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Convex optimization

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(Redirected from Concave program) Subfield of mathematical optimization

Convex optimization is a subfield of mathematical optimization that studies the problem of minimizing convex functions over convex sets (or, equivalently, maximizing concave functions over convex sets). Many classes of convex optimization problems admit polynomial-time algorithms, whereas mathematical optimization is in general NP-hard.

Definition

Abstract form

A convex optimization problem is defined by two ingredients:

  • The objective function, which is a real-valued convex function of n variables, f : D R n R {\displaystyle f:{\mathcal {D}}\subseteq \mathbb {R} ^{n}\to \mathbb {R} } ;
  • The feasible set, which is a convex subset C R n {\displaystyle C\subseteq \mathbb {R} ^{n}} .

The goal of the problem is to find some x C {\displaystyle \mathbf {x^{\ast }} \in C} attaining

inf { f ( x ) : x C } {\displaystyle \inf\{f(\mathbf {x} ):\mathbf {x} \in C\}} .

In general, there are three options regarding the existence of a solution:

  • If such a point x* exists, it is referred to as an optimal point or solution; the set of all optimal points is called the optimal set; and the problem is called solvable.
  • If f {\displaystyle f} is unbounded below over C {\displaystyle C} , or the infimum is not attained, then the optimization problem is said to be unbounded.
  • Otherwise, if C {\displaystyle C} is the empty set, then the problem is said to be infeasible.

Standard form

A convex optimization problem is in standard form if it is written as

minimize x f ( x ) s u b j e c t   t o g i ( x ) 0 , i = 1 , , m h i ( x ) = 0 , i = 1 , , p , {\displaystyle {\begin{aligned}&{\underset {\mathbf {x} }{\operatorname {minimize} }}&&f(\mathbf {x} )\\&\operatorname {subject\ to} &&g_{i}(\mathbf {x} )\leq 0,\quad i=1,\dots ,m\\&&&h_{i}(\mathbf {x} )=0,\quad i=1,\dots ,p,\end{aligned}}}

where:

  • x R n {\displaystyle \mathbf {x} \in \mathbb {R} ^{n}} is the vector of optimization variables;
  • The objective function f : D R n R {\displaystyle f:{\mathcal {D}}\subseteq \mathbb {R} ^{n}\to \mathbb {R} } is a convex function;
  • The inequality constraint functions g i : R n R {\displaystyle g_{i}:\mathbb {R} ^{n}\to \mathbb {R} } , i = 1 , , m {\displaystyle i=1,\ldots ,m} , are convex functions;
  • The equality constraint functions h i : R n R {\displaystyle h_{i}:\mathbb {R} ^{n}\to \mathbb {R} } , i = 1 , , p {\displaystyle i=1,\ldots ,p} , are affine transformations, that is, of the form: h i ( x ) = a i x b i {\displaystyle h_{i}(\mathbf {x} )=\mathbf {a_{i}} \cdot \mathbf {x} -b_{i}} , where a i {\displaystyle \mathbf {a_{i}} } is a vector and b i {\displaystyle b_{i}} is a scalar.

The feasible set C {\displaystyle C} of the optimization problem consists of all points x D {\displaystyle \mathbf {x} \in {\mathcal {D}}} satisfying the inequality and the equality constraints. This set is convex because D {\displaystyle {\mathcal {D}}} is convex, the sublevel sets of convex functions are convex, affine sets are convex, and the intersection of convex sets is convex.

Many optimization problems can be equivalently formulated in this standard form. For example, the problem of maximizing a concave function f {\displaystyle f} can be re-formulated equivalently as the problem of minimizing the convex function f {\displaystyle -f} . The problem of maximizing a concave function over a convex set is commonly called a convex optimization problem.

