A Note on the Complexity of the Transpose of a Matrix

Authors

  • Philip Matthews
  • Carl Sturtivant

DOI:

https://doi.org/10.7146/dpb.v17i265.7619

Abstract

Let x be a column vector of indeterminates. We show that the complexity of computing the linear forms Ax for a fixed matrix A is essentially the same as that of computing the linear forms A'x where the prime denotes transpose. Our result also holds for non-square matrices, under a simple restriction.

Author Biographies

Philip Matthews

Carl Sturtivant

Downloads

Published

1988-09-01

How to Cite

Matthews, P., & Sturtivant, C. (1988). A Note on the Complexity of the Transpose of a Matrix. DAIMI Report Series, 17(265). https://doi.org/10.7146/dpb.v17i265.7619

Issue

No. 265 (1988): PB-265 A Note on the Complexity of the Transpose of a Matrix

Section

Articles

License

Creative Commons License

Articles published in DAIMI PB are licensed under a Creative Commons Attribution-NonCommercial-NoDerivs 3.0 Unported License.