Discrete Mathematics & Theoretical Computer Science
Volume 4 n° 2 (2001), pp. 79-90
| author: | Anna Bernasconi |
|---|---|
| title: | On a hierarchy of Boolean functions hard to compute in constant depth |
| keywords: | Boolean functions, AC0 circuits, size complexity, harmonic analysis |
| abstract: | Any attempt to find connections between mathematical properties and complexity has a strong relevance
to the field of Complexity Theory.
This is due to the lack of mathematical techniques to prove lower
bounds for general models of computation. This work represents a step in this direction: we define a combinatorial property that makes Boolean functions ``hard'' to compute in constant depth and show how the harmonic analysis on the hypercube can be applied to derive new lower bounds on the size complexity of previously unclassified Boolean functions. |
| reference: | Anna Bernasconi (2001), On a hierarchy of Boolean functions hard to compute in constant depth, Discrete Mathematics and Theoretical Computer Science 4, pp. 79-90 |
| bibtex: | For a corresponding BibTeX entry, please consider our BibTeX-file. |
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Automatically produced on Tue Oct 30 12:57:30 CET 2001 by gustedt