Epigraph form (standard form with linear objective)

In the standard form it is possible to assume, without loss of generality, that the objective function f is a linear function. This is because any program with a general objective can be transformed into a program with a linear objective by adding a single variable t and a single constraint, as follows:

minimize x , t t s u b j e c t   t o f ( x ) t 0 g i ( x ) 0 , i = 1 , , m h i ( x ) = 0 , i = 1 , , p , {\displaystyle {\begin{aligned}&{\underset {\mathbf {x} ,t}{\operatorname {minimize} }}&&t\\&\operatorname {subject\ to} &&f(\mathbf {x} )-t\leq 0\\&&&g_{i}(\mathbf {x} )\leq 0,\quad i=1,\dots ,m\\&&&h_{i}(\mathbf {x} )=0,\quad i=1,\dots ,p,\end{aligned}}}

Conic form

Every convex program can be presented in a conic form, which means minimizing a linear objective over the intersection of an affine plane and a convex cone:

minimize x c T x s u b j e c t   t o x ( b + L ) K {\displaystyle {\begin{aligned}&{\underset {\mathbf {x} }{\operatorname {minimize} }}&&c^{T}x\\&\operatorname {subject\ to} &&x\in (b+L)\cap K\end{aligned}}}

where K is a closed pointed convex cone, L is a linear subspace of R, and b is a vector in R. A linear program in standard form in the special case in which K is the nonnegative orthant of R.

Eliminating linear equality constraints

It is possible to convert a convex program in standard form, to a convex program with no equality constraints. Denote the equality constraints hi(x)=0 as Ax=b, where A has n columns. If Ax=b is infeasible, then of course the original problem is infeasible. Otherwise, it has some solution x0 , and the set of all solutions can be presented as: Fz+x0, where z is in R, k=n-rank(A), and F is an n-by-k matrix. Substituting x = Fz+x0 in the original problem gives:

minimize x f ( F z + x 0 ) s u b j e c t   t o g i ( F z + x 0 ) 0 , i = 1 , , m {\displaystyle {\begin{aligned}&{\underset {\mathbf {x} }{\operatorname {minimize} }}&&f(\mathbf {F\mathbf {z} +\mathbf {x} _{0}} )\\&\operatorname {subject\ to} &&g_{i}(\mathbf {F\mathbf {z} +\mathbf {x} _{0}} )\leq 0,\quad i=1,\dots ,m\\\end{aligned}}}

where the variables are z. Note that there are rank(A) fewer variables. This means that, in principle, one can restrict attention to convex optimization problems without equality constraints. In practice, however, it is often preferred to retain the equality constraints, since they might make some algorithms more efficient, and also make the problem easier to understand and analyze.

Special cases

The following problem classes are all convex optimization problems, or can be reduced to convex optimization problems via simple transformations:

A hierarchy of convex optimization problems. (LP: linear programming, QP: quadratic programming, SOCP second-order cone program, SDP: semidefinite programming, CP: conic optimization.)

Other special cases include;

Properties

The following are useful properties of convex optimization problems:

  • every local minimum is a global minimum;
  • the optimal set is convex;
  • if the objective function is strictly convex, then the problem has at most one optimal point.

These results are used by the theory of convex minimization along with geometric notions from functional analysis (in Hilbert spaces) such as the Hilbert projection theorem, the separating hyperplane theorem, and Farkas' lemma.

Algorithms

Unconstrained and equality-constrained problems

The convex programs easiest to solve are the unconstrained problems, or the problems with only equality constraints. As the equality constraints are all linear, they can be eliminated with linear algebra and integrated into the objective, thus converting an equality-constrained problem into an unconstrained one.

In the class of unconstrained (or equality-constrained) problems, the simplest ones are those in which the objective is quadratic. For these problems, the KKT conditions (which are necessary for optimality) are all linear, so they can be solved analytically.

For unconstrained (or equality-constrained) problems with a general convex objective that is twice-differentiable, Newton's method can be used. It can be seen as reducing a general unconstrained convex problem, to a sequence of quadratic problems.Newton's method can be combined with line search for an appropriate step size, and it can be mathematically proven to converge quickly.

Other efficient algorithms for unconstrained minimization are gradient descent (a special case of steepest descent).

General problems

The more challenging problems are those with inequality constraints. A common way to solve them is to reduce them to unconstrained problems by adding a barrier function, enforcing the inequality constraints, to the objective function. Such methods are called interior point methods.They have to be initialized by finding a feasible interior point using by so-called phase I methods, which either find a feasible point or show that none exist. Phase I methods generally consist of reducing the search in question to a simpler convex optimization problem.

Convex optimization problems can also be solved by the following contemporary methods:

Subgradient methods can be implemented simply and so are widely used. Dual subgradient methods are subgradient methods applied to a dual problem. The drift-plus-penalty method is similar to the dual subgradient method, but takes a time average of the primal variables.

