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   "source": [
    "# Introduction to Thermodynamics and Statistical Physics"
   ]
  },
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   "id": "37bd3da0-9531-4d44-a643-efb7e597035a",
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   "source": [
    "In this lecture, we are going to discuss:\n",
    "\n",
    "* The Van der Waal's gas.\n",
    "* The heat capacity of a solid.\n",
    "* Einstein's theory for a solid."
   ]
  },
  {
   "cell_type": "markdown",
   "id": "b80ba27a-e8a3-48f7-9001-229ae69609f0",
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   "source": [
    "## The Van der Waal's gas"
   ]
  },
  {
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   "id": "d7381e89-ddec-4c83-b1bc-df06c88863ca",
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   "source": [
    "Consider again the equation of state of an ideal gas:\n",
    "$$\n",
    "    P V = Nk_{\\rm B}T = n R T\n",
    "$$\n",
    "This equation leads to isotherms as plotted in the left of the below figure. To try and make this equation match the observed behaviour of real gases, we can think of two simple modifications:\n",
    "\n",
    "1. Allow for non-zero molucule size. In essence, this means that molecules are no longer free to travel anywhere within the gas - instead, the volume they can probe is reduced slightly by the volume taken up by other molecules. We can simply parameterise thisas $V\\to V-n b$, where b is somehow related to the molecule size.\n",
    "2. Allow for molecular attraction. If the molar density of the gas is given by $n/V$, then the change in energy related to $\\frac{an^2}{V^2} {\\rm d}V$. This effectively increases the pressure we should see in the gas relative to the ideal pressure by $P=P_{\\rm ideal} +\\frac{a n^2}{V^2}$\n",
    "\n",
    "These modifications then give Van Der Waal's equation of state\n",
    "$$\n",
    "    \\left(P + \\frac{a n^2}{V^2}\\right) (V-n b) = n R T\n",
    "$$\n",
    "This equation leads to isotherms as plotted on the right of the below figure.\n",
    "\n",
    "#### Aside\n",
    "This same equation can be arrived at in a more formal manner by considering the following. If we let the partition function for our gas be\n",
    "$$\n",
    "    Z_N = \\frac{1}{N!}\\left(\\frac{V-n b}{\\lambda _{\\rm th}^3}\\right)^N e^{- \\beta (- a n^2/V)}\n",
    "$$\n",
    "where again we've reduced the volume to account for the volume taken up by other molecules, and included an additional energy term in the partition function related to the interaction energy $-a n^2/V$. We can then calculate the Hemlholtz free energy using $F=-k_{\\rm B}T \\ln (Z_N)$ and then $P=-\\left(\\frac{\\partial F}{\\partial V} \\right)_T$ to get the above equation of state."
   ]
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\n",
      "text/plain": [
       "<Figure size 900x450 with 3 Axes>"
      ]
     },
     "metadata": {},
     "output_type": "display_data"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "from matplotlib import cm\n",
    "import astropy.units as u\n",
    "import astropy.constants as c\n",
    "import warnings\n",
    "warnings.filterwarnings('ignore')\n",
    "\n",
