{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Optimization\n",
    "### by Ilya Nemenman, Mar 3, 2019"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [],
   "source": [
    "#Initialization\n",
    "import numpy as np\n",
    "from scipy.integrate import odeint\n",
    "from scipy.optimize import curve_fit # note a new module\n",
    "import matplotlib.pyplot as plt\n",
    "\n",
    "%matplotlib inline "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Linear regression"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/plain": [
       "<matplotlib.legend.Legend at 0x151376a400>"
      ]
     },
     "execution_count": 2,
     "metadata": {},
     "output_type": "execute_result"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "x = np.arange(10)\n",
    "y = np.array([-1, 0.2, 0.9, 2.1, 3.0, 3.9, 4.5, 4.9, 5.3, 6.1])\n",
    "A1 = np.vstack([np.ones(len(x)), x]).T        # argument for a simple regression\n",
    "A2 = np.vstack([np.ones(len(x)), x, x**2]).T  # argument for linear regression on linear and quadratic terms\n",
    "A4 = np.vstack([np.ones(len(x)), x, x**2, x**3, x**4]).T  #argumen\n",
    "\n",
    "a1, b1 = np.linalg.lstsq(A1, y, rcond=None)[0]\n",
    "a2, b2, c2 = np.linalg.lstsq(A2, y, rcond=None)[0]\n",
    "a4, b4, c4, d4, e4 = np.linalg.lstsq(A4, y, rcond=None)[0]\n",
    "\n",
    "plt.plot(x, y, 'o', label='Original data', markersize=4)\n",
    "x = np.arange(-5, 15, 1)\n",
    "plt.plot(x, a1+b1*x, 'r', label='Fitted line, linear')\n",
    "plt.plot(x, a2+b2*x+c2*x**2, 'g', label='Fitted line, quadratic')\n",
    "plt.plot(x, a4+b4*x+c4*x**2+d4*x**3+e4*x**4, 'b', label='Fitted line, quartic')\n",
    "plt.xlabel('argument')\n",
    "plt.ylabel('function')\n",
    "plt.legend(loc=4)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "## Fitting parameters of physical models "
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Definining functions to be fitted"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [],
   "source": [
    "#Michaelis-Menten rate equation\n",
    "def MichaelisMenten(x, t, V, K):\n",
    "    return -V*x/(K+x)\n",
    "\n",
    "#Michaelis-Menten trajectory\n",
    "def MMTrajectory(t, V, K):\n",
    "    return odeint(MichaelisMenten, init_conc, t, args=(V, K)).flatten()\n",
    "\n",
    "#logarithm of the Michaelis-Menten trajectory\n",
    "def logMMTrajectory(t, V, K):\n",
    "    return np.log(odeint(MichaelisMenten, init_conc, t, args=(V, K)).flatten())"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Generating simulated experimental data"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 4,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "init_conc = 10.0     # initial concentration\n",
    "t = np.linspace(0, 10, 30).flatten()  # time points \n",
    "x = odeint(MichaelisMenten, init_conc, t, args=(3.3, 3.0)).flatten()  # true MM trajectory with arguments 3.3 and 3.0\n",
    "data = (1+0.2*np.random.randn(x.size))*x # trajectory with additional relative noise of 20%\n",
    "plt.plot(t, x, label='simulated')\n",
    "plt.plot(t, data, 'o', label='simulated noisy')\n",
    "plt.xlabel('time')\n",
    "plt.ylabel('substrate concentration')\n",
    "plt.legend()\n",
    "plt.show() \n",
    "# note the initial linear decrease in the substrate concentration\n",
    "\n",
    "plt.semilogy(t, x, label='simulated')\n",
    "plt.semilogy(t, data, 'o', label='simulated noisy')\n",
    "plt.xlabel('time')\n",
    "plt.ylabel('substrate concentration')\n",
    "plt.legend()\n",
    "plt.show()\n",
    "# note the exponential (linear in the semi-log plot) decrease of the substrate concentration at longer times"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Fiding a good guess for V using a linear fit for the first part of the curve"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Estimated V=2.2895071046167264\n"
