Update 2022-03-15 10:07
This commit is contained in:
+35
-35
@@ -1,7 +1,7 @@
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<!DOCTYPE html>
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<html lang="en">
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<head>
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<!-- 2022-03-07 Mon 20:38 -->
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<!-- 2022-03-15 Tue 08:10 -->
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<meta charset="utf-8">
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<meta name="viewport" content="width=device-width, initial-scale=1">
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<title>Pre-Quantum Electrodynamics</title>
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@@ -1310,10 +1310,6 @@ Table of contents
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</summary>
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<ul>
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<li>
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<a href="./d_m.html#d_m">Diagnostics: Mathematical Preliminaries</a><span class="headline-id">d.m</span>
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</li>
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<li>
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<a href="./d_ems.html#d_ems">Diagnostics: Electromagnetostatics</a><span class="headline-id">d.ems</span>
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</li>
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@@ -1352,6 +1348,10 @@ Table of contents
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<li>
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<a href="./d_red.html#d_red">Diagnostics: Relativistic Electrodynamics</a><span class="headline-id">d.red</span>
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</li>
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<li>
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<a href="./d_m.html#d_m">Diagnostics: Compendium - Mathematics</a><span class="headline-id">d.m</span>
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</li>
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</ul>
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@@ -1617,14 +1617,14 @@ Table of contents
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In spherical coordinates, the Laplace equation takes the following form
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(using <a href="./c_m_cs_sph.html#sph_Lap">sph_Lap</a>):
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</p>
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<div class="eqlabel" id="orga290a6d">
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<div class="eqlabel" id="org8944b83">
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<p>
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<a id="Lap_sph"></a><a href="./ems_ca_sv_sph.html#Lap_sph"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orga016e41">
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<div class="alteqlabels" id="org1d52bd8">
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<ul class="org-ul">
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<li>Gr (3.53)</li>
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<li>W (11-86)</li>
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@@ -1633,7 +1633,7 @@ In spherical coordinates, the Laplace equation takes the following form
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</div>
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</div>
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<div class="main div" id="orgae57139">
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<div class="main div" id="org9f248f2">
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<p>
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</p>
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@@ -1650,14 +1650,14 @@ In spherical coordinates, the Laplace equation takes the following form
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If you are dealing with a problem having <b>azimuthal symmetry</b>,
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\(\phi\) is independent of \(\varphi\) and the equation simplifies to:
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</p>
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<div class="eqlabel" id="org2621336">
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<div class="eqlabel" id="orgb5d38b5">
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<p>
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<a id="Lap_sph_az"></a><a href="./ems_ca_sv_sph.html#Lap_sph_az"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orgf5486d3">
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<div class="alteqlabels" id="orgbe80ac3">
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<ul class="org-ul">
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<li>Gr (3.54)</li>
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<li>W (11-87)</li>
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@@ -1755,7 +1755,7 @@ This equation is solved by <b>Legendre polynomials</b> of the variable \(\cos \t
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</p>
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<div class="info div" id="orge28af2a">
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<div class="info div" id="org168cefa">
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<p>
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<b>Legendre polynomials</b>
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</p>
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@@ -1776,14 +1776,14 @@ and conveniently defined (for trigonometric arguments) to obey the orthogonality
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relationship (the reason for the normalization on the right-hand side will become clear later)
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</p>
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<div class="eqlabel" id="org0a1ae35">
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<div class="eqlabel" id="orgc073888">
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<p>
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<a id="Leg_orth_trig"></a><a href="./ems_ca_sv_sph.html#Leg_orth_trig"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orge27d0a9">
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<div class="alteqlabels" id="org7bd920b">
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</div>
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@@ -1798,14 +1798,14 @@ relationship (the reason for the normalization on the right-hand side will becom
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<p>
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This same relation can be more simply written by using the variable \(x = \cos \theta\),
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</p>
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<div class="eqlabel" id="org4d7d683">
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<div class="eqlabel" id="org782f2a5">
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<p>
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<a id="Leg_orth"></a><a href="./ems_ca_sv_sph.html#Leg_orth"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org1cefaae">
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<div class="alteqlabels" id="orga8724bc">
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</div>
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@@ -1823,14 +1823,14 @@ To get started, we need to define the "seed" polynomial (carrying label \(l=0\))
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To make life easy, we set \(P_0 (x) = 1\). Higher polynomials are then sought in the
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form of power series in \(x\). This leads to the first few Legendre polynomials being:
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</p>
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<div class="eqlabel" id="orgf22f520">
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<div class="eqlabel" id="orga793c4e">
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<p>
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<a id="Leg_pols"></a><a href="./ems_ca_sv_sph.html#Leg_pols"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org1b63141">
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<div class="alteqlabels" id="org4f6a95e">
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</div>
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@@ -1850,14 +1850,14 @@ P_5 (x) &= \frac{1}{8} (63x^5 - 70x^3 + 15x).
