update notebooks

1 files changed, 127 insertions, 147 deletions

diff --git a/notebooks/plot_gromov.ipynb b/notebooks/plot_gromov.ipynb
index 11c19d3..87937f0 100644
--- a/notebooks/plot_gromov.ipynb
+++ b/notebooks/plot_gromov.ipynb
@@ -30,161 +30,58 @@
    "metadata": {
     "collapsed": false
    },
-   "outputs": [],
-   "source": [
-    "# Author: Erwan Vautier <erwan.vautier@gmail.com>\r\n",
-    "#         Nicolas Courty <ncourty@irisa.fr>\r\n",
-    "#\r\n",
-    "# License: MIT License\r\n",
-    "\r\n",
-    "import scipy as sp\r\n",
-    "import numpy as np\r\n",
-    "import matplotlib.pylab as pl\r\n",
-    "from mpl_toolkits.mplot3d import Axes3D  # noqa\r\n",
-    "import ot"
-   ]
-  },
-  {
-   "cell_type": "markdown",
-   "metadata": {},
-   "source": [
-    "Sample two Gaussian distributions (2D and 3D)\r\n",
-    " ---------------------------------------------\r\n",
-    "\r\n",
-    " The Gromov-Wasserstein distance allows to compute distances with samples that\r\n",
-    " do not belong to the same metric space. For demonstration purpose, we sample\r\n",
-    " two Gaussian distributions in 2- and 3-dimensional spaces.\r\n",
-    "\n"
-   ]
-  },
-  {
-   "cell_type": "code",
-   "execution_count": 3,
-   "metadata": {
-    "collapsed": false
-   },
-   "outputs": [],
-   "source": [
-    "n_samples = 30  # nb samples\r\n",
-    "\r\n",
-    "mu_s = np.array([0, 0])\r\n",
-    "cov_s = np.array([[1, 0], [0, 1]])\r\n",
-    "\r\n",
-    "mu_t = np.array([4, 4, 4])\r\n",
-    "cov_t = np.array([[1, 0, 0], [0, 1, 0], [0, 0, 1]])\r\n",
-    "\r\n",
-    "\r\n",
-    "xs = ot.datasets.get_2D_samples_gauss(n_samples, mu_s, cov_s)\r\n",
-    "P = sp.linalg.sqrtm(cov_t)\r\n",
-    "xt = np.random.randn(n_samples, 3).dot(P) + mu_t"
-   ]
-  },
-  {
-   "cell_type": "markdown",
-   "metadata": {},
-   "source": [
-    "Plotting the distributions\r\n",
-    "--------------------------\r\n",
-    "\n"
-   ]
-  },
-  {
-   "cell_type": "code",
-   "execution_count": 4,
-   "metadata": {
-    "collapsed": false
-   },
    "outputs": [
     {
      "data": {
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Sya6vrwdTOkexmzR0U5DL5WJycpLGxkZSUlJwOp2kpaVta51wHPH5fFE/GB0OB0VFRXR1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\nmtfkErsZ71cQYrbMZRytoZj7aV6TS+xUfiHE8Pbs2QOlUon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\n",
       "text/plain": [
-       "<matplotlib.figure.Figure at 0x7fe3102491d0>"
+       "<matplotlib.figure.Figure at 0x7f275d787cf8>"
       ]
      },
      "metadata": {},
      "output_type": "display_data"
-    }
-   ],
-   "source": [
-    "fig = pl.figure()\r\n",
-    "ax1 = fig.add_subplot(121)\r\n",
-    "ax1.plot(xs[:, 0], xs[:, 1], '+b', label='Source samples')\r\n",
-    "ax2 = fig.add_subplot(122, projection='3d')\r\n",
-    "ax2.scatter(xt[:, 0], xt[:, 1], xt[:, 2], color='r')\r\n",
-    "pl.show()"
-   ]
-  },
-  {
-   "cell_type": "markdown",
-   "metadata": {},
-   "source": [
-    "Compute distance kernels, normalize them and then display\r\n",
-    "---------------------------------------------------------\r\n",
-    "\n"
-   ]
-  },
-  {
-   "cell_type": "code",
-   "execution_count": 5,
-   "metadata": {
-    "collapsed": false
-   },
-   "outputs": [
+    },
     {
      "data": {
