DIMACS TR: 98-09
Convexity and Logical Analysis of Data
Authors: Oya Ekin, Peter L. Hammer and Alexander Kogan
ABSTRACT
A Boolean function is called $k$-convex if for any pair $x,y$ of its true
points at Hamming distance at most $k$, every point ``between'' $x$ and $y$
is also true. Given a set of true points and a set of false points, the
central question of Logical Analysis of Data is the study of those Boolean
functions whose values agree with those of the given points. In this paper
we examine data sets which admit $k$-convex Boolean extensions. We
provide polynomial algorithms for finding a $k$-convex extension, if any,
and for finding the maximum $k$ for which a $k$-convex extension exists.
We study the problem of uniqueness, and provide a polynomial algorithm for
checking whether all $k$-convex extensions agree in a point outside the
given data set. We estimate the number of $k$-convex Boolean functions, and
show that for small $k$ this number is doubly exponential. On the other hand,
we also show that for large $k$ the class of $k$-convex Boolean functions
is PAC-learnable.
Paper Available at:
ftp://dimacs.rutgers.edu/pub/dimacs/TechnicalReports/TechReports/1998/98-09.ps.gz
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