DocumentCode
3019169
Title
Composition Limits and Separating Examples for Some Boolean Function Complexity Measures
Author
Gilmer, Justin ; Saks, Michael ; SRINIVASAN, SUDARSHAN
Author_Institution
Dept. of Math., Rutgers Univ., Piscataway, NJ, USA
fYear
2013
fDate
5-7 June 2013
Firstpage
185
Lastpage
196
Abstract
Block sensitivity (bs(f)), certificate complexity (C(f)) and fractional certificate complexity (C*(f)) are three fundamental combinatorial measures of complexity of a boolean function f. It has long been known that bs(f) ≤ C*f ≤ C(f) =O(bs(f)2). We provide an infinite family of examples for which C(f) grows quadratic ally in C*(f) (and also bs(f)) giving optimal separations between these measures. Previously the biggest separation known was C(f)=C*(f)log4.55. We also give a family of examples for which C*(f)=Ω(bs(f)3/2). These examples are obtained by composing boolean functions in various ways. Here the composition f ο g of f with g is obtained by substituting for each variable of f a copy of g on disjoint sets of variables. To construct and analyse these examples we systematically investigate the behaviour under function composition of these measures and also the sensitivity measure s(f). The measures s(f), C(f) and C*(f) behave nicely under composition: they are sub multiplicative (where measure m is sub multiplicative if m(f ο g) ≤ m(f)m(g)) with equality holding under some fairly general conditions. The measure bs(f) is qualitatively different: it is not sub multiplicative. This qualitative difference was not noticed in the previous literature and we correct some errors that appeared in previous papers. We define the composition limit of a measure m at function f, mlim(f) to be the limit as k grows of m(f(k))1/k, where f(k) is the iterated composition of f with itself k-times. For any function f we show that bslim(f) = (C*)lim(f) and characterize slim(f), (C*)lim(f), and Clim(f) in terms of the largest eigenvalue of a certain set of 2 × 2 matrices associated with f.
Keywords
Boolean functions; computational complexity; matrix algebra; Boolean function complexity measures; block sensitivity; combinatorial measures; composition limits; disjoint sets; fractional certificate complexity; function composition; infinite family; matrices; sensitivity measure; submultiplicative; Boolean functions; Complexity theory; Decision trees; Educational institutions; Indexes; Sensitivity; Block sensitivity; Certificate complexity; Fractional Certificate complexity; Iterated composition;
fLanguage
English
Publisher
ieee
Conference_Titel
Computational Complexity (CCC), 2013 IEEE Conference on
Conference_Location
Stanford, CA
Type
conf
DOI
10.1109/CCC.2013.27
Filename
6597761
Link To Document