Steiner trees for fixed orientation metrics

نویسندگان

  • Marcus Brazil
  • Martin Zachariasen
چکیده

We consider the problem of constructing Steiner minimum trees for a metric defined by a polygonal unit circle (corresponding to σ ≥ 2 weighted legal orientations in the plane). A linear-time algorithm to enumerate all angle configurations for degree three Steiner points is given. We provide a simple proof that the angle configuration for a Steiner point extends to all Steiner points in a full Steiner minimum tree, such that at most six orientations suffice for edges in a full Steiner minimum tree. We show that the concept of canonical forms originally introduced for the uniform orientation metric generalises to the fixed orientation metric. Finally, we give a O(σn) time algorithm to compute a Steiner minimum tree for a given full Steiner topology with n terminal leaves.

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عنوان ژورنال:
  • J. Global Optimization

دوره 43  شماره 

صفحات  -

تاریخ انتشار 2009