{
 "cells": [
  {
   "cell_type": "code",
   "execution_count": 1,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/plain": [
       "<IPython.core.display.Image object>"
      ]
     },
     "execution_count": 1,
     "metadata": {
      "image/png": {
       "width": 200
      }
     },
     "output_type": "execute_result"
    }
   ],
   "source": [
    "from IPython.display import Image\n",
    "Image('../../Python_probability_statistics_machine_learning_2E.png',width=200)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 2,
   "metadata": {},
   "outputs": [],
   "source": [
    "%matplotlib inline\n",
    "\n",
    "import numpy as np\n",
    "import pandas as pd\n",
    "from matplotlib.pylab import subplots\n",
    "from matplotlib.patches import  Circle, Rectangle"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "### Survival curves\n",
    "\n",
    "The problem is to estimate the length of time units (e.g.,\n",
    "subjects,\n",
    "individuals, components) exist in a cohort over time. For example,\n",
    "consider the\n",
    "following data. The rows are the days in a 30-day period and the\n",
    "columns are the\n",
    "individual units. For example, these could be five patients who\n",
    "all receive a\n",
    "particular treatment on day 0 and then *survive* (indicated by\n",
    "`1`) the next 30\n",
    "days on not (indicated by `0`)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 3,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/html": [
       "<div>\n",
       "<style scoped>\n",
       "    .dataframe tbody tr th:only-of-type {\n",
       "        vertical-align: middle;\n",
       "    }\n",
       "\n",
       "    .dataframe tbody tr th {\n",
       "        vertical-align: top;\n",
       "    }\n",
       "\n",
       "    .dataframe thead th {\n",
       "        text-align: right;\n",
       "    }\n",
       "</style>\n",
       "<table border=\"1\" class=\"dataframe\">\n",
       "  <thead>\n",
       "    <tr style=\"text-align: right;\">\n",
       "      <th></th>\n",
       "      <th>A</th>\n",
       "      <th>B</th>\n",
       "      <th>C</th>\n",
       "      <th>D</th>\n",
       "      <th>E</th>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>day</th>\n",
       "      <th></th>\n",
       "      <th></th>\n",
       "      <th></th>\n",
       "      <th></th>\n",
       "      <th></th>\n",
       "    </tr>\n",
       "  </thead>\n",
       "  <tbody>\n",
       "    <tr>\n",
       "      <th>1</th>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>2</th>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>3</th>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>4</th>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>5</th>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>6</th>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>7</th>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "  </tbody>\n",
       "</table>\n",
       "</div>"
      ],
      "text/plain": [
       "     A  B  C  D  E\n",
       "day               \n",
       "1    1  1  1  1  1\n",
       "2    1  1  1  1  1\n",
       "3    0  1  1  1  1\n",
       "4    0  1  1  0  1\n",
       "5    0  1  0  0  1\n",
       "6    0  0  0  0  1\n",
       "7    0  0  0  0  1"
      ]
     },
     "execution_count": 3,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "d = pd.DataFrame(index=range(1,8),\n",
    "                 columns=['A','B','C','D','E' ],\n",
    "                 data=1)\n",
    "d.loc[3:,'A']=0\n",
    "d.loc[6:,'B']=0\n",
    "d.loc[5:,'C']=0\n",
    "d.loc[4:,'D']=0\n",
    "d.index.name='day'\n",
    "d"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Importantly, survival is a one-way street --- once a subject is *dead*, then\n",
    "that subject cannot return to the experiment. This is important because survival\n",
    "analysis is also applied to component-failure or other topics where this fact is\n",
    "not so obvious. The following chart shows the survival status of each of the\n",
    "subjects for all seven days. The blue circles indicate that the subject is alive\n",
    "and the red squares indicate death of the subject."