Lagrange multipliers

Main article: Lagrange multiplier
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Consider a convex minimization problem given in standard form by a cost function f ( x ) {\displaystyle f(x)} and inequality constraints g i ( x ) 0 {\displaystyle g_{i}(x)\leq 0} for 1 i m {\displaystyle 1\leq i\leq m} . Then the domain X {\displaystyle {\mathcal {X}}} is:

X = { x X | g 1 ( x ) , , g m ( x ) 0 } . {\displaystyle {\mathcal {X}}=\left\{x\in X\vert g_{1}(x),\ldots ,g_{m}(x)\leq 0\right\}.}

The Lagrangian function for the problem is

L ( x , λ 0 , λ 1 , , λ m ) = λ 0 f ( x ) + λ 1 g 1 ( x ) + + λ m g m ( x ) . {\displaystyle L(x,\lambda _{0},\lambda _{1},\ldots ,\lambda _{m})=\lambda _{0}f(x)+\lambda _{1}g_{1}(x)+\cdots +\lambda _{m}g_{m}(x).}

For each point x {\displaystyle x} in X {\displaystyle X} that minimizes f {\displaystyle f} over X {\displaystyle X} , there exist real numbers λ 0 , λ 1 , , λ m , {\displaystyle \lambda _{0},\lambda _{1},\ldots ,\lambda _{m},} called Lagrange multipliers, that satisfy these conditions simultaneously:

  1. x {\displaystyle x} minimizes L ( y , λ 0 , λ 1 , , λ m ) {\displaystyle L(y,\lambda _{0},\lambda _{1},\ldots ,\lambda _{m})} over all y X , {\displaystyle y\in X,}
  2. λ 0 , λ 1 , , λ m 0 , {\displaystyle \lambda _{0},\lambda _{1},\ldots ,\lambda _{m}\geq 0,} with at least one λ k > 0 , {\displaystyle \lambda _{k}>0,}
  3. λ 1 g 1 ( x ) = = λ m g m ( x ) = 0 {\displaystyle \lambda _{1}g_{1}(x)=\cdots =\lambda _{m}g_{m}(x)=0} (complementary slackness).

If there exists a "strictly feasible point", that is, a point z {\displaystyle z} satisfying

g 1 ( z ) , , g m ( z ) < 0 , {\displaystyle g_{1}(z),\ldots ,g_{m}(z)<0,}

then the statement above can be strengthened to require that λ 0 = 1 {\displaystyle \lambda _{0}=1} .

Conversely, if some x {\displaystyle x} in X {\displaystyle X} satisfies (1)–(3) for scalars λ 0 , , λ m {\displaystyle \lambda _{0},\ldots ,\lambda _{m}} with λ 0 = 1 {\displaystyle \lambda _{0}=1} then x {\displaystyle x} is certain to minimize f {\displaystyle f} over X {\displaystyle X} .

Software

There is a large software ecosystem for convex optimization. This ecosystem has two main categories: solvers on the one hand and modeling tools (or interfaces) on the other hand.

Solvers implement the algorithms themselves and are usually written in C. They require users to specify optimization problems in very specific formats which may not be natural from a modeling perspective. Modeling tools are separate pieces of software that let the user specify an optimization in higher-level syntax. They manage all transformations to and from the user's high-level model and the solver's input/output format.

The table below shows a mix of modeling tools (such as CVXPY and Convex.jl) and solvers (such as CVXOPT and MOSEK). This table is by no means exhaustive.

Program Language Description FOSS? Ref
CVX MATLAB Interfaces with SeDuMi and SDPT3 solvers; designed to only express convex optimization problems. Yes
CVXMOD Python Interfaces with the CVXOPT solver. Yes
CVXPY Python
Convex.jl Julia Disciplined convex programming, supports many solvers. Yes
CVXR R Yes
YALMIP MATLAB, Octave Interfaces with CPLEX, GUROBI, MOSEK, SDPT3, SEDUMI, CSDP, SDPA, PENNON solvers; also supports integer and nonlinear optimization, and some nonconvex optimization. Can perform robust optimization with uncertainty in LP/SOCP/SDP constraints. Yes
LMI lab MATLAB Expresses and solves semidefinite programming problems (called "linear matrix inequalities") No
LMIlab translator Transforms LMI lab problems into SDP problems. Yes
xLMI MATLAB Similar to LMI lab, but uses the SeDuMi solver. Yes
AIMMS Can do robust optimization on linear programming (with MOSEK to solve second-order cone programming) and mixed integer linear programming. Modeling package for LP + SDP and robust versions. No
ROME Modeling system for robust optimization. Supports distributionally robust optimization and uncertainty sets. Yes
GloptiPoly 3 MATLAB,

