Definition:Additive Function


 * Additive Function (Conventional Definition): $f \left({x + y}\right) = f \left({x}\right) + f \left({y}\right)$


 * Definition:Additive Function (Number Theory)
 * Definition:Additive Arithmetic Function
 * Definition:Additive Function on Integers: If $x \perp y$ then $f \left({x y}\right) = f \left({x}\right) + f \left({y}\right)$
 * Definition:Additive Function on UFD
 * Definition:Completely Additive Function

In measure theory, the concept has a completely different meaning:


 * Additive Function (Measure Theory): $A \cap B = \varnothing \implies f \left({A \cup B}\right) = f \left({A}\right) + f \left({B}\right)$
 * In this context, also see Sigma-Additive Function.

Also see

 * Definition:Additive
 * Definition:Multiplicative Function