{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# MIMO Channel Capacity\n",
    "### M.Sc. Vladimir Fadeev\n",
    "#### Kazan, 2018"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Introduction"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Let us provide math description of the received signal before we start:\n",
    "\n",
    "$$ \\mathbf{y} = \\sqrt{\\frac{P}{M_T}}\\mathbf{H}\\mathbf{s} + \\mathbf{n} \\qquad (1)$$\n",
    "\n",
    "where $P$ is the transmitt power, $\\mathbf{s}$ is the transmitted symbols, $\\mathbf{n}$ is the additive noise and $\\mathbf{H}$ is the channel gain (actually, fading process).\n",
    "\n",
    "The dimensions of the matrix $\\mathbf{H}$ are  $M_R\\times M_T$, where $M_R$ is the number of the receive antennas and $M_T$ is the number of the transmitt antennas. For several snapshots the channel will have the following view:\n",
    "\n",
    "![tens](https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/mimo-tensor.png)\n",
    "\n",
    "> **NOTE:** \n",
    ">\n",
    ">The following structure is used in [MatLab](https://www.mathworks.com/help/comm/ref/comm.mimochannel-system-object.html): \n",
    "rows - snapshots, columns - $M_T$, lateral dimension - $M_R$\n",
    "\n",
    "This formula can be easily redefined for the MISO case:\n",
    "\n",
    "$$ y = \\sqrt{\\frac{P}{M_T}}\\mathbf{h}\\mathbf{s} + n \\qquad (2) $$\n",
    "\n",
    "where the $\\mathbf{h}$ is the vector $1 \\times M_T$. \n",
    "\n",
    "SIMO case:\n",
    "\n",
    "$$ y = \\sqrt{P}\\mathbf{h}s + \\mathbf{n} \\qquad (3) $$\n",
    "\n",
    "where the $\\mathbf{h}$ is the vector $M_R \\times 1$.\n",
    "\n",
    "And SISO case:\n",
    "\n",
    "$$ y = \\sqrt{P}hs + n \\qquad (4)$$"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Actually, we have considered case when the channel is **unknown** for the transmitter (**open loop**: transmission without feedback). In other words, we do not prefer any direction and transmit equal power through all of the antennas (paths). Hence, the path gains are equal to 1:\n",
    "\n",
    "$$ \\gamma_i=1, \\quad i=1,2,..M_T \\qquad (5)$$\n",
    "\n",
    "What is the path gain? Path gain or antenna weight means allocation of the output power proportionaly to the strength of the certein path:\n",
    "\n",
    "$$s_i = \\gamma_i d_i \\quad i=1,2,..M_T \\qquad (6)$$\n",
    "\n",
    "where $d_i$ is the one of the initial synbols ($E\\{\\mathbf{d}\\mathbf{d}^H\\} = M_T$ - total transmit energy constrain). \n",
    ">**NOTE THAT**:\n",
    "> \n",
    ">The antenna weights are also constrained by the number of trasmit antennas:\n",
    ">$\\sum^r_{i=1} \\gamma_i = M_T$ (where $r$ is the rank of the channel matrix.). \n",
    "\n",
    "In other words, we  allocate more power to the good channels (paths) and less power to the bad pathes."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "How to allocate power efficiently?\n",
    "\n",
    "If the channel is **known** (**closed-loop** scenario - with a feedback) for the transmitter we can use advanced scenarios of the transmission with some **pre-coding** and **post-processing** algorithms (e.g., some linear approaches).\n",
    "\n",
    "What do the last termins mean?\n",
    "\n",
    "If we know the **CSI** (Channel State Information - matrix $\\mathbf{H}$), we can process the channel matrix. \n",
    "\n",
    "E.g., apply the [Singular Value Decomposition (SVD)](https://en.wikipedia.org/wiki/Singular_value_decomposition).\n",
    "\n",
    "![svd](https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/svd-mimo.png)\n",