    "#Defining equations of state\n",
    "def ideal_gas(V,T):\n",
    "    P = c.R*T/V*u.mol\n",
    "    return (P)\n",
    "\n",
    "def VDW_gas(V,T,a,b):\n",
    "    P = c.R*T*u.mol/(V-b)-a/V**2\n",
    "    return P\n",
    "\n",
    "#Defining arrays\n",
    "T_Ideal = np.arange(1,250,5)*u.K\n",
    "V_Ideal = np.arange(0.01,1.02,0.0001)*u.m**3\n",
    "T_VDW = np.arange(21,250,2)*u.K\n",
    "V_VDW = np.arange(0.1,1.02,0.0001)*u.m**3\n",
    "a = 1e2*u.J*u.m**3\n",
    "b = 0.1*u.m**3\n",
    "T_c = 8*a/(27*c.R*b*u.mol)\n",
    "P_c = a/(27*b**2)\n",
    "V_c = 3*b\n",
    "\n",
    "fig,ax = plt.subplots(nrows=1,ncols=2,figsize=[6,3],dpi=150)\n",
    "# Plotting Ideal Gas\n",
    "for T_i in T_Ideal:\n",
    "    P_ideal = ideal_gas(V_Ideal,T_i)\n",
    "    ax[0].plot(V_Ideal,P_ideal,'-',c=cm.hot(T_i/len(T_Ideal)),label='')\n",
    "# Plotting VDW Gas    \n",
    "for T_i in T_VDW:\n",
    "    P_VDW = VDW_gas(V_VDW,T_i,a=a,b=b)\n",
    "    im = ax[1].plot(V_VDW,P_VDW,'-',c=cm.hot(T_i/len(T_VDW)),label='')\n",
    "ax[1].plot(V_VDW, VDW_gas(V_VDW,T_c,a=a,b=b),color='C1')\n",
    "ax[1].plot(V_c,P_c,'k.')\n",
    "ax[1].axvline(0.1,color='grey',alpha=0.5)\n",
    "ax[1].text(0.05,500,'b',rotation=90)\n",
    "    \n",
    "#Adding colorbar\n",
    "sm = plt.cm.ScalarMappable(cmap='hot',norm=cm.colors.Normalize(vmin=min(T_VDW.value),vmax=max(T_VDW.value)))\n",
    "cbar = fig.colorbar(sm, label='T (K)')\n",
    "cbar.set_ticks([])\n",
    "\n",
    "#Customising Plot\n",
    "for axes in ax:\n",
    "    axes.set_xlim(0.0,1)\n",
    "    axes.axes.get_xaxis().set_ticks([])\n",
    "    axes.set_ylim(0,1000)\n",
    "    axes.axes.get_yaxis().set_ticks([])\n",
    "    axes.set_ylabel(\"Pressure\")\n",
    "    axes.set_xlabel(\"Volume\")\n",
    "ax[0].set_title(\"Ideal Gas\")\n",
    "ax[1].set_title(\"Van Der Waals Gas\")\n",
    "plt.tight_layout()\n",
    "plt.savefig(\"Figures/Isotherms.jpg\")\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "595fb364-6154-446f-a23c-baf9c43b5d3a",
   "metadata": {},
   "source": [
    "The Van der Waals equation of state behaves like the Ideal gas at high temperatures (the yellow curves to the top right of the plot). However, at low temperatures, the isoterms begin to exhibit a kink. To figure out what this represents, recall that the isothermal compressability of a gas is defined as\n",
    "$$\n",
    "    \\kappa_{T} = -\\frac{1}{V}\\left(\\frac{\\partial V}{\\partial P}\\right)_T\n",
    "$$\n",
    "For an ideal gas, this is always positive (as the last term is always negative, as the isoterms always have a negative slope). However, as we can see from the plot of the Van der Waals equation of state, at low temperatures, there are regions where $\\left(\\frac{\\partial V}{\\partial P}\\right)_T$ is positive, meaning $\\kappa_{T}$ becomes negative. Under such conditions, increases the pressure exerted on the gas causes the volume to increase rather than decrease. Given that this means work is done on the gas ($W=-P{\\rm d} V$), then energy is provided to further increase the pressure - meaning this configuration is highly unstable!\n",
    "\n",