Octave

Modeling system for polynomial optimization. Yes
SOSTOOLS Modeling system for polynomial optimization. Uses SDPT3 and SeDuMi. Requires Symbolic Computation Toolbox. Yes
SparsePOP Modeling system for polynomial optimization. Uses the SDPA or SeDuMi solvers. Yes
CPLEX Supports primal-dual methods for LP + SOCP. Can solve LP, QP, SOCP, and mixed integer linear programming problems. No
CSDP C Supports primal-dual methods for LP + SDP. Interfaces available for MATLAB, R, and Python. Parallel version available. SDP solver. Yes
CVXOPT Python Supports primal-dual methods for LP + SOCP + SDP. Uses Nesterov-Todd scaling. Interfaces to MOSEK and DSDP. Yes
MOSEK Supports primal-dual methods for LP + SOCP. No
SeDuMi MATLAB, Octave, MEX Solves LP + SOCP + SDP. Supports primal-dual methods for LP + SOCP + SDP. Yes
SDPA C++ Solves LP + SDP. Supports primal-dual methods for LP + SDP. Parallelized and extended precision versions are available. Yes
SDPT3 MATLAB, Octave, MEX Solves LP + SOCP + SDP. Supports primal-dual methods for LP + SOCP + SDP. Yes
ConicBundle Supports general-purpose codes for LP + SOCP + SDP. Uses a bundle method. Special support for SDP and SOCP constraints. Yes
DSDP Supports general-purpose codes for LP + SDP. Uses a dual interior point method. Yes
LOQO Supports general-purpose codes for SOCP, which it treats as a nonlinear programming problem. No
PENNON Supports general-purpose codes. Uses an augmented Lagrangian method, especially for problems with SDP constraints. No
SDPLR Supports general-purpose codes. Uses low-rank factorization with an augmented Lagrangian method. Yes
GAMS Modeling system for linear, nonlinear, mixed integer linear/nonlinear, and second-order cone programming problems. No
Optimization Services XML standard for encoding optimization problems and solutions.

Applications

Convex optimization can be used to model problems in a wide range of disciplines, such as automatic control systems, estimation and signal processing, communications and networks, electronic circuit design, data analysis and modeling, finance, statistics (optimal experimental design), and structural optimization, where the approximation concept has proven to be efficient. Convex optimization can be used to model problems in the following fields:

Extensions

Extensions of convex optimization include the optimization of biconvex, pseudo-convex, and quasiconvex functions. Extensions of the theory of convex analysis and iterative methods for approximately solving non-convex minimization problems occur in the field of generalized convexity, also known as abstract convex analysis.

