We give a polynomial-time algorithm for learning high-dimensional halfspaces with margins in $d$-dimensional space to within desired TV distance when the ambient distribution is an unknown affine transformation of the $d$-fold product of an (unknown) symmetric one-dimensional logconcave distribution, and the halfspace is introduced by deleting at least an $\epsilon$ fraction of the data in one of the component distributions. Notably, our algorithm does not need labels and establishes the unique (and efficient) identifiability of the hidden halfspace under this distributional assumption. The sample and time complexity of the algorithm are polynomial in the dimension and $1/\epsilon$. The algorithm uses only the first two moments of suitable ...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
Polynomial approximations to boolean functions have led to many positive results in com-puter scienc...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
We give the first algorithm that (under distributional assumptions) efficiently learns halfspaces in...
Many popular learning algorithms (E.g. Kernel SVM, logistic regression, Lasso, and Fourier-Transform...
AbstractWe present a polynomial-time algorithm to learn an intersection of a constant number of half...
We consider the problem of learning a halfspace in the agnostic framework of Kearns et al., where a ...
In this thesis I study the problem of testing halfspaces under arbitrary probability distributions, ...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...
We prove risk bounds for halfspace learning when the data dimensionality is allowed to be larger tha...
In this paper we revisit some classic problems on classification under misspecification. In particul...
AbstractWe give a new algorithm for learning intersections of halfspaces with a margin, i.e. under t...
We give a new algorithm for learning intersections of halfspaces with a margin, i.e. under the assum...
We present a polynomial-time algorithm to learn an intersection of a constant number of halfspaces i...
A remarkable recent paper by Rubinfeld and Vasilyan (2022) initiated the study of \emph{testable lea...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
Polynomial approximations to boolean functions have led to many positive results in com-puter scienc...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
We give the first algorithm that (under distributional assumptions) efficiently learns halfspaces in...
Many popular learning algorithms (E.g. Kernel SVM, logistic regression, Lasso, and Fourier-Transform...
AbstractWe present a polynomial-time algorithm to learn an intersection of a constant number of half...
We consider the problem of learning a halfspace in the agnostic framework of Kearns et al., where a ...
In this thesis I study the problem of testing halfspaces under arbitrary probability distributions, ...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...
We prove risk bounds for halfspace learning when the data dimensionality is allowed to be larger tha...
In this paper we revisit some classic problems on classification under misspecification. In particul...
AbstractWe give a new algorithm for learning intersections of halfspaces with a margin, i.e. under t...
We give a new algorithm for learning intersections of halfspaces with a margin, i.e. under the assum...
We present a polynomial-time algorithm to learn an intersection of a constant number of halfspaces i...
A remarkable recent paper by Rubinfeld and Vasilyan (2022) initiated the study of \emph{testable lea...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
Polynomial approximations to boolean functions have led to many positive results in com-puter scienc...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...