    "\n",
    "\n",
    "In this case, linear pre-coding (filter) matrix is the $\\mathbf{F} = \\mathbf{V}_s$ and the linear post-processing (demodulator) matrix $\\mathbf{D} = \\mathbf{U}^H_s$ (where \"power\" H means Hermitian). Obviously, that for channel-uncknown case $\\mathbf{F}$ and $\\mathbf{D}$ are equal to [identity matrices](https://en.wikipedia.org/wiki/Identity_matrix).\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Redefine the received signal model:\n",
    "\n",
    "$$ \\mathbf{Dy} = \\mathbf{D}\\left( \\sqrt{\\frac{P}{M_t}}\\mathbf{H}\\mathbf{F}\\mathbf{s} + \\mathbf{n} \\right) = \\mathbf{U}^H_s\\mathbf{y} = \\sqrt{\\frac{P}{M_t}}\\mathbf{U}^H_s\\mathbf{H}\\mathbf{V}_s\\mathbf{s}+\\mathbf{U}^H_s\\mathbf{n} = \\sqrt{\\frac{P}{M_t}}\\mathbf{\\Sigma}_s\\mathbf{s} + \\mathbf{\\hat{n}} = \\mathbf{\\hat{y}}\\qquad (7)$$\n",
    "\n",
    "Note that:\n",
    "1. $\\mathbf{\\hat{n}}$ has the same statistical properties as the $\\mathbf{n}$;\n",
    "2. Eigen values of the $\\mathbf{HH}^H$ are the squared singular values of the channel matrix $\\mathbf{H}$ ($\\sigma_i = \\sqrt{\\lambda_i}$).\n",
    "\n",
    "Schematically this can be represented as:\n",
    "<img src=\"https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/pre-code-post-proc.png\" alt=\"sch\" width=\"500\" height=\"600\">\n",
    "> Fig.1. Schematic of modal decomposition of H when the channel is known to the transmitter\n",
    "and receiver \\[1, p.67\\].\n",
    "\n",
    "Actually, these routines allow to consider MIMO channel as the set of the $r$ parallel SISO channels. \n",
    "<img src=\"https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/parall-siso.png\" alt=\"parall\" width=\"500\" height=\"600\">\n",
    "> Fig.2. Schematic of modal decomposition of H when the channel is known to the transmitter\n",
    "and receiver \\[1, p.67\\].\n",
    "\n",
    "### Task №1\n",
    "Considered approach woorks well for MIMO case. However, what about other configurations: SIMO, MISO, SISO?"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Capacity as the Information theory term\n",
    "\n",
    "![cap1](https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/capacity-1.jpg)\n",
    "![cap2](https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/capacity-2.jpg)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "**Let us repeat**: \n",
    "\n",
    "Channel capasity of the MIMO channel can be considered as the sum of the channel capacity of the  SISO channels.\n",
    "\n",
    "This phenomena belongs to the **spatial multiplexing** (SM) concept. Furthermore, term **spatial multiplexing gain** is frequently used. This term means how much MIMO implementation increases in the transmission rate (or capacity) for the same bandwidth and with no additional power expenditure. By the formulas, we can say that the SM gain directly depends on the channel matrix rank."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Water-pouring algorithm "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "As we can see from the formula of the channel-known capacity the maximazation problem should be solved. **Water-pouring** (water-filling) algorithm can be applied \\[1, p.68-69\\]:"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [],
   "source": [
    "import numpy as np\n",
    "from numpy import linalg as LA\n",
    "import warnings\n",
    "warnings.filterwarnings('ignore')\n",
    "import matplotlib.pyplot as plt"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [],
   "source": [