See also

Notes

  1. ^ Nesterov & Nemirovskii 1994
  2. Murty, Katta; Kabadi, Santosh (1987). "Some NP-complete problems in quadratic and nonlinear programming". Mathematical Programming. 39 (2): 117–129. doi:10.1007/BF02592948. hdl:2027.42/6740. S2CID 30500771.
  3. Sahni, S. "Computationally related problems," in SIAM Journal on Computing, 3, 262--279, 1974.
  4. Pardalos, Panos M.; Vavasis, Stephen A. (1991). "Quadratic programming with one negative eigenvalue is NP-hard". Journal of Global Optimization. 1: 15–22. doi:10.1007/BF00120662.
  5. Hiriart-Urruty, Jean-Baptiste; Lemaréchal, Claude (1996). Convex analysis and minimization algorithms: Fundamentals. Springer. p. 291. ISBN 9783540568506.
  6. Ben-Tal, Aharon; Nemirovskiĭ, Arkadiĭ Semenovich (2001). Lectures on modern convex optimization: analysis, algorithms, and engineering applications. pp. 335–336. ISBN 9780898714913.
  7. ^ Boyd, Stephen; Vandenberghe, Lieven (2004). Convex Optimization (PDF). Cambridge University Press. ISBN 978-0-521-83378-3. Retrieved 12 Apr 2021.
  8. "Optimization Problem Types - Convex Optimization". 9 January 2011.
  9. ^ Arkadi Nemirovsky (2004). Interior point polynomial-time methods in convex programming.
  10. Agrawal, Akshay; Verschueren, Robin; Diamond, Steven; Boyd, Stephen (2018). "A rewriting system for convex optimization problems" (PDF). Control and Decision. 5 (1): 42–60. arXiv:1709.04494. doi:10.1080/23307706.2017.1397554. S2CID 67856259.
  11. Rockafellar, R. Tyrrell (1993). "Lagrange multipliers and optimality" (PDF). SIAM Review. 35 (2): 183–238. CiteSeerX 10.1.1.161.7209. doi:10.1137/1035044.
  12. For methods for convex minimization, see the volumes by Hiriart-Urruty and Lemaréchal (bundle) and the textbooks by Ruszczyński, Bertsekas, and Boyd and Vandenberghe (interior point).
  13. Nesterov, Yurii; Arkadii, Nemirovskii (1995). Interior-Point Polynomial Algorithms in Convex Programming. Society for Industrial and Applied Mathematics. ISBN 978-0898715156.
  14. Peng, Jiming; Roos, Cornelis; Terlaky, Tamás (2002). "Self-regular functions and new search directions for linear and semidefinite optimization". Mathematical Programming. 93 (1): 129–171. doi:10.1007/s101070200296. ISSN 0025-5610. S2CID 28882966.
  15. "Numerical Optimization". Springer Series in Operations Research and Financial Engineering. 2006. doi:10.1007/978-0-387-40065-5. ISBN 978-0-387-30303-1.
  16. Beavis, Brian; Dobbs, Ian M. (1990). "Static Optimization". Optimization and Stability Theory for Economic Analysis. New York: Cambridge University Press. p. 40. ISBN 0-521-33605-8.
  17. ^ Borchers, Brian. "An Overview Of Software For Convex Optimization" (PDF). Archived from the original (PDF) on 2017-09-18. Retrieved 12 Apr 2021.
  18. "Welcome to CVXPY 1.1 — CVXPY 1.1.11 documentation". www.cvxpy.org. Retrieved 2021-04-12.
  19. Udell, Madeleine; Mohan, Karanveer; Zeng, David; Hong, Jenny; Diamond, Steven; Boyd, Stephen (2014-10-17). "Convex Optimization in Julia". arXiv:1410.4821 .
  20. "Disciplined Convex Optimiation - CVXR". www.cvxgrp.org. Retrieved 2021-06-17.
  21. Chritensen/Klarbring, chpt. 4.
  22. Schmit, L.A.; Fleury, C. 1980: Structural synthesis by combining approximation concepts and dual methods. J. Amer. Inst. Aeronaut. Astronaut 18, 1252-1260
  23. ^ Boyd, Stephen; Diamond, Stephen; Zhang, Junzi; Agrawal, Akshay. "Convex Optimization Applications" (PDF). Archived (PDF) from the original on 2015-10-01. Retrieved 12 Apr 2021.
  24. ^ Malick, Jérôme (2011-09-28). "Convex optimization: applications, formulations, relaxations" (PDF). Archived (PDF) from the original on 2021-04-12. Retrieved 12 Apr 2021.
  25. Ben Haim Y. and Elishakoff I., Convex Models of Uncertainty in Applied Mechanics, Elsevier Science Publishers, Amsterdam, 1990
  26. Ahmad Bazzi, Dirk TM Slock, and Lisa Meilhac. "Online angle of arrival estimation in the presence of mutual coupling." 2016 IEEE Statistical Signal Processing Workshop (SSP). IEEE, 2016.

References

  • Ruszczyński, Andrzej (2006). Nonlinear Optimization. Princeton University Press.
  • Schmit, L.A.; Fleury, C. 1980: Structural synthesis by combining approximation concepts and dual methods. J. Amer. Inst. Aeronaut. Astronaut 18, 1252-1260

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