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diff --git a/backup/Digital_Communications_by_S._Haykin_version_backup/Chapter9.ipynb b/backup/Digital_Communications_by_S._Haykin_version_backup/Chapter9.ipynb new file mode 100755 index 00000000..1cf25521 --- /dev/null +++ b/backup/Digital_Communications_by_S._Haykin_version_backup/Chapter9.ipynb @@ -0,0 +1,365 @@ +{ + "cells": [ + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "# Chapter 9 Spread Spectrum Modulation" + ] + }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "## Example9.1 page 461" + ] + }, + { + "cell_type": "code", + "execution_count": 4, + "metadata": { + "collapsed": false + }, + "outputs": [ + { + "name": "stdout", + "output_type": "stream", + "text": [ + "The PN sequence at step: 1\n", + "x= [1, 0, 0]\n", + "The PN sequence at step: 2\n", + "x= [1, 1, 0]\n", + "The PN sequence at step: 3\n", + "x= [1, 1, 1]\n", + "The PN sequence at step: 4\n", + "x= [0, 1, 1]\n", + "The PN sequence at step: 5\n", + "x= [1, 0, 1]\n", + "The PN sequence at step: 6\n", + "x= [0, 1, 0]\n", + "The PN sequence at step: 7\n", + "x= [0, 0, 1]\n", + "Table 9.1 Range of PN Sequence lengths\n", + "_________________________________________________________\n", + "Length of shift register (m) = [7, 8, 9, 10, 11, 12, 13, 17, 19]\n", + "PN sequence Length (N) = [127, 255, 511, 1023, 2047, 4095, 8191, 131071, 524287]\n", + "_________________________________________________________\n" + ] + } + ], + "source": [ + "#Program to generate Maximum Length Pseudo Noise Sequence\n", + "#Period of PN Sequence N = 7\n", + "\n", + "#Assign Initial value for PN generator\n", + "x0= 1#\n", + "x1= 0#\n", + "x2 =0#\n", + "x3 =0#\n", + "N = 7 # the period of the signal\n", + "for i in range(1,N+1):\n", + " x3 =x2\n", + " x2 =x1\n", + " x1 = x0\n", + " x0 =(x1^x3)\n", + " print 'The PN sequence at step:',i\n", + " x = [x1, x2, x3]\n", + " print 'x=',x\n", + "\n", + "m = [7,8,9,10,11,12,13,17,19]#\n", + "N = [2**mm-1 for mm in m]\n", + "print 'Table 9.1 Range of PN Sequence lengths'\n", + "print '_________________________________________________________'\n", + "print 'Length of shift register (m) =',m\n", + "print 'PN sequence Length (N) =',N\n", + "print '_________________________________________________________'" + ] + }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "## Example9.2 page 462" + ] + }, + { + "cell_type": "code", + "execution_count": 26, + "metadata": { + "collapsed": false + }, + "outputs": [ + { + "name": "stdout", + "output_type": "stream", + "text": [ + "The PN sequence at step : 1\n", + "x= [1, 0, 0]\n", + "The PN sequence at step : 2\n", + "x= [1, 1, 0]\n", + "The PN sequence at step : 3\n", + "x= [1, 1, 1]\n", + "The PN sequence at step : 4\n", + "x= [0, 1, 1]\n", + "The PN sequence at step : 5\n", + "x= [1, 0, 1]\n", + "The PN sequence at step : 6\n", + "x= [0, 1, 0]\n", + "The PN sequence at step : 7\n", + "x= [0, 0, 1]\n", + "Output Sequence : [0, 0, 1, 1, 1, 0, 1]\n", + "Output Sequence levels : [-1, -1, 1, 1, 1, -1, 1]\n", + "Number of 1s in the given PN sequence : 4\n", + "Number of 0s in the given PN sequence : 3\n", + "Property 1 (Balance property) is satisified\n" + ] + }, + { + "data": { + "image/png": 