This paper studies the problem of constructing robust classifiers when the training is plagued with uncertainty. The problem is posed as a Chance-Constrained Program (CCP) which ensures that the uncertain data points are classified correctly with high probability. Unfortunately such a CCP turns out to be intractable. The key novelty is in employing Bernstein bounding schemes to relax the CCP as a convex second order cone program whose solution is guaranteed to satisfy the probabilistic constraint. Prior to this work, only the Chebyshev based relaxations were exploited in learning algorithms. Bernstein bounds employ richer partial information and hence can be far less conservative than Chebyshev bounds. Due to this efficient modeling of unce...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
The objective of uncertainty quantification is to certify that a given physical, engineering or econ...
Chebyshev-inequality-based convex relaxations of Chance-Constrained Programs (CCPs) are shown to be ...
This paper studies the problem of constructing robust classifiers when the training is plagued with ...
Abstract This paper studies the problem of constructing robust classifiers when the training is plag...
This paper presents a Chance-constraint Programming approach for constructing maximum-margin classif...
The central theme of the thesis is to study linear and non linear SVM formulations in the presence o...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
This thesis explores Chance-Constrained Programming (CCP) in the context of learning. It is shown th...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
Assuming an ellipsoidal model of uncertainty a robust formulation for classifying noisy data is pres...
We propose a robust probability classifier model to address classification problems with data uncert...
Chance constrained problems are optimization problems where one or more constraints ensure that the ...
Abstract. Our goal is to build robust optimization problems for making decisions based on complex da...
We present a data-driven approach for distri-butionally robust chance constrained optimization probl...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
The objective of uncertainty quantification is to certify that a given physical, engineering or econ...
Chebyshev-inequality-based convex relaxations of Chance-Constrained Programs (CCPs) are shown to be ...
This paper studies the problem of constructing robust classifiers when the training is plagued with ...
Abstract This paper studies the problem of constructing robust classifiers when the training is plag...
This paper presents a Chance-constraint Programming approach for constructing maximum-margin classif...
The central theme of the thesis is to study linear and non linear SVM formulations in the presence o...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
This thesis explores Chance-Constrained Programming (CCP) in the context of learning. It is shown th...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
Assuming an ellipsoidal model of uncertainty a robust formulation for classifying noisy data is pres...
We propose a robust probability classifier model to address classification problems with data uncert...
Chance constrained problems are optimization problems where one or more constraints ensure that the ...
Abstract. Our goal is to build robust optimization problems for making decisions based on complex da...
We present a data-driven approach for distri-butionally robust chance constrained optimization probl...
Many engineering problems can be cast as optimization problems subject to convex constraints that ar...
The objective of uncertainty quantification is to certify that a given physical, engineering or econ...
Chebyshev-inequality-based convex relaxations of Chance-Constrained Programs (CCPs) are shown to be ...