Abstract
Let A be a finite set and B an arbitrary set with at least two elements. The arity gap of a function f : An → B is the minimum decrease in the number of essential variables when essential variables of f are identified. A non- Trivial fact is that the arity gap of such B-valued functions on A is at most |A|. Even less trivial to verify is the fact that the arity gap of B-valued functions on A with more than |A| essential variables is at most 2. These facts ask for a classification of B-valued functions on A in terms of their arity gap. In this paper, we survey what is known about this problem. We present a general characterization of the arity gap of B-valued functions on A and provide explicit classifications of the arity gap of Boolean and pseudo-Boolean functions. Moreover, we reveal unsettled questions related to this topic, and discuss links and possible applications of some results to other subjects of research.
| Original language | English |
|---|---|
| Pages (from-to) | 193-207 |
| Number of pages | 15 |
| Journal | Journal of Multiple-Valued Logic and Soft Computing |
| Volume | 27 |
| Issue number | 2-3 |
| Publication status | Published - 2016 |
| Publication type | A2 Review article in a scientific journal |
Publication forum classification
- Publication forum level 1
ASJC Scopus subject areas
- Software
- Logic
- Theoretical Computer Science