In this tutorial we will create a simple linear problem from scratch using the SimPEG framework.
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SimPEG Tutorial - Linear Problem
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| <p><strong>Objective:</strong> </p> | |
| <p>In this tutorial we will create a simple linear problem from scratch using the SimPEG framework.</p> | |
| <p>The linear operator that we will be concerned with in this case will be a matrix with rows that are made up of the function:</p> | |
| <p>$$\text{row}_i = \exp(-p i x)\cos(2 \pi q i x)$$</p> | |
| <p>Where $p$ and $q$ are constants (in this case they are both set to $\frac{1}{4}$) and $x \in [0,1]$.</p> | |
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| In [1]: | |
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| <div class="highlight"><pre><span class="kn">from</span> <span class="nn">SimPEG</span> <span class="kn">import</span> <span class="o">*</span> | |
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| <pre> | |
| Warning: mumps solver not available. | |
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| In [2]: | |
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| <div class="highlight"><pre><span class="n">M</span> <span class="o">=</span> <span class="n">Mesh</span><span class="o">.</span><span class="n">TensorMesh</span><span class="p">([</span><span class="mi">1000</span><span class="p">])</span> <span class="c"># Make a 1D mesh from 0-1 with 1000 cells</span> | |
| <span class="n">nk</span> <span class="o">=</span> <span class="mi">20</span> <span class="c">#: The number of kernals</span> | |
| <span class="n">p</span> <span class="o">=</span> <span class="n">q</span> <span class="o">=</span> <span class="mf">0.25</span> <span class="c">#: Some constants</span> | |
| <span class="c"># Create a function for each row of the matrix</span> | |
| <span class="n">g</span> <span class="o">=</span> <span class="k">lambda</span> <span class="n">k</span><span class="p">,</span> <span class="n">x</span><span class="p">:</span> <span class="n">np</span><span class="o">.</span><span class="n">exp</span><span class="p">(</span><span class="o">-</span><span class="n">p</span><span class="o">*</span><span class="n">k</span><span class="o">*</span><span class="n">x</span><span class="p">)</span><span class="o">*</span><span class="n">np</span><span class="o">.</span><span class="n">cos</span><span class="p">(</span><span class="mi">2</span><span class="o">*</span><span class="n">np</span><span class="o">.</span><span class="n">pi</span><span class="o">*</span><span class="n">q</span><span class="o">*</span><span class="n">k</span><span class="o">*</span><span class="n">x</span><span class="p">)</span> | |
| <span class="c"># Concatenate each row, and reshape</span> | |
| <span class="n">G</span> <span class="o">=</span> <span class="n">np</span><span class="o">.</span><span class="n">concatenate</span><span class="p">([</span><span class="n">g</span><span class="p">(</span><span class="n">i</span><span class="p">,</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span><span class="p">)</span> <span class="k">for</span> <span class="n">i</span> <span class="ow">in</span> <span class="nb">range</span><span class="p">(</span><span class="n">nk</span><span class="p">)])</span> | |
| <span class="n">G</span><span class="o">.</span><span class="n">shape</span> <span class="o">=</span> <span class="p">(</span><span class="n">nk</span><span class="p">,</span> <span class="n">M</span><span class="o">.</span><span class="n">nC</span><span class="p">)</span> | |
| <span class="n">figure</span><span class="p">(</span><span class="n">figsize</span><span class="o">=</span><span class="p">(</span><span class="mi">12</span><span class="p">,</span><span class="mi">4</span><span class="p">))</span> | |
| <span class="n">plot</span><span class="p">(</span><span class="n">G</span><span class="o">.</span><span class="n">T</span><span class="p">)</span> | |
| <span class="n">title</span><span class="p">(</span><span class="s">'Rows of G'</span><span class="p">)</span> | |
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| <p>Now that we have a matrix, we can create a few models that live at the cell-centers of our mesh. We will multiply these models by the matrix that we just created to create some predicted data:</p> | |