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WuGg/Zs48M86ocHISHvEIWLkS9uzxLU14xDoX1EqsY3N+Pv4xaU4rQVKY6IZ4mzGa+o9V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\nVwMXA48EniMi57X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+ "text/plain": [ + "<matplotlib.figure.Figure at 0x7fa533551b90>" + ] + }, + "metadata": {}, + "output_type": "display_data" + } + ], + "source": [ + "from numpy import corrcoef as corr\n", + "%matplotlib inline\n", + "from matplotlib.pyplot import plot,xlabel,ylabel,title,show\n", + "\n", + "#Period of PN Sequence N = 7\n", + "#Properites of maximum-length sequence\n", + "\n", + "#Assign Initial value for PN generator\n", + "x0= 1#\n", + "x1= 0#\n", + "x2 =0#\n", + "x3 =0#\n", + "N = 7 #the period of the signal\n", + "one_count = 0\n", + "zero_count = 0\n", + "C=[]\n", + "C_level=[]\n", + "t=[]\n", + "for i in range(1,N+1):\n", + " x3 =x2#\n", + " x2 =x1#\n", + " x1 = x0#\n", + " x0 =(x1^x3)\n", + " print 'The PN sequence at step :',i\n", + " x = [x1 ,x2 ,x3]\n", + " print 'x=',x\n", + " C.append(x3)\n", + " if(C[i-1]==1):\n", + " C_level.append(1)\n", + " one_count = one_count+1\n", + " elif(C[i-1]==0):\n", + " C_level.append(-1)\n", + " zero_count = zero_count+1\n", + " \n", + "print 'Output Sequence : ',C #refer equation 9.4\n", + "print 'Output Sequence levels :',C_level#refer equation 9.5\n", + "if(zero_count < one_count):\n", + " print 'Number of 1s in the given PN sequence : ',one_count\n", + " print 'Number of 0s in the given PN sequence :',zero_count\n", + " print 'Property 1 (Balance property) is satisified'\n", + "\n", + "Rc_tuo = corr(C_level,rowvar=N)\n", + "t = range(1,2*len(C_level)+1)\n", + "plot(t,C_level+C_level)\n", + "xlabel(' t')\n", + "title('Waveform of maximum-length sequence [0 0 1 1 1 0 1 0 0 1 1 1 0 1]')\n", + "show()" + ] + }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "## Example9.3 page 468" + ] + }, + { + "cell_type": "code", + "execution_count": 28, + "metadata": { + "collapsed": false + }, + "outputs": [ + { + "name": "stdout", + "output_type": "stream", + "text": [ + "The processing gain is: 4095.0\n", + "The required PN sequence is: 4095.0\n", + "The feedback shift register length: 12.0\n", + "Jamming Margin in dB: 26.122539061\n" + ] + } + ], + "source": [ + "from math import log,log10\n", + "def log2(x):\n", + " return log(x,2)\n", + "\n", + "Tb = 4.095*10**-3##Information bit duration\n", + "Tc = 1*10**-6##PN chip duration\n", + "PG = Tb/Tc##Processing gain\n", + "print 'The processing gain is:',PG\n", + "N = PG# #PN sequence length\n", + "m = log2(N+1)##feedback shift register length\n", + "print 'The required PN sequence is:',N\n", + "print 'The feedback shift register length:',m\n", + "Eb_No = 10##Energy to noise density ratio\n", + "J_P = PG/Eb_No##Jamming Margin\n", + "print 'Jamming Margin in dB:',10*log10(J_P)" + ] + }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "## Example9.4 page 469" + ] + }, + { + "cell_type": "code", + "execution_count": 31, + "metadata": { + "collapsed": false + }, + "outputs": [ + { + "name": "stdout", + "output_type": "stream", + "text": [ + "number of bits per symbol K = 2\n", + "Number of MFSK tones M= 4\n", + "Period of the PN sequence N = 