    "There is a critical temperature whose isotherm does not have a positive gradient, but which has an inflection point - this is the critical temperature, and the inflection point is the critical point we encountered in the last lecture.\n",
    "\n",
    "Let's now determine the location of this critical point for a Van der Waal's gas.\n",
    "\n",
    "Solving the Van der Waal's equation for $P$, and assuming we're working with 1 mole, gives:\n",
    "$$\n",
    "    P = \\frac{RT}{V-b} - \\frac{a}{V^2}\n",
    "$$\n",
    "The inflection point occurs when\n",
    "$$\n",
    "    \\left(\\frac{\\partial P}{\\partial V}\\right)_T = - \\frac{RT}{(V-b)^2}+ \\frac{2a}{V^3}=0\n",
    "$$\n",
    "and\n",
    "$$\n",
    "    \\left(\\frac{\\partial ^2 P}{\\partial V^2}\\right)_T = \\frac{2RT}{(V-b)^3}- \\frac{6a}{V^4}=0\n",
    "$$\n",
    "Solving this both for $RT$ gives\n",
    "$$\n",
    "     \\frac{2a(V-b)^2}{V^3} = RT = \\frac{6a(V-b)^3}{2V^4}\n",
    "$$\n",
    "which gives\n",
    "$$\n",
    "    2 = \\frac{3(V-b)}{V}\n",
    "$$\n",
    "and thus the critical volume is\n",
    "$$\n",
    "    V_{\\rm C} = 3b\n",
    "$$\n",
    "Using this volume and the above equations then gives\n",
    "$$\n",
    "    T_{\\rm C} = \\frac{8a}{27 Rb}\n",
    "$$\n",
    "and\n",
    "$$\n",
    "    P_{\\rm C} = \\frac{a}{27 b^2}\n",
    "$$\n",
    "\n",
    "I'm not going to go into too detailed a discussion about what happens around this critical point. If you are interested, I highly recommend section 26.1 of Blundell & Blundell, or 5.3 of Schroeder."
   ]
  },
  {
   "cell_type": "markdown",
   "id": "842718d2-f1cd-48ee-b8bd-a6d1735f3bc0",
   "metadata": {},
   "source": [
    "## Heat Capacity of Solids"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "949c56f3-82e0-4a8a-b93c-380d5f430668",
   "metadata": {},
   "source": [
    "Continuing our discussion of how real systems differ from ideal gases, let's consider how heat capacities behave for solids. Imagine a solid with $N$ atoms can be modelled as a lattice, and that each atom is bonded to its neighbours by springs. This means there are 3$N$ springs in the system. As such, each atom is allowed to oscillate about its equilibrium position. Each \"spring\" has two quadratic modes of energy: one kinetic, and one potential, and so the equipartition of energy tells us that each spring has a mean energy\n",
    "$$\n",
    "    \\langle E \\rangle = 2 \\times \\frac{1}{2} k_{\\rm B} T = k_{\\rm B} T\n",
    "$$\n",
    "and that the mean energy of the system is then\n",
    "$$\n",
    "    \\langle E \\rangle = 3 N k_{\\rm B} T\n",
    "$$\n",
    "The heat capacity of the solid is then\n",
    "$$\n",
    "    C = \\frac{\\partial \\langle E \\rangle}{\\partial T} = 3 N k_{\\rm B} = 3 R.\n",
    "$$\n",
    "where that last value is true for one mole of the substance. That is, the heat capacity should be constant in this picture - this is known as the Dulong-Petit law, and experiments have found that expectation value for the heat capacity is very close to what's observed in a lot of systems around room temperature. However, because of the third law of thermodynamics, we would expect the heat capacity to go to 0 at low temperatures, which this treatment does not reproduce. So how do we fix this?"
