One-sided version of second derivative test: Difference between revisions

This article describes a test that can be used to determine whether a point in the domain of a function gives a point of local, endpoint, or absolute (global) maximum or minimum of the function, and/or to narrow down the possibilities for points where such maxima or minima occur.
View a complete list of such tests

This article describes a one-sided analogue of second derivative test

Statement

Suppose ${\displaystyle f}$ is a function and ${\displaystyle c}$ is a point in the domain of ${\displaystyle f}$. The one-sided version of second derivative test is a slight variation of the second derivative test that helps determine, using one-sided second derivatives, whether ${\displaystyle f}$ has a one-sided or two-sided local extremum at ${\displaystyle c}$.

What the test says: one-sided sign version

Continuity and differentiability assumption	Assumption on one-sided derivative at ${\displaystyle c}$	Assumption on one-sided second derivative at ${\displaystyle c}$	Conclusion about ${\displaystyle f}$ at ${\displaystyle c}$
${\displaystyle f}$ is left differentiable at ${\displaystyle c}$ and the left hand derivative function is itself left differentiable at ${\displaystyle c}$	${\displaystyle f'_{-}(c)=0}$	${\displaystyle (f'_{-})_{-}(c)<0}$	strict local maximum from the left
${\displaystyle f}$ is left differentiable at ${\displaystyle c}$ and the left hand derivative function is itself left differentiable at ${\displaystyle c}$	${\displaystyle f'_{-}(c)=0}$	${\displaystyle (f'_{-})_{-}(c)>0}$	strict local minimum from the left
${\displaystyle f}$ is left differentiable at ${\displaystyle c}$ and the left hand derivative function is itself left differentiable at ${\displaystyle c}$	${\displaystyle f'_{-}(c)=0}$	${\displaystyle (f'_{-})_{-}(c)=0}$	inconclusive, i.e., we may have a strict local maximum, strict local minimum, or neither from the left
${\displaystyle f}$ is right differentiable at ${\displaystyle c}$ and the right hand derivative function is itself right differentiable at ${\displaystyle c}$	${\displaystyle f'_{+}(c)=0}$	${\displaystyle (f'_{+})_{+}(c)<0}$	strict local maximum from the right
${\displaystyle f}$ is right differentiable at ${\displaystyle c}$ and the right hand derivative function is itself right differentiable at ${\displaystyle c}$	${\displaystyle f'_{+}(c)=0}$	${\displaystyle (f'_{+})_{+}(c)>0}$	strict local minimum from the right
${\displaystyle f}$ is right differentiable at ${\displaystyle c}$ and the right hand derivative function is itself right differentiable at ${\displaystyle c}$	${\displaystyle f'_{+}(c)=0}$	${\displaystyle (f'_{+})_{+}(c)=0}$	inconclusive, i.e., we may have a strict local maximum, strict local minimum, or neither from the right

What the test says: combined sign version

Note that if either one-sided second derivative is zero, the behavior from that side, and hence the overall behavior, is inconclusive.

Continuity and differentiability assumption	Assumption on derivative	Assumption on left second derivative ${\displaystyle (f'_{-})_{-}(c)}$	Assumption on right second derivative ${\displaystyle (f'_{+})_{+}(c)}$	Conclusion about ${\displaystyle f}$ at ${\displaystyle c}$
${\displaystyle f}$ is differentiable at ${\displaystyle c}$ and the left hand derivative and right hand derivative are themselves respectively left and right differentiable at ${\displaystyle c}$	${\displaystyle f'(c)=0}$	negative	negative	strict two-sided local maximum
${\displaystyle f}$ is differentiable at ${\displaystyle c}$ and the left hand derivative and right hand derivative are themselves respectively left and right differentiable at ${\displaystyle c}$	${\displaystyle f'(c)=0}$	positive	positive	strict two-sided local minimum
${\displaystyle f}$ is differentiable at ${\displaystyle c}$ and the left hand derivative and right hand derivative are themselves respectively left and right differentiable at ${\displaystyle c}$	${\displaystyle f'(c)=0}$	negative	positive	neither, it's a point of increase for the function
${\displaystyle f}$ is differentiable at ${\displaystyle c}$ and the left hand derivative and right hand derivative are themselves respectively left and right differentiable at ${\displaystyle c}$	${\displaystyle f'(c)=0}$	positive	negative	neither, it's a point of decrease for the function