-      "image/png": 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hGD7BFnTDMAyfYAu6YRiGTzjggi4i1SLyrIhsE5GtIvJ3E/YiEXlKROon/tZe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\n8dMc2rnMPuyVi2EYhk+wBd0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\n",
       "text/plain": [
-       "<matplotlib.figure.Figure at 0x7fe30e043a90>"
+       "<matplotlib.figure.Figure at 0x7f2751491cc0>"
       ]
      },
      "metadata": {},
      "output_type": "display_data"
-    }
-   ],
-   "source": [
-    "C1 = sp.spatial.distance.cdist(xs, xs)\r\n",
-    "C2 = sp.spatial.distance.cdist(xt, xt)\r\n",
-    "\r\n",
-    "C1 /= C1.max()\r\n",
-    "C2 /= C2.max()\r\n",
-    "\r\n",
-    "pl.figure()\r\n",
-    "pl.subplot(121)\r\n",
-    "pl.imshow(C1)\r\n",
-    "pl.subplot(122)\r\n",
-    "pl.imshow(C2)\r\n",
-    "pl.show()"
-   ]
-  },
-  {
-   "cell_type": "markdown",
-   "metadata": {},
-   "source": [
-    "Compute Gromov-Wasserstein plans and distance\r\n",
-    "---------------------------------------------\r\n",
-    "\n"
-   ]
-  },
-  {
-   "cell_type": "code",
-   "execution_count": 6,
-   "metadata": {
-    "collapsed": false
-   },
-   "outputs": [
+    },
     {
      "name": "stdout",
      "output_type": "stream",
      "text": [
-      "Gromov-Wasserstein distances between the distribution: 0.201997813845\n"
+      "It.  |Loss        |Delta loss\n",
+      "--------------------------------\n",
+      "    0|3.767714e-02|0.000000e+00\n",
+      "    1|2.091125e-02|-8.017640e-01\n",
+      "    2|1.607458e-02|-3.008895e-01\n",
+      "    3|1.486883e-02|-8.109274e-02\n",
+      "    4|1.484811e-02|-1.394896e-03\n",
+      "    5|1.484791e-02|-1.400744e-05\n",
+      "    6|1.484790e-02|-1.400803e-07\n",
+      "    7|1.484790e-02|-1.400805e-09\n",
+      "    8|1.484790e-02|-1.400768e-11\n",
+      "It.  |Err         \n",
+      "-------------------\n",
+      "    0|7.522843e-02|\n",
+      "   10|2.233137e-04|\n",
+      "   20|5.767057e-07|\n",
+      "   30|2.315565e-09|\n",
+      "   40|9.789603e-12|\n",
+      "Gromov-Wasserstein distances: 0.014847904422308234\n",
+      "Entropic Gromov-Wasserstein distances: 0.011257422087381012\n"
      ]
     },
     {
      "data": {
-      "image/png": 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+      "image/png": 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\n",
       "text/plain": [
-       "<matplotlib.figure.Figure at 0x7fe31024a390>"
+       "<matplotlib.figure.Figure at 0x7f275141c2b0>"
       ]
      },
      "metadata": {},
@@ -192,38 +89,121 @@
     }
    ],
    "source": [
-    "p = ot.unif(n_samples)\r\n",
-    "q = ot.unif(n_samples)\r\n",
-    "\r\n",
-    "gw = ot.gromov_wasserstein(C1, C2, p, q, 'square_loss', epsilon=5e-4)\r\n",
-    "gw_dist = ot.gromov_wasserstein2(C1, C2, p, q, 'square_loss', epsilon=5e-4)\r\n",
-    "\r\n",
-    "print('Gromov-Wasserstein distances between the distribution: ' + str(gw_dist))\r\n",
-    "\r\n",
-    "pl.figure()\r\n",
-    "pl.imshow(gw, cmap='jet')\r\n",
-    "pl.colorbar()\r\n",
+    "# Author: Erwan Vautier <erwan.vautier@gmail.com>\n",
+    "#         Nicolas Courty <ncourty@irisa.fr>\n",
+    "#\n",
+    "# License: MIT License\n",
+    "\n",
+    "import scipy as sp\n",
+    "import numpy as np\n",
+    "import matplotlib.pylab as pl\n",
+    "from mpl_toolkits.mplot3d import Axes3D  # noqa\n",
