论文信息 - On the expressive power of univariate equations over sets of natural numbers

On the expressive power of univariate equations over sets of natural numbers

Equations of the form X = φ(X) are considered, where the unknown X is a set of natural numbers. The expression φ(X) may contain the operations of set addition, defined as S + T = {m + n | m ∈ S, n ∈ T}, union and intersection, as well as ultimately periodic constants. An equation with a non-periodic solution of exponential growth is constructed. At the same time it is demonstrated that no sets with super-exponential growth can be represented. It is also shown that a restricted class of these equations cannot represent sets with super-linearly growing complements. The results have direct implications on the power of conjunctive grammars with one nonterminal

Alexander Okhotin | Panos Rondogiannis

[1] Artur Jez. Conjunctive Grammars Can Generate Non-regular Unary Languages , 2007, Developments in Language Theory.

[2] Michal Kunc,et al. What Do We Know About Language Equations? , 2007, Developments in Language Theory.

[3] Alexander Okhotin,et al. Conjunctive Grammars , 2001, J. Autom. Lang. Comb..

[4] Alexander Okhotin,et al. Language Equations with Complementation , 2006, Developments in Language Theory.

[5] Alexander Okhotin,et al. Complexity of language equations with one-sided concatenation and all Boolean operations , 2007 .

[6] Artur Jez,et al. Conjunctive Grammars over a Unary Alphabet: Undecidability and Unbounded Growth , 2007, CSR.

[7] Artur Jez,et al. Conjunctive Grammars over a Unary Alphabet: Undecidability and Unbounded Growth , 2008, Theory of Computing Systems.

[8] Ernst L. Leiss,et al. Unrestricted Complementation in Language Equations Over a One-Letter Alphabet , 1994, Theor. Comput. Sci..