We describe a generalization of the Sums-of-AM/GM-Exponential (SAGE) methodology for relative entropy relaxations of constrained signomial and polynomial optimization problems. Our approach leverages the fact that SAGE certificates conveniently and transparently blend with convex duality, in a way which enables partial dualization of certain structured constraints. This more general approach retains key properties of ordinary SAGE relaxations (e.g. sparsity preservation), and inspires a projective method of solution recovery which respects partial dualization. We illustrate the utility of our methodology with a range of examples from the global optimization literature, along with a publicly available software package
We present an extension of the scalar polynomial optimization by sum-of squares de-compositions [5] ...
Optimization over non-negative polynomials is fundamental for nonlinear systems analysis and control...
We consider the problem of minimizing a polynomial over a semialgebraic set defined by polynomial eq...
We describe a generalization of the Sums-of-AM/GM-Exponential (SAGE) methodology for relative entrop...
Certifying function nonnegativity is a ubiquitous problem in computational mathematics, with especia...
The Sums-of-AM/GM-Exponential (SAGE) approach to signomial and polynomial nonnegativity is a powerfu...
Here is a question that is easy to state, but often hard to answer: Is this function nonnegative ...
Optimization is at the heart of many engineering problems. Many optimization problems, however, are ...
IEEE When sum-of-squares (SOS) programs are recast as semidefinite programs (SDPs) using the standar...
The problem of unconstrained or constrained optimization occurs in many branches of mathematics and ...
33 pages, 2 figures, 5 tablesIn a first contribution, we revisit two certificates of positivity on (...
We study the problem of computing weighted sum-of-squares (WSOS) certificates for positive polynomia...
A polynomial SDP (semidefinite programs) minimizes a polynomial objective function over a feasible r...
Mixed-integer signomial optimization problems have broad applicability in engineering. Extending the...
Many design problems from diverse engineering disciplines can be formulated as signomial programs wi...
We present an extension of the scalar polynomial optimization by sum-of squares de-compositions [5] ...
Optimization over non-negative polynomials is fundamental for nonlinear systems analysis and control...
We consider the problem of minimizing a polynomial over a semialgebraic set defined by polynomial eq...
We describe a generalization of the Sums-of-AM/GM-Exponential (SAGE) methodology for relative entrop...
Certifying function nonnegativity is a ubiquitous problem in computational mathematics, with especia...
The Sums-of-AM/GM-Exponential (SAGE) approach to signomial and polynomial nonnegativity is a powerfu...
Here is a question that is easy to state, but often hard to answer: Is this function nonnegative ...
Optimization is at the heart of many engineering problems. Many optimization problems, however, are ...
IEEE When sum-of-squares (SOS) programs are recast as semidefinite programs (SDPs) using the standar...
The problem of unconstrained or constrained optimization occurs in many branches of mathematics and ...
33 pages, 2 figures, 5 tablesIn a first contribution, we revisit two certificates of positivity on (...
We study the problem of computing weighted sum-of-squares (WSOS) certificates for positive polynomia...
A polynomial SDP (semidefinite programs) minimizes a polynomial objective function over a feasible r...
Mixed-integer signomial optimization problems have broad applicability in engineering. Extending the...
Many design problems from diverse engineering disciplines can be formulated as signomial programs wi...
We present an extension of the scalar polynomial optimization by sum-of squares de-compositions [5] ...
Optimization over non-negative polynomials is fundamental for nonlinear systems analysis and control...
We consider the problem of minimizing a polynomial over a semialgebraic set defined by polynomial eq...