Fig3 added

Color noise generator.ipynb

@@ -192,38 +192,6 @@
     "print('Done')"
    ]
   },
-  {
-   "cell_type": "code",
-   "execution_count": 8,
-   "metadata": {},
-   "outputs": [
-    {
-     "data": {
-      "text/plain": [
-       "[<matplotlib.lines.Line2D at 0x7f64a60c1cf8>]"
-      ]
-     },
-     "execution_count": 8,
-     "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": [
-    "plt.plot(H,C)"
-   ]
-  },
   {
    "cell_type": "markdown",
    "metadata": {},
@@ -245,9 +213,9 @@
  ],
  "metadata": {
   "kernelspec": {
-   "display_name": "tf-gpu",
+   "display_name": "Python 3",
    "language": "python",
-   "name": "tf-gpu"
+   "name": "python3"
   },
   "language_info": {
    "codemirror_mode": {
@@ -259,7 +227,7 @@
    "name": "python",
    "nbconvert_exporter": "python",
    "pygments_lexer": "ipython3",
-   "version": "3.6.6"
+   "version": "3.6.9"
   }
  },
  "nbformat": 4,

Fig1.ipynb

@@ -114,8 +114,6 @@
     "\n",
     "plt.title('b)')\n",
     "\n",
-    "plt.savefig('./figures/Fig1.eps', format=\"eps\", bbox_inches='tight')\n",
-    "\n",
     "plt.show()"
    ]
   },
@@ -143,7 +141,7 @@
    "name": "python",
    "nbconvert_exporter": "python",
    "pygments_lexer": "ipython3",
-   "version": "3.6.6"
+   "version": "3.6.9"
   },
   "toc": {
    "colors": {

Fig2.ipynb

@@ -123,7 +123,6 @@
     "plt.xlabel('Dissimilarity Matrix')\n",
     "plt.title('b)')\n",
     "\n",
-    "plt.savefig('./figures/Fig2.eps', format=\"eps\", bbox_inches='tight')\n",
     "plt.show()"
    ]
   },

Fig21.ipynb

@@ -126,8 +126,6 @@
     "ax.fill(angles, values, 'g', alpha=0.1)\n",
     "plt.title('Divergence [JSD] \\n', size=16)\n",
     "\n",
-    "plt.savefig('./figures/Fig21.eps', format=\"eps\", bbox_inches='tight')\n",
-    "\n",
     "plt.show()"
    ]
   },

Fig22.ipynb

@@ -217,7 +217,6 @@
     "plt.xlim([0, len(masl)])\n",
     "# plt.ylim([0.1, np.max(cotas['Complexity'])])\n",
     "plt.legend(loc = 'upper right', ncol=5)\n",
-    "plt.savefig('./figures/Fig22.eps', format=\"eps\", bbox_inches='tight')\n",
     "plt.show()"
    ]
   },