There are many high dimensional function classes that have fast agnostic learning algorithms when assumptions on the distribution of examples can be made, such as Gaussianity or uniformity over the domain. But how can one be confident that data indeed satisfies such assumption, so that one can trust in output quality of the agnostic learning algorithm? We propose a model by which to systematically study the design of tester-learner pairs $(\mathcal{A},\mathcal{T})$, such that if the distribution on examples in the data passes the tester $\mathcal{T}$ then one can safely trust the output of the agnostic learner $\mathcal{A}$ on the data. To demonstrate the power of the model, we apply it to the classical problem of agnostically learning ha...
The framework of distribution testing is currently ubiquitous in the field of property testing. In t...
We present an agnostic active learning algorithm for any hypothesis class of bounded VC dimension un...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...
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...
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...
We consider the problem of learning a halfspace in the agnostic framework of Kearns et al., where a ...
In this paper we consider the problem of embedding the input and hypotheses of boolean function clas...
AbstractValiant's protocol for learning is extended to the case where the distribution of the exampl...
We consider some problems in learning with respect to a fixed distribution. We introduce two new not...
from Special Section of the SIAM Journal on Computing. "Special Section on the Fifty-Seventh Annual...
The thesis explores efficient learning algorithms in settings which are more restrictive than the PA...
AbstractGiven a set F of classifiers and a probability distribution over their domain, one can defin...
function and let C be a concept class where each concept has size at most t. Define opt = min c∈C Pr...
The framework of distribution testing is currently ubiquitous in the field of property testing. In t...
We present an agnostic active learning algorithm for any hypothesis class of bounded VC dimension un...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...
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...
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...
We consider the problem of learning a halfspace in the agnostic framework of Kearns et al., where a ...
In this paper we consider the problem of embedding the input and hypotheses of boolean function clas...
AbstractValiant's protocol for learning is extended to the case where the distribution of the exampl...
We consider some problems in learning with respect to a fixed distribution. We introduce two new not...
from Special Section of the SIAM Journal on Computing. "Special Section on the Fifty-Seventh Annual...
The thesis explores efficient learning algorithms in settings which are more restrictive than the PA...
AbstractGiven a set F of classifiers and a probability distribution over their domain, one can defin...
function and let C be a concept class where each concept has size at most t. Define opt = min c∈C Pr...
The framework of distribution testing is currently ubiquitous in the field of property testing. In t...
We present an agnostic active learning algorithm for any hypothesis class of bounded VC dimension un...
AbstractWe give the first polynomial time algorithm to learn any function of a constant number of ha...