   ]
  },
  {
   "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"
    }
   ],
   "source": [
    "fig,ax =subplots()\n",
    "\n",
    "_=ax.axis((-0.5,6.5,-1,5))\n",
    "for ii,jj in zip(*np.where(d.values)):\n",
    "    _=ax.add_patch(Circle((ii,jj),0.25))\n",
    "\n",
    "for ii,jj in zip(*np.where(d.values==0)):\n",
    "    _=ax.add_patch(Rectangle((ii-0.25,jj-0.25),0.5,0.5,color='red',alpha=.8))\n",
    "    \n",
    "_=ax.set_yticklabels(['','A','B','C','D','E','',''],fontsize=12);\n",
    "_=ax.invert_yaxis()\n",
    "_=ax.set_xlabel('Days',fontsize=16)\n",
    "_=ax.set_ylabel('Subject',fontsize=16)\n",
    "_=ax.set_title('Survival Chart',fontsize=16)\n",
    "\n",
    "_=ax.spines['right'].set_visible(0)\n",
    "_=ax.spines['top'].set_visible(0)\n",
    "ax.set_aspect(1)\n",
    "fig.savefig('fig-statistics/survival_analysis_001a.png')"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<!-- # ** -->\n",
    "\n",
    "<!-- dom:FIGURE: [fig-statistics/survival_analysis_001a.png,\n",
    "width=800 frac=0.65] The red squares indicate a dead subject, and the blue a\n",
    "living subject. <div id=\"fig:survival_analysis_001a\"></div> -->\n",
    "<!-- begin\n",
    "figure -->\n",
    "<div id=\"fig:survival_analysis_001a\"></div>\n",
    "\n",
    "<p>The red squares\n",
    "indicate a dead subject, and the blue a living subject.</p>\n",
    "<img src=\"fig-\n",
    "statistics/survival_analysis_001a.png\" width=400>\n",
    "\n",
    "<!-- end figure -->"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 5,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "image/png": "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\n",
      "text/plain": [
       "<Figure size 720x432 with 5 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "fig,axs=subplots(5,1,sharex=True,sharey=True)\n",
    "fig.set_size_inches((10,6))\n",
    "\n",
    "for i,j in enumerate(d.columns):\n",
    "    _=d[j].plot(ax=axs[i],marker='o')\n",
    "    _=axs[i].axis(ymax=1.1,ymin=-.1)\n",
    "    _=axs[i].set_ylabel(j)"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 6,
   "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"
    }
   ],
   "source": [
    "fig,ax=subplots()\n",
    "_=(d.sum(axis=1)/d.shape[1]).plot(ax=ax,marker='o')\n",
    "_=ax.set_ylabel('Survival probability',fontsize=18)\n",
    "_=ax.axis(ymin=0,ymax=1.1)\n",
    "fig.savefig('fig-statistics/survival_analysis_001.png')"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<!-- dom:FIGURE: [fig-statistics/survival_analysis_001.png, width=800 frac=0.65]\n",
    "The survival probability decreases by day. <div\n",
    "id=\"fig:survival_analysis_001\"></div> -->\n",
    "<!-- begin figure -->\n",
    "<div\n",
    "id=\"fig:survival_analysis_001\"></div>\n",
    "\n",
    "<p>The survival probability decreases by\n",
    "day.</p>\n",
    "<img src=\"fig-statistics/survival_analysis_001.png\" width=300>\n",
    "\n",
    "<!--\n",
    "end figure -->\n",
    "\n",
    "\n",
    "There is another important recursive perspective on this\n",
    "calculation. Imagine\n",
    "there is a life raft containing $[A,B,C,D,E]$. Everyone\n",
    "survives until day two\n",
    "when \\emph{A} dies. This leaves four in the life raft\n",
    "$[B,C,D,E]$. Thus,  from the\n",
    "perspective of day one, the survival probability is\n",
    "the probability of surviving\n",
    "just up until day two and then surviving day two,\n",
    "$\\mathbb{P}_S(t\\ge 2)\n",
    "=\\mathbb{P}(t\\notin [0,2)\\vert\n",
    "t<2)\\mathbb{P}_S(t=2)=(1)(4/5)=4/5$. In words,\n",
    "this means that surviving past\n",
    "the second day is the product of surviving the\n",
    "second day itself and not having\n",
    "a death up to that point (i.e., surviving up to\n",
    "that point). Using this\n",
    "recursive approach, the survival probability for the\n",
    "third day is\n",
    "$\\mathbb{P}_S(t\\ge 3) =\\mathbb{P}_S(t> 3)\\mathbb{P}_S(t=3)=(4/5)(3/4)=3/5$.\n",
    "Recall that just before the third day, the\n",
    "life raft contains $[B,C,D,E]$ and\n",
