论文信息 - Shuffle operations on discrete paths

Shuffle operations on discrete paths

We consider the shuffle operation on paths and study some parameters. In the case of square lattices, shuffling with a particular periodic word (of period 2) corresponding to paperfoldings reveals some characteristic properties: closed paths remain closed; the area and perimeter double; the center of gravity moves under a 45^@? rotation and a 2 zoom factor. We also observe invariance properties for the associated Dragon curves. Moreover, replacing square lattice paths by paths involving [email protected]/N-turns, we find analogous results using more general shuffles.

Gilbert Labelle | Srecko Brlek | Annie Lacasse

[1] R. Leighton,et al. The Feynman Lectures on Physics; Vol. I , 1965 .

[2] Maurice Nivat,et al. Salient and reentrant points of discrete sets , 2005, Discret. Appl. Math..

[3] Anthony J. G. Hey,et al. Feynman Lectures on Computation , 1996 .

[4] M. Lothaire,et al. Applied Combinatorics on Words , 2005 .

[5] Azriel Rosenfeld,et al. Picture Processing and Psychopictorics , 1970 .

[6] Gilbert Labelle,et al. Incremental Algorithms Based on Discrete Green Theorem , 2003, DGCI.

[7] Gilbert Labelle,et al. Properties of the Contour Path of Discrete Sets , 2006, Int. J. Found. Comput. Sci..

[8] Herbert Freeman,et al. On the Encoding of Arbitrary Geometric Configurations , 1961, IRE Trans. Electron. Comput..