TY - JOUR
T1 - Density of smooth boolean functions
AU - Ratsaby, Joel
PY - 2007/4
Y1 - 2007/4
N2 - The Sauer-Shelah lemma has been instrumental in the analysis of algorithms in many areas including learning theory, combinatorial geometry, graph theory. Algorithms over discrete structures, for instance, sets of Boolean functions, often involve a search over a constrained subset which satisfies some properties. In this paper we study the complexity of classes of functions h of finite VC-dimension which satisfy a local "smoothness" property expressed as having long repeated values around elements of a given sample. A tight upper bound is obtained on the density of such classes. It is shown to possess a sharp threshold with respect to the smoothness parameter.
AB - The Sauer-Shelah lemma has been instrumental in the analysis of algorithms in many areas including learning theory, combinatorial geometry, graph theory. Algorithms over discrete structures, for instance, sets of Boolean functions, often involve a search over a constrained subset which satisfies some properties. In this paper we study the complexity of classes of functions h of finite VC-dimension which satisfy a local "smoothness" property expressed as having long repeated values around elements of a given sample. A tight upper bound is obtained on the density of such classes. It is shown to possess a sharp threshold with respect to the smoothness parameter.
KW - Binary functions
KW - Binary sequences
KW - Runs
KW - VC-dimension
UR - http://www.scopus.com/inward/record.url?scp=78650929821&partnerID=8YFLogxK
U2 - 10.2298/AADM0701184R
DO - 10.2298/AADM0701184R
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AN - SCOPUS:78650929821
SN - 1452-8630
VL - 1
SP - 184
EP - 198
JO - Applicable Analysis and Discrete Mathematics
JF - Applicable Analysis and Discrete Mathematics
IS - 1
ER -