   ]
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   "source": [
    "## Einstein's Theory"
   ]
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    "The answer comes from Eintein's model. In this model, we again assume that all atoms are linked via a spring. However, the key insight here is that, in accordance with quantum mechanics, the springs will only be able to oscillate with discrete energies. These discrete units of vibrational energy are known as **phonons**.\n",
    "\n",
    "Ok, let's assume we have such a lattice, and that every atom is oscillating about their equilibria positions independently of all the other atoms. The frequency of the oscillations will be given by\n",
    "$$\n",
    "    \\nu_E = \\frac{\\omega_{\\rm E}}{2\\pi}\n",
    "$$\n",
    "Following the prescription of quantum mechanics, a single oscillator will have an energy of\n",
    "$$\n",
    "    \\epsilon_r = \\hbar \\omega_{\\rm E} \\left(r+\\frac{1}{2}\\right)\n",
    "$$\n",
    "The partition function for a single oscillator in the system is\n",
    "$$\n",
    "    Z_1 = \\sum_{n=0}^{\\infty} {\\rm e}^{\\beta (n+1/2)\\hbar \\omega_{\\rm E}} =\\frac{{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}/2}}{1-{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}}}\n",
    "$$\n",
    "as derived in Lecture 10 (and as a part of problem set 3). The mean energy of a single oscillator is then\n",
    "\\begin{align}\n",
    "    U_1 &= -\\left(\\frac{\\partial\\ln(Z_1)}{\\partial \\beta}\\right)\\\\\n",
    "        &= -\\left(\\frac{\\partial\\ln(\\frac{{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}/2}}{1-{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}}})}{\\partial \\beta}\\right)\\\\\n",
    "        &= -\\left(\\frac{\\partial\\ln({\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}/2})}{\\partial \\beta}\\right) -\\left(\\frac{\\partial\\ln({1-{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}}})}{\\partial \\beta}\\right)\\\\\n",
    "        &= \\frac{\\hbar \\omega_{\\rm E}}{2}+\\frac{\\hbar \\omega_{\\rm E}{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}}}{1-{\\rm e}^{-\\beta \\hbar \\omega_{\\rm E}}}\\\\\n",
    "        &= \\frac{\\hbar \\omega_{\\rm E}}{2}+\\frac{\\hbar \\omega_{\\rm E}}{{\\rm e}^{\\beta \\hbar \\omega_{\\rm E}}-1}\\\\\n",
    "\\end{align}\n",
    "So if we have $3 N$ phonons, then the internal energy is\n",
    "$$\n",
    "    U = 3 N U_1\n",
    "$$\n",
    "The heat capacity of this solid can then be calculated using\n",
    "$$\n",
    "    C_{\\rm V} = \\left( \\frac{\\partial \\langle U \\rangle}{\\partial T} \\right)_V\n",
    "$$\n",
    "which gives\n",
    "\\begin{align}\n",
    "    C_{\\rm V} &= 3 N \\left( - \\frac{(\\hbar \\omega_{\\rm E})^2 {\\rm e}^{\\beta \\hbar \\omega_{\\rm E}}} {({\\rm e}^{\\beta \\hbar \\omega_{\\rm E}}-1)^2} \\right) \\left( \\frac{-1}{k_{\\rm B}T^2} \\right).\\\\\n",
    "\\end{align}\n",
    "If we now define the Einstein Temperature,$\\Theta_{\\rm E} = \\frac{\\hbar \\omega_{\\rm E}}{k_{\\rm B}}$ and $x=\\frac{\\Theta_{\\rm E}}{T}$, then this simplifies to\n",
    "$$\n",
    "    C_{\\rm V} = 3 N k_{\\rm B} \\frac{ x^2 {\\rm e}^{x}} {({\\rm e}^{x}-1)^2}\n",
    "$$\n",
    "So now the question we have to ask is: does this expression for the heat capacity both satisfy the Dulong-Petit law (that is, at high temperatures, $C_{\\rm V} = 3R$, and also the Third law (that is, at low temperatures, it should go to 0).\n",
    "\n",
    "- In the high temperature limit, when $T\\gg \\Theta_{\\rm E}$, then $x \\ll 1$. If we Taylor expand $e^x$ around $x=0$, then $e^x=1+x+...$ and thus $C_{\\rm V}= 3 N k_{\\rm B} = 3 R$ for 1 mole, as required\n",
    "- In the low temperature limit, when $T\\ll \\Theta_{\\rm E}$, then $x \\gg 1$. In this limit, $\\frac{e^{x}}{(e^{x}-1)^2} \\to \\frac{e^{x}}{e^{2x}}=e^{-x}$. Thus, $C_{\\rm V} = 3 N k_{\\rm B} \\left(\\frac{\\Theta_{\\rm E}}{T}\\right)^2 \\exp{-\\frac{\\Theta_{\\rm E}}{T}}$. As $T \\to 0$, the exponential function goes to 0 faster than the other term grows, thus the heat capacity goes to 0 as required by the third law!\n",
    "\n",
    "So how else is this picture useful? Let's take diamond as an example, which is the material Einstein studied in order to test this theory. By measuring the heat capacity of diamond at various temperatures, Einstein found that the Einstein temperature should be $\\Theta_{\\rm E} = 1325$ K. (Shown below, and data taken from Einstein's paper: https://einsteinpapers.press.princeton.edu/vol2-trans/228\n",
    "\n",
    "Since $\\Theta_{\\rm E} = \\frac{\\hbar \\omega_{\\rm E}}{k_{\\rm B}}$, this means we can estimate what $\\omega_{\\rm E}$ is. From our simplistic picture, this frequency is related to the restoring force that the atoms in the lattice are experiencing, and thus is also related to the masses of the individual atoms, the elastic properties of the solid, and the interatomic spacing. As such, a measurement of $\\Theta_{\\rm E}$ gives us a method of probing the internal strucutre of the material."
