International audienceWe examine connections between combinatorial notions that arise in machine learning and topological notions in cubical/simplicial geometry. These connections enable to export results from geometry to machine learning. Our first main result is based on a geometric construction by Tracy Hall (2004) of a partial shelling of the cross-polytope which can not be extended. We use it to derive a maximum class of VC dimension 3 that has no corners. This refutes several previous works in machine learning from the past 11 years. In particular, it implies that all previous constructions of optimal unlabeled sample compression schemes for maximum classes are erroneous. On the positive side we present a new construction of an unlabe...
AbstractWe present new expected risk bounds for binary and multiclass prediction, and resolve severa...
We present new expected risk bounds for binary and multiclass prediction, and resolve several recent...
Any set of labeled examples consistent with some hidden orthogonal rectan-gle can be “compressed ” t...
We examine connections between combinatorial notions that arise in machine learning and topological ...
International audienceWe examine connections between combinatorial notions that arise in machine lea...
We examine connections between combinatorial notions that arise in machine learning and topological ...
One of the earliest conjectures in computational learning theory-the Sample Compression conjecture-a...
Abstract One of the earliest conjectures in computational learning theory—the Sample Compression con...
A long-standing sample compression conjecture asks to linearly bound the size of the optimal sample ...
We show that the topes of a complex of oriented matroids (abbreviated COM) of VC-dimension $d$ admit...
We show that the topes of a complex of oriented matroids (abbreviated COM) of VC-dimension d admit a...
Any set of labeled examples consistent with some hidden orthogonal rectan-gle can be \compressed &qu...
Maximum concept classes of VC dimension d over n domain points have size � n � ≤d, and this is an up...
Abstract. We give a compression scheme for any maximum class of VC dimension d that compresses any s...
Abstract. We give a compression scheme for any maximum class of VC dimension d that compresses any s...
AbstractWe present new expected risk bounds for binary and multiclass prediction, and resolve severa...
We present new expected risk bounds for binary and multiclass prediction, and resolve several recent...
Any set of labeled examples consistent with some hidden orthogonal rectan-gle can be “compressed ” t...
We examine connections between combinatorial notions that arise in machine learning and topological ...
International audienceWe examine connections between combinatorial notions that arise in machine lea...
We examine connections between combinatorial notions that arise in machine learning and topological ...
One of the earliest conjectures in computational learning theory-the Sample Compression conjecture-a...
Abstract One of the earliest conjectures in computational learning theory—the Sample Compression con...
A long-standing sample compression conjecture asks to linearly bound the size of the optimal sample ...
We show that the topes of a complex of oriented matroids (abbreviated COM) of VC-dimension $d$ admit...
We show that the topes of a complex of oriented matroids (abbreviated COM) of VC-dimension d admit a...
Any set of labeled examples consistent with some hidden orthogonal rectan-gle can be \compressed &qu...
Maximum concept classes of VC dimension d over n domain points have size � n � ≤d, and this is an up...
Abstract. We give a compression scheme for any maximum class of VC dimension d that compresses any s...
Abstract. We give a compression scheme for any maximum class of VC dimension d that compresses any s...
AbstractWe present new expected risk bounds for binary and multiclass prediction, and resolve severa...
We present new expected risk bounds for binary and multiclass prediction, and resolve several recent...
Any set of labeled examples consistent with some hidden orthogonal rectan-gle can be “compressed ” t...