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Hyperdense Coding Modulo 6 with Filter-Machines

计算复杂性 2007-05-23 v1 数据库

摘要

We show how one can encode nn bits with no(1)n^{o(1)} ``wave-bits'' using still hypothetical filter-machines (here o(1)o(1) denotes a positive quantity which goes to 0 as nn goes to infity). Our present result - in a completely different computational model - significantly improves on the quantum superdense-coding breakthrough of Bennet and Wiesner (1992) which encoded nn bits by n/2\lceil{n/2}\rceil quantum-bits. We also show that our earlier algorithm (Tech. Rep. TR03-001, ECCC, See ftp://ftp.eccc.uni-trier.de/pub/eccc/reports/2003/TR03-001/index.html) which used no(1)n^{o(1)} muliplication for computing a representation of the dot-product of two nn-bit sequences modulo 6, and, similarly, an algorithm for computing a representation of the multiplication of two n×nn\times n matrices with n2+o(1)n^{2+o(1)} multiplications can be turned to algorithms computing the exact dot-product or the exact matrix-product with the same number of multiplications with filter-machines. With classical computation, computing the dot-product needs Ω(n)\Omega(n) multiplications and the best known algorithm for matrix multiplication (D. Coppersmith and S. Winograd, Matrix multiplication via arithmetic progressions, J. Symbolic Comput., 9(3):251--280, 1990) uses n2.376n^{2.376} multiplications.

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引用

@article{arxiv.cs/0306049,
  title  = {Hyperdense Coding Modulo 6 with Filter-Machines},
  author = {Vince Grolmusz},
  journal= {arXiv preprint arXiv:cs/0306049},
  year   = {2007}
}