{
 "cells": [
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "# Bilayer Sonophore model: analysis of static pressure forces\n",
    "\n",
    "### Imports"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [],
   "source": [
    "import time\n",
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "from matplotlib import ticker\n",
    "\n",
    "from PySONIC.core import BilayerSonophore, PmCompMethod"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Parameters"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [],
   "source": [
    "a = 32e-9  # in-plane radius (m)\n",
    "Cm0 = 1e-2  # membrane resting capacitance (F/m2)\n",
    "Qm0 = -71.9e-5  # membrane resting charge density (C/m2)\n",
    "bls = BilayerSonophore(a, Cm0, Qm0)\n",
    "Z = np.linspace(-0.45 * bls.Delta, 2 * bls.a, 3000)"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Functions"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "metadata": {},
   "outputs": [],
   "source": [
    "def prepareAxis(ax, xlabel, fs):\n",
    "    if xlabel == 'Leaflet deflection (nm)':\n",
    "        ax.set_xticks([-0.5 * bls.Delta * 1e9, bls.a * 1e9])\n",
    "        ax.set_xticklabels(['$-\\Delta / 2$', 'a'])\n",
    "        ax.axvline(-0.5 * bls.Delta * 1e9, linestyle='--', color='dimgrey')\n",
    "        ax.axvline(bls.a * 1e9, linestyle='--', color='dimgrey')\n",
    "        ax.yaxis.set_major_locator(ticker.MaxNLocator(2))\n",
    "        ax.axhline(0.0, color='k', linewidth=1)\n",
    "    else:\n",
    "        ax.set_yticks([-0.5 * bls.Delta * 1e9, 0])\n",
    "        ax.set_yticklabels(['$-\\Delta / 2$', '0'])\n",
    "        ax.axhline(-0.5 * bls.Delta * 1e9, linestyle='--', color='dimgrey')\n",
    "        ax.axhline(0, linestyle='--', color='dimgrey')\n",
    "        ax.xaxis.set_major_locator(ticker.MaxNLocator(2))\n",
    "        ax.axvline(0.0, color='k', linewidth=1)\n",
    "    ax.set_xlabel(xlabel, fontsize=fs)\n",
    "    for key in ['top', 'right']:\n",
    "        ax.spines[key].set_visible(False)\n",
    "            \n",
    "\n",
    "def plotVars(yvars, labels, limits=None, sharex=False, unit=None, xvar=Z * 1e9, xlabel='Leaflet deflection (nm)', fs=12, lw=2):\n",
    "    if not sharex:\n",
    "        naxes = len(yvars)\n",
    "        fig, axes = plt.subplots(1, naxes, figsize=(7 * naxes, 3))\n",
    "        if naxes == 1:\n",
    "            axes = [axes]\n",
    "        for i, ax, in enumerate(axes):\n",
    "            prepareAxis(ax, xlabel, fs)\n",
    "            ax.set_ylabel(labels[i], fontsize=fs)\n",
    "            ax.plot(xvar, yvars[i], linewidth=lw)\n",
    "            if limits is not None:\n",
    "                ax.set_ylim(limits[i])\n",
    "    else:\n",
    "        naxes = len(yvars)\n",
    "        fig, ax = plt.subplots(1, 1, figsize=(7, 3))\n",
    "        prepareAxis(ax, xlabel, fs)\n",
    "        ax.set_ylabel(unit, fontsize=fs)\n",
    "        for yvar, label in zip(yvars, labels):\n",
    "            ax.plot(xvar, yvar, linewidth=lw, label=label)\n",
    "        if limits is not None:\n",
    "            ax.set_ylim(limits)\n",
    "        ax.legend(fontsize=fs, loc='center right', bbox_to_anchor=(1.5, 0.5), frameon=False)\n",
    "    fig.tight_layout()\n",
    "    return fig"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Geometrical variables"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 11,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 1512x216 with 3 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "R = bls.v_curvrad(Z)\n",
    "S = bls.surface(Z)\n",
    "V = bls.volume(Z)\n",
    "\n",
    "fig = plotVars(\n",
    "    [1 / R * 1e-9, S * 1e18, V * 1e27],\n",
    "    ['Curvature ($nm^{-1}$)', 'Surface ($nm^2$)', 'Volume ($nm^3$)']\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "- The **leaflet curvature** is negative for a compressed sonophore (Z < 0) and positive for a expanded sonophore (Z > 0). It reaches a maximum when the deflection equals the in-plane diameter of the sonophore\n",
    "- The **leaflet surface** and **sonophore volume** both increase with the deflection magnitude. Note that the relative surface increases is less pronounced than the relative volume increase"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Intermolecular pressure"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 12,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 504x216 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "Pm_apex = np.array([bls.PMlocal(0.0, z, r) for z, r in zip(Z, R)])\n",
    "Pm_avg = bls.v_PMavg(Z, R, S)\n",
    "Pm_avg_predict = bls.PMavgpred(Z)\n",
    "\n",
    "fig = plotVars(\n",
    "    [Pm_apex * 1e-3, Pm_avg * 1e-3, Pm_avg_predict * 1e-3],\n",
    "    ['$P_{M, apex}$', '$\\overline{P_{M}}$', 'approximated $\\overline{P_{M}}$'],\n",