    "on the third day we have $[B,C,E]$. Thus,\n",
    "from the perspective of just before\n",
    "the third day there are four survivors in\n",
    "the raft and on the third day there\n",
    "are three $3/4$. Using this recursive\n",
    "argument generates the same plot and comes\n",
    "in handy with censoring.\n",
    "\n",
    "### Censoring and truncation\n",
    "\n",
    "Censoring occurs when a\n",
    "subject leaves (right censoring) or enters (left\n",
    "censoring) the study. There are\n",
    "two general types of right censoring.\n",
    "The so-called Type I right censoring is\n",
    "when a subject randomly drops\n",
    "out of the study.\n",
    "This random drop-out is another\n",
    "statistical effect that has to be accounted for\n",
    "in estimating survival. Type II\n",
    "right censoring occurs when the study is\n",
    "terminated when enough specific random\n",
    "events occur.\n",
    "\n",
    "Likewise, left censoring occurs when a subject enters the study\n",
    "prior to a certain\n",
    "date, but exactly when this happened is unknown. This happens\n",
    "in study designs\n",
    "involving two separate studies stages. For example, a subject\n",
    "might enroll in the\n",
    "first selection process but be ineligible for the second\n",
    "process. Specifically,\n",
    "suppose a study concerns drug use and certain subjects\n",
    "have used the drug before\n",
    "the study but are unable to report exactly when. These\n",
    "subjects are left\n",
    "censored. Left truncation (a.k.a. staggered entry, delayed\n",
    "entry) is similar\n",
    "except the date of entry is known. For example, a subject that\n",
    "starts taking a drug\n",
    "after being initially left out of the study.\n",
    "\n",
    "Right\n",
    "censoring is the most common so let's consider an example. Let's estimate\n",
    "the\n",
    "survival function given the following survival times in days:\n",
    "\n",
    "$$\n",
    "\\{ 1, 2,3^+,4,5,6^+,7,8 \\}\n",
    "$$\n",
    "\n",
    " where the censored survival times are indicated by the\n",
    "plus symbol. As before,\n",
    "the survival time at the $0^{th}$ day is $8/8=1$, the\n",
    "first day is $7/8$, the\n",
    "second day = $(7/8)(6/7)$. Now, we come to the first\n",
    "right censored entry. The\n",
    "survival time for the third day is $(7/8)(6/7)(5/5) =\n",
    "(7/8)(6/7)$. Thus, the\n",
    "subject who dropped out is not considered *dead* and\n",
    "cannot be counted as such\n",
    "but is considered just *absent* as far as the\n",
    "functional estimation of the\n",
    "probabilities goes. Continuing for the fourth day,\n",
    "we have\n",
    "$(7/8)(6/7)(5/5)(4/5)$, the fifth day, $(7/8)(6/7)(5/5)(4/5)(3/4)$, the\n",
    "sixth\n",
    "(right censored) day $(7/8)(6/7)(5/5)(4/5)(3/4)(2/2)$, and so on. We can\n",
    "summarize this in the following table:\n",
    "\n",
    "### Hazard functions and their\n",
    "properties\n",
    "\n",
    "Generally, the *survival function* is a continuous function of time\n",
    "$S(t) =\n",
    "\\mathbb{P}(T>t)$ where $T$ is the event time (e.g., time of death). Note\n",
    "that\n",
    "the cumulative density function, $F(t)=\\mathbb{P}(T\\le t)=1-S(t)$ and\n",
    "$f(t)=\\frac{dF(t)}{dt}$ is the usual probability density function. The so-called\n",
    "*hazard function* is the instantaneous rate of failure at time $t$,\n",
    "\n",
    "$$\n",
    "h(t) = \\frac{f(t)}{S(t)} = \\lim_{\\Delta t \\rightarrow 0}\\frac{\\mathbb{P}(T\n",
    "\\in (t,t+\\Delta t]|T\\ge t)}{\\Delta t}\n",
    "$$\n",
    "\n",
    "Note that is a continuous-limit version of\n",
    "the calculation we performed above.\n",
    "In words, it says given the event time $T\\ge\n",
    "t$ (subject has survived up to\n",
    "$t$), what is the probability of the event\n",
    "occurring in the differential\n",
    "interval $\\Delta t$ for a vanishingly small\n",
    "$\\Delta t$. Note that this is not\n",
    "the usual derivative-slope from calculus\n",
    "because there is no difference term in\n",