+    "import ot\n",
+    "\n",
+    "\n",
+    "#\n",
+    "# Sample two Gaussian distributions (2D and 3D)\n",
+    "# ---------------------------------------------\n",
+    "#\n",
+    "# The Gromov-Wasserstein distance allows to compute distances with samples that\n",
+    "# do not belong to the same metric space. For demonstration purpose, we sample\n",
+    "# two Gaussian distributions in 2- and 3-dimensional spaces.\n",
+    "\n",
+    "\n",
+    "n_samples = 30  # nb samples\n",
+    "\n",
+    "mu_s = np.array([0, 0])\n",
+    "cov_s = np.array([[1, 0], [0, 1]])\n",
+    "\n",
+    "mu_t = np.array([4, 4, 4])\n",
+    "cov_t = np.array([[1, 0, 0], [0, 1, 0], [0, 0, 1]])\n",
+    "\n",
+    "\n",
+    "xs = ot.datasets.get_2D_samples_gauss(n_samples, mu_s, cov_s)\n",
+    "P = sp.linalg.sqrtm(cov_t)\n",
+    "xt = np.random.randn(n_samples, 3).dot(P) + mu_t\n",
+    "\n",
+    "\n",
+    "#\n",
+    "# Plotting the distributions\n",
+    "# --------------------------\n",
+    "\n",
+    "\n",
+    "fig = pl.figure()\n",
+    "ax1 = fig.add_subplot(121)\n",
+    "ax1.plot(xs[:, 0], xs[:, 1], '+b', label='Source samples')\n",
+    "ax2 = fig.add_subplot(122, projection='3d')\n",
+    "ax2.scatter(xt[:, 0], xt[:, 1], xt[:, 2], color='r')\n",
+    "pl.show()\n",
+    "\n",
+    "\n",
+    "#\n",
+    "# Compute distance kernels, normalize them and then display\n",
+    "# ---------------------------------------------------------\n",
+    "\n",
+    "\n",
+    "C1 = sp.spatial.distance.cdist(xs, xs)\n",
+    "C2 = sp.spatial.distance.cdist(xt, xt)\n",
+    "\n",
+    "C1 /= C1.max()\n",
+    "C2 /= C2.max()\n",
+    "\n",
+    "pl.figure()\n",
+    "pl.subplot(121)\n",
+    "pl.imshow(C1)\n",
+    "pl.subplot(122)\n",
+    "pl.imshow(C2)\n",
+    "pl.show()\n",
+    "\n",
+    "#\n",
+    "# Compute Gromov-Wasserstein plans and distance\n",
+    "# ---------------------------------------------\n",
+    "\n",
+    "p = ot.unif(n_samples)\n",
+    "q = ot.unif(n_samples)\n",
+    "\n",
+    "gw0, log0 = ot.gromov.gromov_wasserstein(\n",
+    "    C1, C2, p, q, 'square_loss', verbose=True, log=True)\n",
+    "\n",
+    "gw, log = ot.gromov.entropic_gromov_wasserstein(\n",
+    "    C1, C2, p, q, 'square_loss', epsilon=5e-4, log=True, verbose=True)\n",
+    "\n",
+    "\n",
+    "print('Gromov-Wasserstein distances: ' + str(log0['gw_dist']))\n",
+    "print('Entropic Gromov-Wasserstein distances: ' + str(log['gw_dist']))\n",
+    "\n",
+    "\n",
+    "pl.figure(1, (10, 5))\n",
+    "\n",
+    "pl.subplot(1, 2, 1)\n",
+    "pl.imshow(gw0, cmap='jet')\n",
+    "pl.title('Gromov Wasserstein')\n",
+    "\n",
+    "pl.subplot(1, 2, 2)\n",
+    "pl.imshow(gw, cmap='jet')\n",
+    "pl.title('Entropic Gromov Wasserstein')\n",
+    "\n",
     "pl.show()"
    ]
   }
  ],
  "metadata": {
   "kernelspec": {
-   "display_name": "Python 2",
+   "display_name": "Python 3",
    "language": "python",
-   "name": "python2"
+   "name": "python3"
   },
   "language_info": {
    "codemirror_mode": {
     "name": "ipython",
-    "version": 2
+    "version": 3
    },
    "file_extension": ".py",
    "mimetype": "text/x-python",
    "name": "python",
    "nbconvert_exporter": "python",
-   "pygments_lexer": "ipython2",
-   "version": "2.7.12"
+   "pygments_lexer": "ipython3",
+   "version": "3.5.2"
   }
  },
  "nbformat": 4,