| <p>$$ \mathbf{d}_{\text{pred}} = \mathbf{Pu} = \mathbf{PGm}$$</p> | |
| <p>Here we will create data by projecting the field, $\mathbf{u}$, onto the data-space using a linear projection $\mathbf{P}$. We will create the field by multiplying a model, $\mathbf{m}$, by the matrix we just created $\mathbf{G}$. In this case, we will just assume that our linear projection is the identity (we sample the data everywhere!). This reduces the equation to:</p> | |
| <p>$$ \mathbf{d}_{\text{pred}} = \mathbf{Gm}$$</p> | |
| <p>An interesting question is to see if different models give different data (very important if we ever want to predict the model!).</p> | |
| <p><strong>Note:</strong> in numpy, sometimes you get weird results when you just multiply, so if you intend to do a matrix multiply, use np.dot()</p> | |
| </div> | |
| </div> | |
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| In [3]: | |
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| <div class="highlight"><pre><span class="n">mtrue</span> <span class="o">=</span> <span class="n">np</span><span class="o">.</span><span class="n">zeros</span><span class="p">(</span><span class="n">M</span><span class="o">.</span><span class="n">nC</span><span class="p">)</span> <span class="c"># Create a zeros vector, here nC means: number of cells</span> | |
| <span class="n">mtrue</span><span class="p">[</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span> <span class="o">></span> <span class="mf">0.3</span><span class="p">]</span> <span class="o">=</span> <span class="mf">1.</span> | |
| <span class="n">mtrue</span><span class="p">[</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span> <span class="o">></span> <span class="mf">0.45</span><span class="p">]</span> <span class="o">=</span> <span class="o">-</span><span class="mf">0.5</span> | |
| <span class="n">mtrue</span><span class="p">[</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span> <span class="o">></span> <span class="mf">0.6</span><span class="p">]</span> <span class="o">=</span> <span class="mi">0</span> | |
| <span class="n">figure</span><span class="p">(</span><span class="n">figsize</span><span class="o">=</span><span class="p">(</span><span class="mi">12</span><span class="p">,</span><span class="mi">4</span><span class="p">))</span> | |
| <span class="n">subplot</span><span class="p">(</span><span class="mi">121</span><span class="p">)</span> | |
| <span class="c"># Create a few models</span> | |
| <span class="n">models</span> <span class="o">=</span> <span class="n">np</span><span class="o">.</span><span class="n">c_</span><span class="p">[</span><span class="n">mtrue</span><span class="p">,</span> <span class="n">np</span><span class="o">.</span><span class="n">r_</span><span class="p">[</span><span class="n">mtrue</span><span class="p">[</span><span class="mi">200</span><span class="p">:],</span><span class="n">mtrue</span><span class="p">[:</span><span class="mi">200</span><span class="p">]]</span><span class="o">*</span><span class="mf">0.5</span> <span class="o">-</span> <span class="mf">0.2</span><span class="p">,</span> | |
| <span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span> <span class="o">-</span> <span class="mf">0.5</span><span class="p">,</span> <span class="o">-</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span> <span class="o">+</span> <span class="mf">0.75</span><span class="p">,</span> | |
| <span class="n">Utils</span><span class="o">.</span><span class="n">ModelBuilder</span><span class="o">.</span><span class="n">randomModel</span><span class="p">(</span><span class="mi">1000</span><span class="p">,</span><span class="n">seed</span><span class="o">=</span><span class="mi">751</span><span class="p">,</span><span class="n">its</span><span class="o">=</span><span class="mi">20000</span><span class="p">)</span><span class="o">-</span><span class="mf">0.3</span><span class="p">]</span> | |
| <span class="n">plot</span><span class="p">(</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span><span class="p">,</span> <span class="n">models</span><span class="p">)</span> | |
| <span class="n">title</span><span class="p">(</span><span class="s">'A few synthetic model.'</span><span class="p">)</span> | |
| <span class="n">xlabel</span><span class="p">(</span><span class="s">'x'</span><span class="p">);</span><span class="n">ylabel</span><span class="p">(</span><span class="s">'Amplitude'</span><span class="p">)</span> | |