    "the numerator. The hazard function is\n",
    "also called the *force of mortality*,\n",
    "*intensity rate*, or the\n",
    "*instantaneous risk*. Informally, you can think of the\n",
    "hazard function as\n",
    "encapsulating the two issues we are most concerned about:\n",
    "deaths and the\n",
    "population at risk for those deaths. Loosely speaking, the\n",
    "probability density\n",
    "function in the numerator represents the probability of a\n",
    "death occurring in a\n",
    "small differential interval. However, we are not\n",
    "particularly interested in\n",
    "unqualified deaths, but only deaths that can happen\n",
    "to a specific at-risk\n",
    "population. Returning to our lifeboat analogy, suppose\n",
    "there are 1000 people in\n",
    "the lifeboat and the probability of anybody falling off\n",
    "the lifeboat is 1/1000.\n",
    "Two things are happening here: (1) the probability of\n",
    "the bad event is small and\n",
    "(2) there are a lot of subjects over which to spread\n",
    "the probability of that bad\n",
    "event. This means that the hazard rate for any\n",
    "particular individual is small.\n",
    "On the other hand, if there are only two\n",
    "subjects in the life raft and the\n",
    "probability of falling off is 3/4, then the\n",
    "hazard rate is high because not only\n",
    "is the unfortunate event probable, the risk\n",
    "of that unfortunate event is shared\n",
    "by only two  subjects.\n",
    "\n",
    "It is a mathematical\n",
    "fact that,\n",
    "\n",
    "$$\n",
    "h(t) = \\frac{-d \\log S(t)}{dt}\n",
    "$$\n",
    "\n",
    " This leads to the following interpretation\n",
    "\n",
    "$$\n",
    "S(t) = \\exp\\left( -\\int_0^t h(u)du\\right) := \\exp(-H(t))\n",
    "$$\n",
    "\n",
    " where $H(t)$ is the *cumulative hazard function*. Note that $H(t)=-\\log S(t)$.\n",
    "Consider a subject whose survival time is 5 years. For this subject to have died\n",
    "at\n",
    "the fifth year, it had to be alive during the fourth year. Thus, the *hazard*\n",
    "at\n",
    "5 years is the failure rate per-year, conditioned on the fact that the\n",
    "subject\n",
    "survived until the fourth year. Note that this is *not* the same as the\n",
    "unconditional failure rate per year at the fifth year, because the unconditional\n",
    "rate applies to all units at time zero and does not use information about\n",
    "survival up to that point gleaned from the other units. Thus, the *hazard\n",
    "function* can be thought of as the point-wise unconditional probability of\n",
    "experiencing the event, scaled by the fraction of survivors up to that point.\n",
    "## Example\n",
    "\n",
    "To get a sense of this, let's consider the example where the\n",
    "probability\n",
    "density function  is exponential with parameter $\\lambda$,\n",
    "$f(t)=\\lambda\n",
    "\\exp(-t\\lambda),\\; \\forall t>0$. This makes $S(t) = 1- F(t) =\n",
    "\\exp(-t\\lambda)$\n",
    "and then the hazard function becomes $h(t)=\\lambda$, namely a\n",
    "constant. To see\n",
    "this, recall that the exponential distribution is the only\n",
    "continuous\n",
    "distribution that has no memory:\n",
    "\n",
    "$$\n",
    "\\mathbb{P}(X\\le u+t \\vert X>u) = 1-\\exp(-\\lambda t) = \\mathbb{P}(X\\le t)\n",
    "$$\n",
    "\n",
    " This means no matter how long we have\n",
    "been waiting for a death to occur, the\n",
    "probability of a death from that point\n",
    "onward is the same - thus the hazard\n",
    "function is a constant.\n",
    "\n",
    "\n",
    "### Expectations\n",
    "\n",
    "Given all these definitions, it is\n",
    "an exercise in integration by parts to show\n",
    "that the expected life remaining is\n",
    "the following:\n",
    "\n",
    "$$\n",
    "\\mathbb{E}(T) = \\int_0^\\infty S(u) du\n",
    "$$\n",
    "\n",
    " This is equivalent to the following:\n",
    "\n",
    "$$\n",
    "\\mathbb{E}(T \\big\\vert t=0) = \\int_0^\\infty S(u) du\n",
    "$$\n",