   ]
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\n",
      "text/plain": [
       "<Figure size 600x450 with 1 Axes>"
      ]
     },
     "metadata": {
      "needs_background": "light"
     },
     "output_type": "display_data"
    }
   ],
   "source": [
    "import numpy as np\n",
    "import matplotlib.pyplot as plt\n",
    "import pandas as pd\n",
    "import astropy.units as u\n",
    "import astropy.constants as c\n",
    "\n",
    "#Read in the data\n",
    "data = pd.read_csv(\"Diamond.csv\")\n",
    "\n",
    "#The Einstein paper has all of the heat capacities in cal/kelvin/mol, so need to hard code a unit conversion\n",
    "calorie = u.def_unit('calorie', 4.184 * u.J)\n",
    "\n",
    "#Now, set up arrays and values\n",
    "temp = data.Temp.values*u.K\n",
    "Cv = data.Cap.values*(calorie/u.K/u.mol).to(u.J/u.K/u.mol) # Convert Cv to SI\n",
    "\n",
    "#Finally step is to calculate the heat capacity for the Einstein model, assuming T_E = 1325*u.K\n",
    "T_E = 1325*u.K\n",
    "T = np.arange(10,1325,10)*u.K # Making a wide temperature array to evaluate T over\n",
    "x = T_E/T\n",
    "Cv_Einstein = 3*c.R*(x**2*np.exp(x)/(np.exp(x)-1)**2)\n",
    "\n",
    "plt.figure(figsize=[4,3], dpi=150)\n",
    "plt.plot(temp,Cv,'.',label='Experimental Data')\n",
    "plt.plot(T,Cv_Einstein,'-',label='Einstein Model')\n",
    "plt.axhline(3*c.R.value,linestyle='--')\n",
    "plt.text(200,25.5, '3R')\n",
    "plt.xlabel(r\"T (K)\")\n",
    "plt.ylabel(r\"C$_{\\rm V}$ (J/K/mol)\")\n",
    "plt.ylim(0,27.5)\n",
    "plt.xlim(0,1325)\n",
    "plt.legend()\n",
    "plt.tight_layout()\n",
    "plt.savefig(\"Figures/Einstein_Model_vs_Data.jpg\")\n",
    "plt.show()"
   ]
  },
  {
   "cell_type": "markdown",
   "id": "7c294d9d-faef-47a5-a8b2-6316fef8e94d",
   "metadata": {},
   "source": [
    "So this picture of a solid being a lattice with phonons solves the heat capacity issue. However, experimental evidence gathered after Eintein's paper was published showed poor agreement between the measured heat capacity and the predicted heat capacity for low (<200 K) temperatures, which leads us on to Debye's model."
   ]
  },
  {
   "cell_type": "code",
   "execution_count": null,
   "id": "1e322f87-99d1-4b8e-9fd0-d384091e6b7a",
   "metadata": {},
   "outputs": [],
   "source": []
  }
 ],
 "metadata": {
  "kernelspec": {
   "display_name": "Python 3 (ipykernel)",
   "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",
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}