| <span class="n">data</span> <span class="o">=</span> <span class="n">G</span><span class="o">.</span><span class="n">dot</span><span class="p">(</span><span class="n">models</span><span class="p">)</span> <span class="c">#: this is matrix multiplication!!</span> | |
| <span class="n">subplot</span><span class="p">(</span><span class="mi">122</span><span class="p">)</span> | |
| <span class="n">plot</span><span class="p">(</span><span class="n">data</span><span class="p">)</span> | |
| <span class="n">title</span><span class="p">(</span><span class="s">'The data created by each model.'</span><span class="p">)</span> | |
| <span class="n">xlim</span><span class="p">([</span><span class="mi">0</span><span class="p">,</span><span class="mi">19</span><span class="p">]);</span><span class="n">xlabel</span><span class="p">(</span><span class="s">'Kernal Number, i'</span><span class="p">);</span><span class="n">ylabel</span><span class="p">(</span><span class="s">'g(i) * x'</span><span class="p">)</span> | |
| </pre></div> | |
| </div> | |
| </div> | |
| </div> | |
| <div class="output_wrapper"> | |
| <div class="output"> | |
| <div class="output_area"><div class="prompt output_prompt"> | |
| Out[3]:</div> | |
| <div class="output_text output_subarea output_pyout"> | |
| <pre> | |
| <matplotlib.text.Text at 0x10db27ad0> | |
| </pre> | |
| </div> | |
| </div> | |
| <div class="output_area"><div class="prompt"></div> | |
| <div class="output_png output_subarea "> | |
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| RK5CYII= | |
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| <p>What is important to see here is that each model gives us different data, which means that if we <strong>just</strong> have the data, we might be able to recover the model!</p> | |
| <p>To do this efficiently (i.e. optimize) we will need the derivatives of this problem, luckily, the matrix that creates our data does not depend on our model (i.e. the inverse problem is linear). Our problem is as follows:</p> | |
| <p>$$ \mathbf{d}_{\text{pred}} = \mathbf{Gm}$$</p> | |
| <p>Where $\mathbf{m} \in \mathcal{R}^n$ is our model vector, $\mathbf{G} \in \mathcal{R}^{k,n}$ is our matrix of $k$ kernal functions that samples our model to produce our predicted data ($\mathbf{d}_\text{pred}$).</p> | |
| <p>The question that we want to know is: "How sensitive is our data to a slight change in our model?" To answer this we shall use calculus! *<em>gasp</em>*</p> | |
| <p>$$ \mathbf{J} = \frac{\partial \mathbf{d}_{\text{pred}}}{\partial \mathbf{m}} = \frac{\partial \mathbf{Gm} }{\partial \mathbf{m}} = \mathbf{G}\frac{\partial \mathbf{m} }{\partial \mathbf{m}} = \mathbf{G}$$</p> | |
| <p>The derivative describes how the predicted data changes with small changes in our model, and in this case it is fairly straight forward.</p> | |
| <p>All that SimPEG needs to know when you create a problem is:</p> | |
| <ol> | |
| <li>how to create data ($\mathbf{Gm}$),</li> | |
| <li>the sensitivities effect on a vector, $\mathbf{v}$, ($\mathbf{Jv = Gv}$), and </li> | |
| <li>the transpose sensitivities effect on a vector, $\mathbf{v}$, ($\mathbf{J^\top v = G^\top v}$).</li> | |
| </ol> | |
| <p>To learn more about the problem class in SimPEG and how you can use it, check out the documentation at: | |
| <a href="http://simpeg.rtfd.org">http://simpeg.rtfd.org</a></p> | |
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| In [4]: | |
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| <div class="highlight"><pre><span class="k">class</span> <span class="nc">LinearSurvey</span><span class="p">(</span><span class="n">Survey</span><span class="o">.</span><span class="n">BaseSurvey</span><span class="p">):</span> | |
| <span class="k">def</span> <span class="nf">projectFields</span><span class="p">(</span><span class="bp">self</span><span class="p">,</span> <span class="n">u</span><span class="p">):</span> | |
| <span class="k">return</span> <span class="n">u</span> | |
| <span class="k">class</span> <span class="nc">LinearProblem</span><span class="p">(</span><span class="n">Problem</span><span class="o">.</span><span class="n">BaseProblem</span><span class="p">):</span> | |
| <span class="n">surveyPair</span> <span class="o">=</span> <span class="n">LinearSurvey</span> | |
