We consider polyhedral separation of sets as a possible tool in supervised classification. In particular, we focus on the optimization model introduced by Astorino and Gaudioso (J Optim Theory Appl 112(2):265–293, 2002) and adopt its reformulation in difference of convex (DC) form. We tackle the problem by adapting the algorithm for DC programming known as DCA. We present the results of the implementation of DCA on a number of benchmark classification datasets
There is an existing exact algorithm that solves DC programming problems if one component of the DC ...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
Generalizing both mixed-integer linear optimization and convex optimization, mixed-integer convex op...
We consider polyhedral separation of sets as a possible tool in supervised classification. In partic...
summary:We investigate diverse separation properties of two convex polyhedral sets for the case when...
summary:Separation is a famous principle and separation properties are important for optimization th...
For piecewise linear functions f:Rn↦R we show how their abs-linear representation can be extended to...
We treat the feature selection problem in the support vector machine (SVM) framework by adopting an ...
In the context of learning theory many efforts have been devoted to developing classification algori...
We treat the Feature Selection problem in the Support Vector Machine (SVM) framework by adopting an ...
We show how (now familiar) hierarchical representations of (convex) polyhedra can be used to answer ...
© 2017 IEEE. We propose the novel data analysis algorithm which allows to identify exactly the posit...
We propose a new approach to the strict separation of convex polyhedra. This approach is based on th...
In this paper, a piecewise linear classifier based on polyhedral conic separation is developed. This...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
There is an existing exact algorithm that solves DC programming problems if one component of the DC ...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
Generalizing both mixed-integer linear optimization and convex optimization, mixed-integer convex op...
We consider polyhedral separation of sets as a possible tool in supervised classification. In partic...
summary:We investigate diverse separation properties of two convex polyhedral sets for the case when...
summary:Separation is a famous principle and separation properties are important for optimization th...
For piecewise linear functions f:Rn↦R we show how their abs-linear representation can be extended to...
We treat the feature selection problem in the support vector machine (SVM) framework by adopting an ...
In the context of learning theory many efforts have been devoted to developing classification algori...
We treat the Feature Selection problem in the Support Vector Machine (SVM) framework by adopting an ...
We show how (now familiar) hierarchical representations of (convex) polyhedra can be used to answer ...
© 2017 IEEE. We propose the novel data analysis algorithm which allows to identify exactly the posit...
We propose a new approach to the strict separation of convex polyhedra. This approach is based on th...
In this paper, a piecewise linear classifier based on polyhedral conic separation is developed. This...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
There is an existing exact algorithm that solves DC programming problems if one component of the DC ...
This thesis deals with a pattern classification problem, which geometrically implies data separation...
Generalizing both mixed-integer linear optimization and convex optimization, mixed-integer convex op...