     ]
    }
   ],
   "source": [
    "first_range = 11\n",
    "A = t[0:first_range]\n",
    "A = A.reshape((A.size, 1))\n",
    "y = data[0:first_range]-init_conc\n",
    "y = y.reshape((y.size, 1))\n",
    "\n",
    "a = float(np.linalg.lstsq(A, y, rcond=None)[0])\n",
    "v_guess = -a\n",
    "print('Estimated V=' + str(v_guess))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Fiding a good guess for K using a linear fit for the log-transformed data in the second range of the curve (equivalently, exponential fit to the tail of the data)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Estimated K=2.1981783943710105\n"
     ]
    }
   ],
   "source": [
    "second_range = 15\n",
    "A = t[second_range:]\n",
    "A = np.vstack([np.ones(A.size), A]).T\n",
    "y = np.log(data[second_range:])\n",
    "\n",
    "a, b = np.linalg.lstsq(A, y, rcond=None)[0]\n",
    "k_guess = -v_guess/b\n",
    "\n",
    "print('Estimated K=' + str(k_guess))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Fitting the MM equation to the data and finding the parameters "
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Fitted V=4.167541880235418\n",
      "Fitted K=5.133754079055535\n"
     ]
    }
   ],
   "source": [
    "v, k = curve_fit(MMTrajectory, t, data, p0=(v_guess, k_guess))[0]\n",
    "\n",
    "plt.plot(t, data, 'o', label='data')\n",
    "plt.plot(t, MMTrajectory(t, v, k), label='fit')\n",
    "plt.legend()\n",
    "plt.xlabel('time')\n",
    "plt.ylabel('substrate concentration')\n",
    "plt.show()\n",
    "\n",
    "plt.semilogy(t, data, 'o', label='data')\n",
    "plt.semilogy(t, MMTrajectory(t, v, k), label='fit')\n",
    "plt.legend()\n",
    "plt.xlabel('time')\n",
    "plt.ylabel('substrate concentration')\n",
    "plt.show()\n",
    "# Note how the fitted curve deviates from data at large times\n",
    "# This deviation is manifested in quite a large relative error in estimation of V and K\n",
    "\n",
    "print('Fitted V=' + str(v))\n",
    "print('Fitted K=' + str(k))"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Fitting the MM equation to the log-transformed data and finding the parameters \n"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 432x288 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    },
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "Log-fitted V=3.3290212373208417\n",
      "Log-fitted K=3.0306868126584408\n"
     ]
    }
   ],
   "source": [
    "vl, kl = curve_fit(logMMTrajectory, t, np.log(data), p0=(v_guess, k_guess))[0]\n",
    "\n",
    "plt.plot(t, data, 'o', label='data')\n",
    "plt.plot(t, MMTrajectory(t, vl, kl), label='log fit')\n",
    "plt.legend()\n",
    "plt.xlabel('time')\n",
    "plt.ylabel('substrate concentration')\n",
    "plt.show()\n",
    "\n",
    "plt.semilogy(t, data, 'o', label='data')\n",
    "plt.semilogy(t, MMTrajectory(t, vl, kl), label='log fit')\n",
    "plt.legend()\n",
    "plt.show()\n",
    "# Note a much smaller deviation of the fitted curve from data at large times\n",
    "# This smaller deviation is manifested in a smaller relative error in estimation of V and K\n",
    "\n",
    "print('Log-fitted V=' + str(vl))\n",
    "print('Log-fitted K=' + str(kl))"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "metadata": {},
   "outputs": [],
   "source": []
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3",
   "language": "python",
   "name": "python3"
  },
  "language_info": {
   "codemirror_mode": {
    "name": "ipython",
    "version": 3
   },
   "file_extension": ".py",
   "mimetype": "text/x-python",
   "name": "python",
   "nbconvert_exporter": "python",
   "pygments_lexer": "ipython3",
   "version": "3.7.1"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}