Estimates for the growth of inverse determinant sums of quasi-orthogonal and number field lattices
R Vehkalahti, L Luzzi - arXiv preprint arXiv:1501.01773, 2015 - arxiv.org
arXiv preprint arXiv:1501.01773, 2015•arxiv.org
Inverse determinant sums appear naturally as a tool for analyzing performance of space-
time codes in Rayleigh fading channels. This work will analyze the growth of inverse
determinant sums of a family of quasi-orthogonal codes and will show that the growths are in
logarithmic class. This is considerably lower than that of comparable number field codes.
time codes in Rayleigh fading channels. This work will analyze the growth of inverse
determinant sums of a family of quasi-orthogonal codes and will show that the growths are in
logarithmic class. This is considerably lower than that of comparable number field codes.
Inverse determinant sums appear naturally as a tool for analyzing performance of space-time codes in Rayleigh fading channels. This work will analyze the growth of inverse determinant sums of a family of quasi-orthogonal codes and will show that the growths are in logarithmic class. This is considerably lower than that of comparable number field codes.
arxiv.org