English

Incremental and Transitive Discrete Rotations

Discrete Mathematics 2007-05-23 v2 Graphics

Abstract

A discrete rotation algorithm can be apprehended as a parametric application f_αf\_\alpha from \ZZ[i]\ZZ[i] to \ZZ[i]\ZZ[i], whose resulting permutation ``looks like'' the map induced by an Euclidean rotation. For this kind of algorithm, to be incremental means to compute successively all the intermediate rotate d copies of an image for angles in-between 0 and a destination angle. The di scretized rotation consists in the composition of an Euclidean rotation with a discretization; the aim of this article is to describe an algorithm whic h computes incrementally a discretized rotation. The suggested method uses o nly integer arithmetic and does not compute any sine nor any cosine. More pr ecisely, its design relies on the analysis of the discretized rotation as a step function: the precise description of the discontinuities turns to be th e key ingredient that will make the resulting procedure optimally fast and e xact. A complete description of the incremental rotation process is provided, also this result may be useful in the specification of a consistent set of defin itions for discrete geometry.

Keywords

Cite

@article{arxiv.cs/0512070,
  title  = {Incremental and Transitive Discrete Rotations},
  author = {Bertrand Nouvel and Eric Remila},
  journal= {arXiv preprint arXiv:cs/0512070},
  year   = {2007}
}