    "def waterpouring(Mt, SNR_dB, H_chan):\n",
    "    SNR = 10**(SNR_dB/10)\n",
    "    r = LA.matrix_rank(H_chan)\n",
    "    H_sq = np.dot(H_chan,np.matrix(H_chan, dtype=complex).H)\n",
    "    lambdas = LA.eigvals(H_sq) \n",
    "    lambdas = np.sort(lambdas)[::-1]\n",
    "    p = 1;\n",
    "    gammas = np.zeros((r,1))\n",
    "    flag = True\n",
    "    while flag == True:\n",
    "        lambdas_r_p_1 = lambdas[0:(r-p+1)]\n",
    "        inv_lambdas_sum =  np.sum(1/lambdas_r_p_1)\n",
    "        mu = ( Mt / (r - p + 1) ) * ( 1 + (1/SNR) * inv_lambdas_sum)\n",
    "        for idx, item in enumerate(lambdas_r_p_1):\n",
    "            gammas[idx] = mu - (Mt/(SNR*item))\n",
    "        if gammas[r-p] < 0: #due to Python starts from 0\n",
    "            gammas[r-p] = 0 #due to Python starts from 0\n",
    "            p = p + 1\n",
    "        else:\n",
    "            flag = False\n",
    "    res = []\n",
    "    for gamma in gammas:\n",
    "        res.append(float(gamma))\n",
    "    return np.array(res)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Rank of the matrix: 2\n",
      "Gammas:\n",
      "[1.545 1.455]\n"
     ]
    }
   ],
   "source": [
    "#Test\n",
    "Mt = 3\n",
    "SNR_db = 10\n",
    "H_chan = np.array([[1,0,2],[0,1,0], [0,1,0]], dtype = float)\n",
    "gammas = waterpouring(Mt, SNR_db, H_chan)\n",
    "print('Rank of the matrix: '+str(LA.matrix_rank(H_chan)))\n",
    "print('Gammas:\\n'+str(gammas))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Short comparison"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "11.52330534603422\n"
     ]
    }
   ],
   "source": [
    "def openloop_capacity(H_chan, SNR_dB):\n",
    "    SNR = 10**(SNR_dB/10)\n",
    "    Mt = np.shape(H_chan)[1]\n",
    "    H_sq = np.dot(H_chan,np.matrix(H_chan, dtype=complex).H)\n",
    "    lambdas = LA.eigvals(H_sq) \n",
    "    lambdas = np.sort(lambdas)[::-1]\n",
    "    c = 0\n",
    "    for eig in lambdas:\n",
    "        c = c + np.log2(1 + SNR*eig/Mt)\n",
    "    return np.real(c)\n",
    "\n",
    "Mr = 4\n",
    "Mt = 4\n",
    "H_chan = (np.random.randn(Mr,Mt) + 1j*np.random.randn(Mr, Mt))/np.sqrt(2) #Rayleigh flat fading\n",
    "c = openloop_capacity(H_chan, 10)\n",
    "print(c)   "
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "11.827653818433925\n"
     ]
    }
   ],
   "source": [
    "def closedloop_capacity(H_chan, SNR_dB):\n",
    "    SNR = 10**(SNR_dB/10)\n",
    "    Mt = np.shape(H_chan)[1]\n",
    "    H_sq = np.dot(H_chan,np.matrix(H_chan, dtype=complex).H)\n",
    "    lambdas = LA.eigvals(H_sq) \n",
    "    lambdas = np.real(np.sort(lambdas))[::-1]\n",
    "    c = 0\n",
    "    gammas = waterpouring(Mt, SNR_dB, H_chan)\n",
    "    for idx, item in enumerate(lambdas):\n",
    "        c = c + np.log2(1+ SNR*item*gammas[idx]/Mt)\n",
    "    return np.real(c)\n",
    "\n",
    "c = closedloop_capacity(H_chan, 10)\n",
    "print(c)  "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Task №2:\n",
    "\n",
    "Solve the tasks from [the sample of the test exam](https://eb39cd48-a-62cb3a1a-s-sites.googlegroups.com/site/grintmimo/news/podgotovkakekzamenu/MoCo_SS15_kazan_sample.pdf?attachauth=ANoY7cr1rV8Auf5K9LB3_TUNFD6nGfkS6ISrds5BPwENtdL43btKXYU5VxtaxBM6d-LNh55KD2rAfKQeOx2n2Hr74RUbXF6-RrQRDIB_sOfYIXVa0bCO5iyTbigQn_GOrZNr7ST5o1oKI7rIrMp834zw1OtBN2il5JU6gocCu7_93gdISYeJ9GLplrZCoHkiE2JPfYlMScllFACcECgHfUInI77Funi50WFBY4w2ilsQtHDP8q95BSvKzcHol7H_mLClYhBmR0ad&attredirects=0). Solve the bonus task also. \n",
    "\n",
    "### Task №3\n",
    "\n",
