1 research outputs found
O-notation in algorithm analysis
We provide an extensive list of desirable properties for an O-notation --- as
used in algorithm analysis --- and reduce them to 8 primitive properties. We
prove that the primitive properties are equivalent to the definition of the
O-notation as linear dominance. We abstract the existing definitions of the
O-notation under local linear dominance, and show that it has a
characterization by limits over filters for positive functions. We define the
O-mappings as a general tool for manipulating the O-notation, and show that
Master theorems hold under linear dominance.Comment: Proved a minimal axiom-set for O-notatio