Pseudoconvex function

In convex analysis and the calculus of variations, branches of mathematics, a pseudoconvex function is a function that behaves like a convex function with respect to finding its local minima, but need not actually be convex. Informally, a differentiable function is pseudoconvex if it is increasing in any direction where it has a positive directional derivative.

Consider a differentiable function ${\displaystyle f:X\subseteq \mathbb {R} ^{n}\rightarrow \mathbb {R} }$, defined on a (nonempty) convex open set ${\displaystyle X}$ of the finite-dimensional Euclidean space ${\displaystyle \mathbb {R} ^{n}}$. This function is said to be pseudoconvex if the following property holds: ^[1]

for all ${\displaystyle x,y\in X:\quad \nabla f(x)\cdot (y-x)\geq 0\Rightarrow f(y)\geq f(x)}$.

Equivalently:

for all ${\displaystyle x,y\in X:\quad f(y)<f(x)\Rightarrow \nabla f(x)\cdot (y-x)<0}$.

Here ${\displaystyle \nabla f}$ is the gradient of ${\displaystyle f}$, defined by: ${\displaystyle \nabla f=\left({\frac {\partial f}{\partial x_{1}}},\dots ,{\frac {\partial f}{\partial x_{n}}}\right).}$

Every convex function is pseudoconvex, but the converse is not true. For example, the function ƒ(x) = x + x³ is pseudoconvex but not convex. Any pseudoconvex function is quasiconvex, but the converse is not true since the function ƒ(x) = x³ is quasiconvex but not pseudoconvex.

Pseudoconvexity is primarily of interest because a point x* is a local minimum of a pseudoconvex function ƒ if and only if it is a stationary point of ƒ, which is to say that the gradient of ƒ vanishes at x*: ${\displaystyle \nabla f(x^{*})=0.}$^[2]

The notion of pseudoconvexity can be generalized to nondifferentiable functions as follows.^[3] Given any function ${\displaystyle f:X\rightarrow \mathbb {R} }$, we can define the upper Dini derivative of ${\displaystyle f}$ by:

${\displaystyle f^{+}(x,u)=\limsup _{h\to 0^{+}}{\frac {f(x+hu)-f(x)}{h}};}$

where u is any unit vector. The function is said to be pseudoconvex if it is increasing in any direction where the upper Dini derivative is positive. More precisely, this is characterized in terms of the subdifferential ${\displaystyle \partial f}$ as follows:

For all ${\displaystyle x,y\in X}$: if ${\displaystyle x\in \partial f(x)}$ is such that ${\displaystyle \langle x^{*},y-x\rangle \geq 0}$, then ${\displaystyle f(x)\leq f(z)}$, for all ${\displaystyle z\in [x,y]}$;

where ${\displaystyle [x,y]}$ denotes the line segment adjoining x and y.

A pseudoconcave function is a function whose negative is pseudoconvex. A pseudolinear function is a function that is both pseudoconvex and pseudoconcave.^[4] For example, linear–fractional programs have pseudolinear objective functions and linear–inequality constraints: These properties allow fractional–linear problems to be solved by a variant of the simplex algorithm (of George B. Dantzig).^[5][6][7] Given a vector-valued function η, there is a more general notion of η-pseudoconvexity^[8][9] and η-pseudolinearity wherein classical pseudoconvexity and pseudolinearity pertain to the case when η(x, y) = y - x.

• Pseudoconvexity
• Convex function
• Quasiconvex function

• Floudas, Christodoulos A.; Pardalos, Panos M. (2001), "Generalized monotone multivalued maps", Encyclopedia of Optimization, Springer, p. 227, ISBN 978-0-7923-6932-5.
• Mangasarian, O. L. (January 1965). "Pseudo-Convex Functions". Journal of the Society for Industrial and Applied Mathematics Series A Control. 3 (2): 281–290. doi:10.1137/0303020. ISSN 0363-0129. {{cite journal}}: Invalid |ref=harv (help).
• Rapcsak, T. (1991-02-15). "On pseudolinear functions". European Journal of Operational Research. 50 (3): 353–360. doi:10.1016/0377-2217(91)90267-Y. ISSN 0377-2217. {{cite journal}}: Invalid |ref=harv (help)