English

Parallel Identity Testing for Skew Circuits with Big Powers and Applications

Computational Complexity 2015-02-17 v1

Abstract

Powerful skew arithmetic circuits are introduced. These are skew arithmetic circuits with variables, where input gates can be labelled with powers xnx^n for binary encoded numbers nn. It is shown that polynomial identity testing for powerful skew arithmetic circuits belongs to coRNC2\mathsf{coRNC}^2, which generalizes a corresponding result for (standard) skew circuits. Two applications of this result are presented: (i) Equivalence of higher-dimensional straight-line programs can be tested in coRNC2\mathsf{coRNC}^2; this result is even new in the one-dimensional case, where the straight-line programs produce strings. (ii) The compressed word problem (or circuit evaluation problem) for certain wreath products of finitely generated abelian groups belongs to coRNC2\mathsf{coRNC}^2.

Keywords

Cite

@article{arxiv.1502.04545,
  title  = {Parallel Identity Testing for Skew Circuits with Big Powers and Applications},
  author = {Daniel König and Markus Lohrey},
  journal= {arXiv preprint arXiv:1502.04545},
  year   = {2015}
}
R2 v1 2026-06-22T08:30:30.190Z