    "\n",
    " and we can likewise express the expected remaining life at $t$ as the\n",
    "following,\n",
    "\n",
    "$$\n",
    "\\mathbb{E}(T \\big\\vert T\\ge t) = \\frac{\\int_t^\\infty S(u) du}{S(t)}\n",
    "$$\n",
    "\n",
    "### Parametric regression models\n",
    "\n",
    "Because we are interested in how study\n",
    "parameters affect survival, we need a\n",
    "model that can accommodate regression in\n",
    "exogenous (independent) variables ($\\mathbf{x}$).\n",
    "\n",
    "$$\n",
    "h(t\\vert \\mathbf{x})= h_o(t)\\exp(\\mathbf{x}^T \\mathbf{\\boldsymbol{\\beta}})\n",
    "$$\n",
    "\n",
    " where $\\boldsymbol{\\beta}$ are the regression coefficients and $h_o(t)$ is the\n",
    "baseline instantaneous hazard function. Because the hazard function is always\n",
    "nonnegative, the the effects of the covariates enter through the exponential\n",
    "function. These kinds of models are called *proportional hazard rate models*.\n",
    "If\n",
    "the baseline function is a constant ($\\lambda$), then this reduces to the\n",
    "*exponential regression model* given by the following:\n",
    "\n",
    "$$\n",
    "h(t\\vert \\mathbf{x}) = \\lambda  \\exp(\\mathbf{x}^T\n",
    "\\mathbf{\\boldsymbol{\\beta}})\n",
    "$$\n",
    "\n",
    "### Cox proportional hazards model\n",
    "\n",
    "The tricky part about the above proportional\n",
    "hazard rate model is the\n",
    "specification of the baseline instantaneous hazard\n",
    "function. In many cases, we\n",
    "are not so interested in the absolute hazard\n",
    "function (or its correctness), but\n",
    "rather a comparison of such hazard functions\n",
    "between two study populations. The\n",
    "Cox model emphasizes this comparison by using\n",
    "a maximum likelihood algorithm for\n",
    "a partial likelihood function. There is a lot\n",
    "to keep track of in this model, so\n",
    "let's try the mechanics  first to get a feel\n",
    "for what is going on.\n",
    "\n",
    "Let $j$ denote the $j^{th}$ failure time, assuming that\n",
    "failure times are sorted\n",
    "in increasing order. The hazard function for subject\n",
    "$i$ at failure time $j$ is\n",
    "$h_i(t_j)$. Using the general proportional hazards\n",
    "model, we have\n",
    "\n",
    "$$\n",
    "h_i(t_j) = h_0(t_j)\\exp(z_i \\beta) := h_0(t_j)\\psi_i\n",
    "$$\n",
    "\n",
    "To keep it simple, we have $z_i \\in \\{0,1\\}$ that indicates membership in the\n",
    "experimental group ($z_{i}=1$) or the control group ($z_i=0$).\n",
    "Consider the\n",
    "first failure time, $t_1$ for subject $i$ failing is the hazard\n",
    "function\n",
    "$h_i(t_1)=h_0(t_1)\\psi_{i}$. From the definitions, the probability that\n",
    "subject\n",
    "$i$ is the one who fails is the following:\n",
    "\n",
    "$$\n",
    "p_1 = \\frac{h_{i}(t_1)}{\\sum h_k(t_1)}= \\frac{h_{0}(t_1)\\psi_i}{\\sum h_0(t_1)\n",
    "\\psi_k}\n",
    "$$\n",
    "\n",
    " where the summation is over all surviving units up to that point. Note that the\n",
    "baseline hazard cancels out and gives the following,\n",
    "\n",
    "$$\n",
    "p_1=\\frac{\\psi_{i}}{\\sum_k \\psi_k}\n",
    "$$\n",
    "\n",
    "We can keep computing this for the other failure times to obtain\n",
    "$\\{p_1,p_2,\\ldots\\,p_D\\}$. The product of all of these is the *partial\n",
    "likelihood*, $L(\\psi) = p_1\\cdot p_2\\cdots p_D$. The next step is to maximize\n",
    "this partial likelihood (usually logarithm of the partial likelihood) over\n",
    "$\\beta$. There are a lot of numerical issues to keep track of here. Fortunately,\n",
    "the Python `lifelines`\n",
    "module can keep this all straight for us.\n",
    "\n",
    "Let's see how\n",
    "this works using the `Rossi` dataset that is available in\n",
    "lifelines."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 7,
   "metadata": {},
   "outputs": [],
   "source": [
    "from lifelines.datasets import load_rossi\n",
    "from lifelines import CoxPHFitter, KaplanMeierFitter\n",