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The prefactor (and thus the factor in the orthogonality relations <a href="./ems_ca_sv_sph.html#Leg_orth_trig">Leg_orth_trig</a> and the equivalent <a href="./ems_ca_sv_sph.html#Leg_orth">Leg_orth</a> is chosen for convenience such that each polynomial
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takes the value \(1\) when evaluated at argument \(x = 1\),
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</p>
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<div class="eqlabel" id="orgb34fd9d">
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<div class="eqlabel" id="orga351757">
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<p>
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<a id="Pl_1_1"></a><a href="./ems_ca_sv_sph.html#Pl_1_1"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org3e67eff">
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<div class="alteqlabels" id="org6763018">
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</div>
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@@ -1873,14 +1873,14 @@ P_l(1) = 1
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<p>
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The Legendre polynomial \(P_l\) obeys the differential equation
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</p>
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<div class="eqlabel" id="org3d4e1cc">
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<div class="eqlabel" id="orgc481719">
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<p>
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<a id="Leg_de_trig"></a><a href="./ems_ca_sv_sph.html#Leg_de_trig"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orgdf2ffd5">
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<div class="alteqlabels" id="org2141b06">
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</div>
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@@ -1892,14 +1892,14 @@ The Legendre polynomial \(P_l\) obeys the differential equation
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\]
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or equivalently
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</p>
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<div class="eqlabel" id="orgb0fcfee">
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<div class="eqlabel" id="orga7bc01b">
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<p>
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<a id="Leg_de"></a><a href="./ems_ca_sv_sph.html#Leg_de"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orgd94835c">
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<div class="alteqlabels" id="org423560c">
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</div>
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@@ -1915,14 +1915,14 @@ or equivalently
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A particularly convenient formula for deriving \(P_l(x)\)
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is the <b>Rodrigues formula</b>:
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</p>
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<div class="eqlabel" id="org7fa906e">
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<div class="eqlabel" id="orgdd028ca">
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<p>
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<a id="Rodrigues"></a><a href="./ems_ca_sv_sph.html#Rodrigues"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org60f7105">
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<div class="alteqlabels" id="orgcd24176">
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</div>
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@@ -1938,14 +1938,14 @@ P_l(x) = \frac{1}{2^l l!} \left( \frac{d}{dx} \right)^l (x^2 - 1)^l
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<p>
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Actually, a more practical formula is <b>Bonnet's recursion relation</b>
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</p>
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<div class="eqlabel" id="org45aa2e4">
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<div class="eqlabel" id="org28cb378">
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<p>
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<a id="Bonnet"></a><a href="./ems_ca_sv_sph.html#Bonnet"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orgac79334">
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<div class="alteqlabels" id="org199bde7">
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</div>
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@@ -1981,14 +1981,14 @@ We therefore come to the culmination of our efforts here, and write
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the general solution to <i>any</i> problem with azimuthal symmetry
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(for which the potential takes a finite value for \(\theta = 0, \pi\)) as
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</p>
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<div class="eqlabel" id="org4a016f0">
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<div class="eqlabel" id="orgdb33d5d">
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<p>
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<a id="Lap_sph_az_sol"></a><a href="./ems_ca_sv_sph.html#Lap_sph_az_sol"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="org58079f3">
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<div class="alteqlabels" id="orgcd5cf30">
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<ul class="org-ul">
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<li>Gr (3.65)</li>
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</ul>
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@@ -1996,7 +1996,7 @@ the general solution to <i>any</i> problem with azimuthal symmetry
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</div>
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</div>
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<div class="main div" id="org5cb0c5b">
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<div class="main div" id="org55e5667">
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<p>
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\[
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\phi(r,\theta) = \sum_{l=0}^{\infty} \left( A_l r^l + \frac{B_l}{r^{l+1}} \right) P_l (\cos \theta)
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@@ -2008,7 +2008,7 @@ the general solution to <i>any</i> problem with azimuthal symmetry
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<div class="example div" id="orgc5819fe">
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<div class="example div" id="orgbfafc9e">
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<p>
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<b>Example: potential inside a hollow sphere</b>
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</p>
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@@ -2091,7 +2091,7 @@ Thus, \(A_0 = k/2\), \(A_1 = -k/2\), and all others are zero, so
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</div>
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<div class="example div" id="orga6441ee">
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<div class="example div" id="org1180317">
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<p>
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<b>Example: surface charge density on sphere</b>
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</p>
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@@ -2221,14 +2221,14 @@ A_1^i = \frac{k}{2\varepsilon_0} \int_0^\pi d\theta \sin \theta [P_l(\cos \theta
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<p>
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The potential inside/outside the sphere is then
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</p>
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<div class="eqlabel" id="org013f2b5">
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<div class="eqlabel" id="org206a11d">
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<p>
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<a id="p_uni_ch_sph"></a><a href="./ems_ca_sv_sph.html#p_uni_ch_sph"><svg xmlns="http://www.w3.org/2000/svg" width="16" height="16" fill="currentColor" class="bi bi-link" viewBox="0 0 16 16">
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<path d="M6.354 5.5H4a3 3 0 0 0 0 6h3a3 3 0 0 0 2.83-4H9c-.086 0-.17.01-.25.031A2 2 0 0 1 7 10.5H4a2 2 0 1 1 0-4h1.535c.218-.376.495-.714.82-1z"/>
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<path d="M9 5.5a3 3 0 0 0-2.83 4h1.098A2 2 0 0 1 9 6.5h3a2 2 0 1 1 0 4h-1.535a4.02 4.02 0 0 1-.82 1H12a3 3 0 1 0 0-6H9z"/>
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</svg></a>
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</p>
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<div class="alteqlabels" id="orgdcf686d">
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<div class="alteqlabels" id="org28b3018">
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</div>
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@@ -2261,7 +2261,7 @@ target="_blank">Creative Commons Attribution 4.0 International License</a>.
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</div>
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<div id="postamble" class="status">
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<p class="author">Author: Jean-Sébastien Caux</p>
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<p class="date">Created: 2022-03-07 Mon 20:38</p>
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<p class="date">Created: 2022-03-15 Tue 08:10</p>
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<p class="validation"></p>
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</div>
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