuant x) (GenericallyDependentContinuant y) (exists (z) (and (IndependentContinuant z) (specificallyDependsOnAt x z t) (genericallyDependsOnAt y z t)))))) // axiom label in BFO2 CLIF: [075-002]
if b g-depends on c at some time t, then there is some d, such that d concretizes b at t and d s-depends_on c at t. (axiom label in BFO2 Reference: [076-001])
you may concretize a poem as a pattern of memory traces in your head
specifically dependent continuant
generically dependent continuant