    "rossi_dataset = load_rossi()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "The Rossi dataset dataset concerns prison recidivism. The `fin` variable\n",
    "indicates whether or not the subjects received financial assistance upon\n",
    "discharge from prison.\n",
    "\n",
    "* `week`: week of first arrest after release, or\n",
    "censoring time.\n",
    "\n",
    "* `arrest`: the event indicator, equal to 1 for those arrested\n",
    "during the period of the study and 0 for those who were not arrested.\n",
    "\n",
    "* `fin`:\n",
    "a factor, with levels yes if the individual received financial aid after release\n",
    "from prison, and no if he did not; financial aid was a randomly assigned factor\n",
    "manipulated by the researchers.\n",
    "\n",
    "* `age`: in years at the time of release.\n",
    "\n",
    "*\n",
    "`race`: a factor with levels black and other.\n",
    "\n",
    "* `wexp`: a factor with levels\n",
    "yes if the individual had full-time work experience prior to incarceration and\n",
    "no if he did not.\n",
    "\n",
    "* `mar`: a factor with levels married if the individual was\n",
    "married at the time of release and not married if he was not.\n",
    "\n",
    "* `paro`: a\n",
    "factor coded yes if the individual was released on parole and no if he was not.\n",
    "* `prio`: number of prior convictions.\n",
    "\n",
    "* `educ`: education, a categorical\n",
    "variable coded numerically, with codes 2 (grade 6 or less), 3 (grades 6 through\n",
    "9), 4 (grades 10 and 11), 5 (grade 12), or 6 (some post-secondary).\n",
    "\n",
    "* `emp1` -\n",
    "`emp52`: factors coded yes if the individual was employed in the corresponding\n",
    "week of the study and no otherwise."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 8,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/html": [
       "<div>\n",
       "<style scoped>\n",
       "    .dataframe tbody tr th:only-of-type {\n",
       "        vertical-align: middle;\n",
       "    }\n",
       "\n",
       "    .dataframe tbody tr th {\n",
       "        vertical-align: top;\n",
       "    }\n",
       "\n",
       "    .dataframe thead th {\n",
       "        text-align: right;\n",
       "    }\n",
       "</style>\n",
       "<table border=\"1\" class=\"dataframe\">\n",
       "  <thead>\n",
       "    <tr style=\"text-align: right;\">\n",
       "      <th></th>\n",
       "      <th>week</th>\n",
       "      <th>arrest</th>\n",
       "      <th>fin</th>\n",
       "      <th>age</th>\n",
       "      <th>race</th>\n",
       "      <th>wexp</th>\n",
       "      <th>mar</th>\n",
       "      <th>paro</th>\n",
       "      <th>prio</th>\n",
       "    </tr>\n",
       "  </thead>\n",
       "  <tbody>\n",
       "    <tr>\n",
       "      <th>0</th>\n",
       "      <td>20</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>27</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>3</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>1</th>\n",
       "      <td>17</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>18</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>8</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>2</th>\n",
       "      <td>25</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>19</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>13</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>3</th>\n",
       "      <td>52</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>23</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "      <td>1</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>4</th>\n",
       "      <td>52</td>\n",
       "      <td>0</td>\n",
       "      <td>0</td>\n",
       "      <td>19</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>0</td>\n",
       "      <td>1</td>\n",
       "      <td>3</td>\n",
       "    </tr>\n",
       "  </tbody>\n",
       "</table>\n",
       "</div>"
      ],
      "text/plain": [
       "   week  arrest  fin  age  race  wexp  mar  paro  prio\n",
       "0    20       1    0   27     1     0    0     1     3\n",
