论文信息 - Properties and Construction of Unique Maximal Factorization Families for Strings

Properties and Construction of Unique Maximal Factorization Families for Strings

We say a family of strings over an alphabet is an UMFF if every string has a unique maximal factorization over . Foundational work by Chen, Fox and Lyndon established properties of the Lyndon circ-UMFF, which is based on lexicographic ordering. Commencing with the circ-UMFF related to V-order, we then proved analogous factorization families for a further 32 Block-like binary orders. Here we distinguish between UMFFs and circ-UMFFs, and then study the structural properties of circ-UMFFs. These properties give rise to the complete construction of any circ-UMFF. We prove that any circ-UMFF is a totally ordered set and a factorization over it must be monotonic. We define atom words and initiate a study of u, v-atoms. Applications of circ-UMFFs arise in string algorithmics.

Jacqueline W. Daykin | David E. Daykin

[1] Jean Pierre Duval,et al. Factorizing Words over an Ordered Alphabet , 1983, J. Algorithms.

[2] Jacqueline W. Daykin,et al. Lyndon-like and V-order factorizations of strings , 2003, J. Discrete Algorithms.

[3] R. Lyndon,et al. Free Differential Calculus, IV. The Quotient Groups of the Lower Central Series , 1958 .

[4] M. Lothaire. Combinatorics on words, Second Edition , 1997 .

[5] Marc Chemillier. Periodic musical sequences and Lyndon words , 2004, Soft Comput..

[6] 김동규,et al. [서평]「Algorithms on Strings, Trees, and Sequences」 , 2000 .

[7] Rani Siromoney,et al. A Public Key Cryptosystem Based on Lyndon Words , 1990, Inf. Process. Lett..

[8] Costas S. Iliopoulos,et al. Parallel RAM Algorithms for Factorizing Words , 1994, Theor. Comput. Sci..