In mathematical optimization, fractional programming is a generalization of linear-fractional programming. The objective function in a fractional program is a ratio of two functions that are in general nonlinear. The ratio to be optimized often describes some kind of efficiency of a system.
Let f , g , h j , j = 1 , … , m {\displaystyle f,g,h_{j},j=1,\ldots ,m} be real-valued functions defined on a set S 0 ⊂ R n {\displaystyle \mathbf {S} _{0}\subset \mathbb {R} ^{n}} . Let S = { x ∈ S 0 : h j ( x ) ≤ 0 , j = 1 , … , m } {\displaystyle \mathbf {S} =\{{\boldsymbol {x}}\in \mathbf {S} _{0}:h_{j}({\boldsymbol {x}})\leq 0,j=1,\ldots ,m\}} . The nonlinear program
where g ( x ) > 0 {\displaystyle g({\boldsymbol {x}})>0} on S {\displaystyle \mathbf {S} } , is called a fractional program.
A fractional program in which f is nonnegative and concave, g is positive and convex, and S is a convex set is called a concave fractional program. If g is affine, f does not have to be restricted in sign. The linear fractional program is a special case of a concave fractional program where all functions f , g , h j , j = 1 , … , m {\displaystyle f,g,h_{j},j=1,\ldots ,m} are affine.
The function q ( x ) = f ( x ) / g ( x ) {\displaystyle q({\boldsymbol {x}})=f({\boldsymbol {x}})/g({\boldsymbol {x}})} is semistrictly quasiconcave on S. If f and g are differentiable, then q is pseudoconcave. In a linear fractional program, the objective function is pseudolinear.
By the transformation y = x g ( x ) ; t = 1 g ( x ) {\displaystyle {\boldsymbol {y}}={\frac {\boldsymbol {x}}{g({\boldsymbol {x}})}};t={\frac {1}{g({\boldsymbol {x}})}}} , any concave fractional program can be transformed to the equivalent parameter-free concave program[1]
If g is affine, the first constraint is changed to t g ( y t ) = 1 {\displaystyle tg({\frac {\boldsymbol {y}}{t}})=1} and the assumption that g is positive may be dropped. Also, it simplifies to g ( y ) = 1 {\displaystyle g({\boldsymbol {y}})=1} .
The Lagrangian dual of the equivalent concave program is