15\n", + "length of PN sequence per hop k = 3\n", + "Total number of frequency hops = 8\n" + ] + } + ], + "source": [ + "#Slow and Fast Frequency Hopping\n", + "K =2# #number of bits per symbol\n", + "M = 2**K# #Number of MFSK tones\n", + "N = 2**M-1##Period of the PN sequence\n", + "k = 3# #length of PN sequence per hop\n", + "print 'number of bits per symbol K =',K\n", + "print 'Number of MFSK tones M=',M\n", + "print 'Period of the PN sequence N =',N\n", + "print 'length of PN sequence per hop k =',k\n", + "print 'Total number of frequency hops =',2**k" + ] + }, + { + "cell_type": "markdown", + "metadata": {}, + "source": [ + "## Example9.5 page 470" + ] + }, + { + "cell_type": "code", + "execution_count": 3, + "metadata": { + "collapsed": false + }, + "outputs": [ + { + "data": { + "image/png": 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dPC+/7P495pji9FdpC7rZJp+rBk480RXXmTWrfGPGeQHdG/00PP+8u4r37Bm2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\nIGxN+SCpsaQZkh7OswsD+pv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XeP+vwLbLSpUfYavMkkFEBgJlqvpFzpXlcuCAXfzvAF9hh2i/SFLu78AcYBpw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\n/YF8rP1PPslPf6ars359G7zXpAqxGMfSpTbApxr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HD9sWGT5xaR9X0erli621xV0GmVH5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\n", + "text/plain": [ + "<matplotlib.figure.Figure at 0x7f5c71d2aad0>" + ] + }, + "metadata": {}, + "output_type": "display_data" + } + ], + "source": [ + "from numpy import ones,sin,arange,hstack,nditer,pi\n", + "%matplotlib inline\n", + "from matplotlib.pyplot import plot,subplot,xlabel,ylabel,title,show\n", + "\n", + "\n", + "#Figure 9.4:Generation of waveforms in DS/BPSK spread spectrum transmitter\n", + "t = range(0,13+1)\n", + "N = 7#\n", + "wt = arange(0,0.01+1,0.01)\n", + "bt = hstack([[1*xx for xx in ones(N)],[-1*yy for yy in ones(N)]])\n", + "ct = [0,0,1,1,1,0,1,0,0,1,1,1,0,1]\n", + "ct_polar = [-1,-1,1,1,1,-1,1,-1,-1,1,1,1,-1,1]\n", + "mt = [a*b for a,b in nditer([bt,ct_polar])]\n", + "Carrier = [2*sin(wtt*2*pi) for wtt in wt]\n", + "\n", + "st = []#\n", + "for i in range(0,len(mt)):\n", + " st = st+[mt[i]*Cr for Cr in Carrier]\n", + "\n", + "subplot(3,1,1)\n", + "plot(t,bt)\n", + "xlabel(' t')\n", + "title('Data b(t)')\n", + "subplot(3,1,2)\n", + "plot(t,ct_polar)\n", + "xlabel(' t')\n", + "title('Spreading code c(t)')\n", + "subplot(3,1,3)\n", + "plot(t,mt)\n", + "xlabel(' t')\n", + "title('Product Signal m(t)')\n", + "show()\n", + "subplot(3,1,1)\n", + "plot(t,mt)\n", + "xlabel(' t')\n", + "title('Product Signal m(t)')\n", + "subplot(3,1,2)\n", + "plot(Carrier)\n", + "xlabel(' t')\n", + "title('Carrier Signal')\n", + "subplot(3,1,3)\n", + "plot(st)\n", + "xlabel(' t')\n", + "title('DS/BPSK signal s(t)')\n", + "show()" + ] + } + ], + "metadata": { + "kernelspec": { + "display_name": "Python 2", + "language": "python", + "name": "python2" + }, + "language_info": { + "codemirror_mode": { + "name": "ipython", + "version": 2 + }, + "file_extension": ".py", + "mimetype": "text/x-python", + "name": "python", + "nbconvert_exporter": "python", + "pygments_lexer": "ipython2", + "version": "2.7.9" + } + }, + "nbformat": 4, + "nbformat_minor": 0 +} |