AbstractWe give the first polynomial time algorithm to learn any function of a constant number of halfspaces under the uniform distribution on the Boolean hypercube to within any constant error parameter. We also give the first quasipolynomial time algorithm for learning any Boolean function of a polylog number of polynomial-weight halfspaces under any distribution on the Boolean hypercube. As special cases of these results we obtain algorithms for learning intersections and thresholds of halfspaces. Our uniform distribution learning algorithms involve a novel non-geometric approach to learning halfspaces; we use Fourier techniques together with a careful analysis of the noise sensitivity of functions of halfspaces. Our algorithms for learn...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
AbstractIn Valiant's protocol for learning, the classes of functions which are known learnable in po...
In this paper we consider the problem of learning a linear threshold function (a halfspace in n dime...
We give the first polynomial time algorithm to learn any function of a constant number of halfspaces...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...
We give the first algorithm that (under distributional assumptions) efficiently learns halfspaces in...
AbstractWe present a polynomial-time algorithm to learn an intersection of a constant number of half...
We present a polynomial-time algorithm to learn an intersection of a constant number of halfspaces i...
We present a polynomialtime algorithm to learn an intersection of a constant number of halfspaces in...
We give a new algorithm for learning intersections of halfspaces with a margin, i.e. under the assum...
AbstractWe give a new algorithm for learning intersections of halfspaces with a margin, i.e. under t...
We give the first representation-independent hardness results for PAC learning intersections of half...
In the 2nd Annual FOCS (1961), C. K. Chow proved that every Boolean threshold function is uniquely d...
Many popular learning algorithms (E.g. Kernel SVM, logistic regression, Lasso, and Fourier-Transform...
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...
AbstractIn Valiant's protocol for learning, the classes of functions which are known learnable in po...
In this paper we consider the problem of learning a linear threshold function (a halfspace in n dime...
We give the first polynomial time algorithm to learn any function of a constant number of halfspaces...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...
We give the first algorithm that (under distributional assumptions) efficiently learns halfspaces in...
AbstractWe present a polynomial-time algorithm to learn an intersection of a constant number of half...
We present a polynomial-time algorithm to learn an intersection of a constant number of halfspaces i...
We present a polynomialtime algorithm to learn an intersection of a constant number of halfspaces in...
We give a new algorithm for learning intersections of halfspaces with a margin, i.e. under the assum...
AbstractWe give a new algorithm for learning intersections of halfspaces with a margin, i.e. under t...
We give the first representation-independent hardness results for PAC learning intersections of half...
In the 2nd Annual FOCS (1961), C. K. Chow proved that every Boolean threshold function is uniquely d...
Many popular learning algorithms (E.g. Kernel SVM, logistic regression, Lasso, and Fourier-Transform...
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...
AbstractIn Valiant's protocol for learning, the classes of functions which are known learnable in po...
In this paper we consider the problem of learning a linear threshold function (a halfspace in n dime...