Positive and negative parts

In mathematics, the positive part of a real or extended real-valued function is defined by the formula $${\displaystyle f^{+}(x)=\max(f(x),0)={\begin{cases}f(x)&{\text{ if }}f(x)>0\\0&{\text{ otherwise.}}\end{cases}}}$$

Intuitively, the graph of ${\displaystyle f^{+}}$ is obtained by taking the graph of ${\displaystyle f}$, 'chopping off' the part under the x-axis, and letting ${\displaystyle f^{+}}$ take the value zero there.

Similarly, the negative part of f is defined as $${\displaystyle f^{-}(x)=\max(-f(x),0)=-\min(f(x),0)={\begin{cases}-f(x)&{\text{ if }}f(x)<0\\0&{\text{ otherwise}}\end{cases}}}$$

Note that both f⁺ and f⁻ are non-negative functions. A peculiarity of terminology is that the 'negative part' is neither negative nor a part (like the imaginary part of a complex number is neither imaginary nor a part).

The function f can be expressed in terms of f⁺ and f⁻ as $${\displaystyle f=f^{+}-f^{-}.}$$

Also note that $${\displaystyle |f|=f^{+}+f^{-}.}$$

Using these two equations one may express the positive and negative parts as $${\displaystyle {\begin{aligned}f^{+}&={\frac {|f|+f}{2}}\\f^{-}&={\frac {|f|-f}{2}}.\end{aligned}}}$$

Another representation, using the Iverson bracket is $${\displaystyle {\begin{aligned}f^{+}&=[f>0]f\\f^{-}&=-[f<0]f.\end{aligned}}}$$

One may define the positive and negative part of any function with values in a linearly ordered group.

The unit ramp function is the positive part of the identity function.