       "1    17       1    0   18     1     0    0     1     8\n",
       "2    25       1    0   19     0     1    0     1    13\n",
       "3    52       0    1   23     1     1    1     1     1\n",
       "4    52       0    0   19     0     1    0     1     3"
      ]
     },
     "execution_count": 8,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "rossi_dataset.head()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "Now, we just have to set up the calculation in `lifelines`, using the\n",
    "`scikit-\n",
    "learn` style. The `lifelines` module handles the censoring\n",
    "issues."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 9,
   "metadata": {},
   "outputs": [
    {
     "name": "stdout",
     "output_type": "stream",
     "text": [
      "<lifelines.CoxPHFitter: fitted with 432 observations, 318 censored>\n",
      "      duration col = 'week'\n",
      "         event col = 'arrest'\n",
      "number of subjects = 432\n",
      "  number of events = 114\n",
      "partial log-likelihood = -658.75\n",
      "  time fit was run = 2019-08-27 19:17:05 UTC\n",
      "\n",
      "---\n",
      "      coef exp(coef)  se(coef)  coef lower 95%  coef upper 95% exp(coef) lower 95% exp(coef) upper 95%\n",
      "fin  -0.38      0.68      0.19           -0.75           -0.00                0.47                1.00\n",
      "age  -0.06      0.94      0.02           -0.10           -0.01                0.90                0.99\n",
      "race  0.31      1.37      0.31           -0.29            0.92                0.75                2.50\n",
      "wexp -0.15      0.86      0.21           -0.57            0.27                0.57                1.30\n",
      "mar  -0.43      0.65      0.38           -1.18            0.31                0.31                1.37\n",
      "paro -0.08      0.92      0.20           -0.47            0.30                0.63                1.35\n",
      "prio  0.09      1.10      0.03            0.04            0.15                1.04                1.16\n",
      "\n",
      "         z      p  -log2(p)\n",
      "fin  -1.98   0.05      4.40\n",
      "age  -2.61   0.01      6.79\n",
      "race  1.02   0.31      1.70\n",
      "wexp -0.71   0.48      1.06\n",
      "mar  -1.14   0.26      1.97\n",
      "paro -0.43   0.66      0.59\n",
      "prio  3.19 <0.005      9.48\n",
      "---\n",
      "Concordance = 0.64\n",
      "Log-likelihood ratio test = 33.27 on 7 df, -log2(p)=15.37\n"
     ]
    }
   ],
   "source": [
    "cph = CoxPHFitter()\n",
    "cph.fit(rossi_dataset, \n",
    "        duration_col='week', \n",
    "        event_col='arrest')\n",
    "cph.print_summary()  # access the results using cph.summary"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "The values in the summary are plotted in\n",
    "[Figure](#fig:survival_analysis_002).\n",
    "<!-- dom:FIGURE: [fig-statistics/survival_analysis_002.png, width=800 frac=0.65]\n",
    "This shows the fitted coefficients from the summary table for each covariate.\n",
    "<div id=\"fig:survival_analysis_002\"></div> -->\n",
    "<!-- begin figure -->\n",
    "<div\n",
    "id=\"fig:survival_analysis_002\"></div>\n",
    "\n",
    "<p>This shows the fitted coefficients\n",
    "from the summary table for each covariate.</p>\n",
    "<img src=\"fig-\n",
    "statistics/survival_analysis_002.png\" width=300>\n",
    "\n",
    "<!-- end figure -->"
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 10,
   "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"
    }
   ],
   "source": [
    "ax=cph.plot();\n",
    "ax.figure.savefig('fig-statistics/survival_analysis_002.png')"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "The Cox proportional hazards model object from `lifelines` allows us to predict\n",
    "the survival function for an individual with given covariates, assuming that\n",
    "the\n",
    "individual just entered the study.  For example, for the first individual\n",
    "(i.e.,\n",
    "row) in the `rossi_dataset`, we can use the model to predict the\n",
