We study the learnability of sets in Rn under the Gaussian distribution, taking Gaussian surface area as the “complexity measure” of the sets being learned. Let CS denote the class of all (measurable) sets with surface area at most S. We first show that the class CS is learnable to any constant accuracy in time nO(S2), even in the arbitrary noise (“agnostic”) model. Complementing this, we also show that any learning algorithm for CS information-theoretically requires 2Ω(S2) examples for learning to constant accuracy. These results together show that Gaussian surface area essentially characterizes the computational complexity of learning under the Gaussian distribution
Local geometric analysis is a method to define a coordinate system in a small neighborhood in the sp...
We consider some problems in learning with respect to a fixed distribution. We introduce two new not...
AbstractWe present several efficient parallel algorithms for PAC-learning geometric concepts in a co...
We study the learnability of sets in Rn under the Gaussian distribution, taking Gaussian surface are...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
A general mathematical framework is developed for learning algorithms. A learning task belongs to ei...
There are many high dimensional function classes that have fast agnostic learning algorithms when as...
AbstractIntrinsic complexity is used to measure the complexity of learning areas limited by broken-s...
AbstractValiant's protocol for learning is extended to the case where the distribution of the exampl...
In a recent paper, the authors introduced the notion of sample width for binary classifiers defined ...
Using the tools of category theory and differential geometry, we extend the geometric notions conseq...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
Abstract Learning a map from an input set to an output set is similar to the problem of reconstructi...
The class of geometrical data is an interesting class as one encounters them in real world applicati...
This paper studies the sample complexity of learning the $k$ unknown centers of a balanced Gaussian ...
Local geometric analysis is a method to define a coordinate system in a small neighborhood in the sp...
We consider some problems in learning with respect to a fixed distribution. We introduce two new not...
AbstractWe present several efficient parallel algorithms for PAC-learning geometric concepts in a co...
We study the learnability of sets in Rn under the Gaussian distribution, taking Gaussian surface are...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
A general mathematical framework is developed for learning algorithms. A learning task belongs to ei...
There are many high dimensional function classes that have fast agnostic learning algorithms when as...
AbstractIntrinsic complexity is used to measure the complexity of learning areas limited by broken-s...
AbstractValiant's protocol for learning is extended to the case where the distribution of the exampl...
In a recent paper, the authors introduced the notion of sample width for binary classifiers defined ...
Using the tools of category theory and differential geometry, we extend the geometric notions conseq...
We give the first representation-independent hardness result for agnostically learning halfspaces wi...
Abstract Learning a map from an input set to an output set is similar to the problem of reconstructi...
The class of geometrical data is an interesting class as one encounters them in real world applicati...
This paper studies the sample complexity of learning the $k$ unknown centers of a balanced Gaussian ...
Local geometric analysis is a method to define a coordinate system in a small neighborhood in the sp...
We consider some problems in learning with respect to a fixed distribution. We introduce two new not...
AbstractWe present several efficient parallel algorithms for PAC-learning geometric concepts in a co...