    "    limits=(-20, 20),\n",
    "    sharex=True,\n",
    "    unit='Pressure (kPa)'\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "- The **intermolecular pressure at the leaflet apex** follows a marked *Lennard-Jones* profile\n",
    "- The **average leaflet intermolecular pressure** profile is similar in nature but less marked than that of the apex pressure\n",
    "- The ***Lennard-Jones* approximation of the average leaflet intermolecular pressure** is quite accurate"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Electrical pressure"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 13,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 504x216 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "PQ_Qm0 = bls.Pelec(Z, bls.Qm0)\n",
    "PQ_0 = bls.Pelec(Z, 0)\n",
    "PQ_AP = bls.Pelec(Z, 30.0e-5)\n",
    "\n",
    "fig = plotVars(\n",
    "    [PQ_Qm0 * 1e-3, PQ_0 * 1e-3, PQ_AP * 1e-3],\n",
    "    ['$P_{Q, -71.9\\ nC/cm^2}$', '$P_{Q, 0\\ nC/cm^2}$', '$P_{Q, +30\\ nC/cm^2}$'],\n",
    "    sharex=True,\n",
    "    unit='Pressure (kPa)'\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "**Electrical pressure** is null when the membrane is not charged, and then increases in magnitude with the square of charge density and decreases as the inter-leaflet distance increases"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Gas pressure"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 14,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 504x216 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "Pg_ng0 = bls.gasmol2Pa(bls.ng0, V)\n",
    "Pg_sparse = bls.gasmol2Pa(0.1 * bls.ng0, V)\n",
    "Pg_dense = bls.gasmol2Pa(10 * bls.ng0, V)\n",
    "\n",
    "fig = plotVars(\n",
    "    np.array([Pg_ng0, Pg_sparse, Pg_dense]) * 1e-3,\n",
    "    ['$P_{G, ng0}$', '$P_{G, 0.1 \\cdot ng0}$', '$P_{G, 10 \\cdot ng0}$'],\n",
    "    sharex=True,\n",
    "    unit='Pressure (kPa)',\n",
    "    limits=(-10, 150)\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "In th absence of gas transport, **gas pressure** increases here when the sonophore is compressed. However, in reality gas transport keeps the pressure around $P_0$."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Elastic tension pressure"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 15,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 504x216 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "Pel = bls.PEtot(Z, R)\n",
    "fig = plotVars(\n",
    "    np.array([Pel]) * 1e-3,\n",
    "    ['$P_{elastic}$ (kPa)']\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "**Elastic tension pressure** increases with the relative stretch of the sonpophore leaflets. Therefore, it is null at Z = 0 and increases during both sonophore compressions and expansions. Its effect is very limited during compressions, however it becomes quite significant during expansions phases."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Pressure balance"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 16,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 504x216 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "P0 = np.ones(len(Z)) * bls.P0\n",
    "\n",
    "fig = plotVars(\n",
    "    np.array([Pg_ng0, Pm_avg, Pel, PQ_Qm0, -P0]) * 1e-3,\n",
    "    ['$P_{G, ng0}$', '$\\overline{P_{M}}$', '$P_{elastic}$', '$P_{Q, -71.9\\ nC/cm^2}$', '$P_0$'],\n",
    "    limits=(-150, 150),\n",
    "    sharex=True,\n",
    "    unit='Pressure (kPa)'\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "As expected, the **intermolecular pressure dominates during compressions**, while the **elastic tension pressure dominates for siginficant expansions**. **In between, the static and gas pressure dominate** together."
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Balance quasi-steady deflection"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 17,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": 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\n",
      "text/plain": [
       "<Figure size 504x216 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "Pac = np.linspace(-1e5, 1e5, 100)\n",
    "Zqs = np.array([bls.balancedefQS(bls.ng0, bls.Qm0, pac, PmCompMethod.direct) for pac in Pac])\n",
    "\n",
    "fig = plotVars(\n",
    "    [Zqs * 1e9],\n",
    "    ['Balance deflection (nm)'],\n",
    "    xvar=Pac * 1e-3,\n",
    "    xlabel='Acoustic pressure (kPa)'\n",
    ")"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "As expected, a negative acoustic pressure drives the quasi-steady system towards a positive deflection, whereas a positive acoustic pressure drives the system towards comprression."
   ]
  }
 ],
 "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": "3.7.3"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}