    "survival\n",
    "function for that individual."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 11,
   "metadata": {},
   "outputs": [
    {
     "data": {
      "text/html": [
       "<div>\n",
       "<style scoped>\n",
       "    .dataframe tbody tr th:only-of-type {\n",
       "        vertical-align: middle;\n",
       "    }\n",
       "\n",
       "    .dataframe tbody tr th {\n",
       "        vertical-align: top;\n",
       "    }\n",
       "\n",
       "    .dataframe thead th {\n",
       "        text-align: right;\n",
       "    }\n",
       "</style>\n",
       "<table border=\"1\" class=\"dataframe\">\n",
       "  <thead>\n",
       "    <tr style=\"text-align: right;\">\n",
       "      <th></th>\n",
       "      <th>0</th>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>T</th>\n",
       "      <th></th>\n",
       "    </tr>\n",
       "  </thead>\n",
       "  <tbody>\n",
       "    <tr>\n",
       "      <th>1.0</th>\n",
       "      <td>0.997616</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>2.0</th>\n",
       "      <td>0.995230</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>3.0</th>\n",
       "      <td>0.992848</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>4.0</th>\n",
       "      <td>0.990468</td>\n",
       "    </tr>\n",
       "    <tr>\n",
       "      <th>5.0</th>\n",
       "      <td>0.988085</td>\n",
       "    </tr>\n",
       "  </tbody>\n",
       "</table>\n",
       "</div>"
      ],
      "text/plain": [
       "            0\n",
       "T            \n",
       "1.0  0.997616\n",
       "2.0  0.995230\n",
       "3.0  0.992848\n",
       "4.0  0.990468\n",
       "5.0  0.988085"
      ]
     },
     "execution_count": 11,
     "metadata": {},
     "output_type": "execute_result"
    }
   ],
   "source": [
    "cph.predict_survival_function(rossi_dataset.iloc[0,:]).head()"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "This result is plotted in [Figure](#fig:survival_analysis_003)."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": 12,
   "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"
    }
   ],
   "source": [
    "fig,ax =subplots()\n",
    "_=cph.predict_survival_function(rossi_dataset.iloc[0,:]).plot(ax=ax)\n",
    "_=ax.set_ylabel('Survival probability',fontsize=16)\n",
    "_=ax.set_title('Survival probability for $0^{th}$ subject',fontsize=18)\n",
    "fig.savefig('fig-statistics/survival_analysis_003.png')"
   ]
  },
  {
   "cell_type": "markdown",
   "metadata": {},
   "source": [
    "<!-- # !bc pyconsole -->\n",
    "<!-- # kmf1 = KaplanMeierFitter() -->\n",
    "<!-- # t1 =\n",
    "rossi_dataset[rossi_dataset.fin==1] -->\n",
    "<!-- #\n",
    "kmf1.fit(t1.week,event_observed=t1.arrest,label='fin=1') -->\n",
    "<!-- # kmf0 =\n",
    "KaplanMeierFitter() -->\n",
    "<!-- # t0 = rossi_dataset[rossi_dataset.fin==0] -->\n",
    "<!--\n",
    "# kmf0.fit(t0.week,event_observed=t0.arrest,label='fin=0') -->\n",
    "<!-- # !ec -->\n",
    "<!-- # -->\n",
    "<!-- # !bc pyconcode -->\n",
    "<!-- # fig, ax = subplots() -->\n",
    "<!-- #\n",
    "_=kmf1.plot_loglogs(ax=ax) -->\n",
    "<!-- # _=kmf0.plot_loglogs(ax=ax) -->\n",
    "<!-- #\n",
    "fig.savefig('fig-statistics/survival_analysis_003.png') -->\n",
    "<!-- # !ec -->\n",
    "<!-- dom:FIGURE: [fig-statistics/survival_analysis_003.png, width=800 frac=0.65]\n",
    "The Cox proportional hazards model can predict the survival probability for an\n",
    "individual based on their covariates. <div id=\"fig:survival_analysis_003\"></div>\n",
    "-->\n",
    "<!-- begin figure -->\n",
    "<div id=\"fig:survival_analysis_003\"></div>\n",
    "\n",
    "<p>The Cox\n",
    "proportional hazards model can predict the survival probability for an\n",
    "individual based on their covariates.</p>\n",
    "<img src=\"fig-\n",
    "statistics/survival_analysis_003.png\" width=300>\n",
    "\n",
    "<!-- end figure -->"
   ]
  },
  {
   "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": "3.7.3"
  }
 },
 "nbformat": 4,
 "nbformat_minor": 2
}