    "What is the optimal power distribution $\\gamma^{opt}_1$, $\\gamma^{opt}_2$ across the three eigenmodes for $SNR \\to +\\infty$ and for $SNR \\to -\\infty$ (logarithmic scale)?"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Ergodic capacity"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "As you can see from the comparison examples we are working with the random processes. And, frankly speaking, it is little bit wrong to estimate something of the random processes by the only one realization. We need some averaging by the set of realizations.\n",
    "\n",
    "**Ergodic capacity** can be calculated if the channel is not variable in statistical meaning:\n",
    "\n",
    "$$ \\hat{C} = E\\left\\{ C \\right\\} \\qquad (8) $$\n",
    "\n",
    "where $E\\{*\\}$ denotes the expected value.\n",
    "\n",
    "\n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [],
   "source": [
    "Mr = 4\n",
    "Mt = 4\n",
    "counter = 1000\n",
    "SNR_dBs = [i for i in range(1, 21)]\n",
    "C_open = np.empty((len(SNR_dBs), counter))\n",
    "C_closed = np.empty((len(SNR_dBs), counter))\n",
    "\n",
    "for c in range(counter):\n",
    "    H_chan = (np.random.randn(Mr,Mt) + 1j*np.random.randn(Mr, Mt))/np.sqrt(2)\n",
    "    for idx, SNR_dB in enumerate(SNR_dBs):\n",
    "        C_open[idx, c] = openloop_capacity(H_chan, SNR_dB)\n",
    "        C_closed[idx, c] = closedloop_capacity(H_chan, SNR_dB)\n",
    "    \n",
    "C_open_erg = np.mean(C_open, axis=1)\n",
    "C_closed_erg = np.mean(C_closed, axis=1)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 3000x1500 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "fig = plt.figure(figsize=(10, 5), dpi=300)\n",
    "plt.plot(SNR_dBs, C_open_erg, label='Channel Unknown (CU)')\n",
    "plt.plot(SNR_dBs, C_closed_erg, label='Channel Known (CK)')\n",
    "plt.title(\"Ergodic Capacity\")\n",
    "plt.xlabel('SNR (dB)')\n",
    "plt.ylabel('Capacity (bps/Hz)')\n",
    "plt.legend()\n",
    "plt.grid()\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Outage capacity\n",
    "\n",
    "Additionaly, the knowledge about outage capacity is required in some cases. Let us just quote \\[1, p. 75\\]:\n",
    "\n",
    "> Outage analysis quantifies the level of performance (in this case capacity) that is guaranteed with a certain level of reliability. We define the $q$% outage capacity $C_{out}$,$q$ as the information rate that is guaranteed for $(100 − q)$% of the channel realizations, i.e., $P(C ≤ C_{out,q})$ = $q$%.\n",
    "\n",
    "![out](https://raw.githubusercontent.com/kirlf/CSP/master/MIMO/assets/outage.png)\n",
    "> Fig.3. 10% outage capacity for different antenna configurations. Outage capacity improves with larger antenna configurations \\[1, p. 75\\].\n",
    "\n",
    "In other words **outage capacity** is the guaranted capacity for the certain percentage of the channel realizations.\n"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Reference\n",
    "\n",
    "1. Paulraj, Arogyaswami, Rohit Nabar, and Dhananjay Gore. \n",
    "Introduction to space-time wireless communications. Cambridge university press, 2003."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Suggested literature\n",
    "\n",
    "1. Haykin S. Communication systems. – John Wiley & Sons, 2008. - p.366-368"
   ]
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3",
   "language": "python",
   "name": "python3"
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  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.6.4"
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