Geometric programming

A geometric program (GP) is an optimization problem of the form

${\displaystyle \begin{array}{cc}\text{minimize}& f_0(x)\\ \text{subject to}& f_i(x)\le 1,i=1,\dots ,m\\ & g_i(x)=1,i=1,\dots ,p,\end{array}}$

where ${\displaystyle f_0,\dots ,f_m}$ are posynomials and ${\displaystyle g_1,\dots ,g_p}$ are monomials. In the context of geometric programming (unlike standard mathematics), a monomial is a function from ${\displaystyle {ℝ}_{++}^n}$ to ${\displaystyle ℝ}$ defined as

${\displaystyle x\mapsto c{x}_1^{a_1}{x}_2^{a_2}\cdots x_n^{a_n}}$

where ${\displaystyle c>0}$ and ${\displaystyle a_i\in ℝ}$. A posynomial is any sum of monomials.^[1][2]

Geometric programming is closely related to convex optimization: any GP can be made convex by means of a change of variables.^[2] GPs have numerous applications, including component sizing in IC design,^[3][4] aircraft design,^[5] maximum likelihood estimation for logistic regression in statistics, and parameter tuning of positive linear systems in control theory.^[6]

Geometric programs are not in general convex optimization problems, but they can be transformed to convex problems by a change of variables and a transformation of the objective and constraint functions. In particular, after performing the change of variables ${\displaystyle y_i=\log (x_i)}$ and taking the log of the objective and constraint functions, the functions ${\displaystyle f_i}$, i.e., the posynomials, are transformed into log-sum-exp functions, which are convex, and the functions ${\displaystyle g_i}$, i.e., the monomials, become affine. Hence, this transformation transforms every GP into an equivalent convex program.^[2] In fact, this log-log transformation can be used to convert a larger class of problems, known as log-log convex programming (LLCP), into an equivalent convex form.^[7]

Several software packages exist to assist with formulating and solving geometric programs.

• MOSEK is a commercial solver capable of solving geometric programs as well as other non-linear optimization problems.
• CVXOPT is an open-source solver for convex optimization problems.
• GPkit is a Python package for cleanly defining and manipulating geometric programming models. There are a number of example GP models written with this package here.
• GGPLAB is a MATLAB toolbox for specifying and solving geometric programs (GPs) and generalized geometric programs (GGPs).
• CVXPY is a Python-embedded modeling language for specifying and solving convex optimization problems, including GPs, GGPs, and LLCPs. ^[7]

• Signomial
• Clarence Zener

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