Title :
Long huffman sequences derived from even functional quadratic residues
Author :
Tanada, Y. ; Sato, Kiminori
Author_Institution :
Fac. of Eng., Daiichi Inst. of Technol., Kirishima, Japan
fDate :
Oct. 27 2013-Nov. 1 2013
Abstract :
Huffman sequences with long length are generated for the application to high attenuation sonar or radar. A general expression of Huffman sequence is given by polynomial expansion of its spectrum. For long length, the fist-order approximate sequence is given by a DFT expression and the estimate absolute value of the sequence is represented by a Gaussian shape. Long Huffman sequences are constructed from even functional quadratic residues. The calculated sequences with length up to 15914 show their estimate absolute values of Gaussian shape with peak value 2, although the maximum absolute value is about 6 when the length is 6030. The maximum absolute values are expected to be decreased by parameter selections.
Keywords :
Gaussian processes; approximation theory; discrete Fourier transforms; estimation theory; polynomials; radar; sequences; sonar; DFT expression; Gaussian shape; even functional quadratic residue; first-order approximate sequence; long Huffman sequence; polynomial expansion; radar; sonar; Approximation methods; Correlation; Genetic expression; Polynomials; Shape; Sonar applications; Gaussian shape; even functional quadratic residues; finite-length sequence; long Huffman sequence; maximum absolute value; periodic orthogonal sequence; radar; sonar;
Conference_Titel :
Signal Design and Its Applications in Communications, The Sixth International Workshop on
Conference_Location :
Tokyo
Print_ISBN :
978-1-4799-6028-6
DOI :
10.1109/IWSDA.2013.6849061