| <span class="k">def</span> <span class="nf">__init__</span><span class="p">(</span><span class="bp">self</span><span class="p">,</span> <span class="n">model</span><span class="p">,</span> <span class="n">G</span><span class="p">,</span> <span class="o">**</span><span class="n">kwargs</span><span class="p">):</span> | |
| <span class="n">Problem</span><span class="o">.</span><span class="n">BaseProblem</span><span class="o">.</span><span class="n">__init__</span><span class="p">(</span><span class="bp">self</span><span class="p">,</span> <span class="n">model</span><span class="p">,</span> <span class="o">**</span><span class="n">kwargs</span><span class="p">)</span> | |
| <span class="bp">self</span><span class="o">.</span><span class="n">G</span> <span class="o">=</span> <span class="n">G</span> | |
| <span class="k">def</span> <span class="nf">fields</span><span class="p">(</span><span class="bp">self</span><span class="p">,</span> <span class="n">m</span><span class="p">):</span> | |
| <span class="k">return</span> <span class="bp">self</span><span class="o">.</span><span class="n">G</span><span class="o">.</span><span class="n">dot</span><span class="p">(</span><span class="n">m</span><span class="p">)</span> | |
| <span class="k">def</span> <span class="nf">Jvec</span><span class="p">(</span><span class="bp">self</span><span class="p">,</span> <span class="n">m</span><span class="p">,</span> <span class="n">v</span><span class="p">,</span> <span class="n">u</span><span class="o">=</span><span class="bp">None</span><span class="p">):</span> | |
| <span class="k">return</span> <span class="bp">self</span><span class="o">.</span><span class="n">G</span><span class="o">.</span><span class="n">dot</span><span class="p">(</span><span class="n">v</span><span class="p">)</span> | |
| <span class="k">def</span> <span class="nf">Jtvec</span><span class="p">(</span><span class="bp">self</span><span class="p">,</span> <span class="n">m</span><span class="p">,</span> <span class="n">v</span><span class="p">,</span> <span class="n">u</span><span class="o">=</span><span class="bp">None</span><span class="p">):</span> | |
| <span class="k">return</span> <span class="bp">self</span><span class="o">.</span><span class="n">G</span><span class="o">.</span><span class="n">T</span><span class="o">.</span><span class="n">dot</span><span class="p">(</span><span class="n">v</span><span class="p">)</span> | |
| </pre></div> | |
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| <p>Once we have our problem, we can use the inversion tools in SimPEG to run our inversion:</p> | |
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| In [5]: | |
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| <div class="highlight"><pre><span class="c"># Create a model, by default this is a model on the mesh</span> | |
| <span class="n">model</span> <span class="o">=</span> <span class="n">Model</span><span class="o">.</span><span class="n">BaseModel</span><span class="p">(</span><span class="n">M</span><span class="p">)</span> | |
| <span class="c"># Create the problem</span> | |
| <span class="n">prob</span> <span class="o">=</span> <span class="n">LinearProblem</span><span class="p">(</span><span class="n">model</span><span class="p">,</span> <span class="n">G</span><span class="p">)</span> | |
| <span class="c"># create a simpeg data object, using a synthetic model and 5% noise</span> | |
| <span class="n">survey</span> <span class="o">=</span> <span class="n">prob</span><span class="o">.</span><span class="n">createSyntheticSurvey</span><span class="p">(</span><span class="n">models</span><span class="p">[:,</span><span class="mi">4</span><span class="p">],</span><span class="n">std</span><span class="o">=</span><span class="mf">0.05</span><span class="p">)</span> | |
| <span class="c"># Create an optimization program</span> | |
| <span class="n">opt</span> <span class="o">=</span> <span class="n">Optimization</span><span class="o">.</span><span class="n">InexactGaussNewton</span><span class="p">(</span><span class="n">maxIter</span><span class="o">=</span><span class="mi">20</span><span class="p">)</span> | |
| <span class="c"># Create a regularization program</span> | |
| <span class="n">reg</span> <span class="o">=</span> <span class="n">Regularization</span><span class="o">.</span><span class="n">Tikhonov</span><span class="p">(</span><span class="n">model</span><span class="p">)</span> | |
| <span class="c"># Create an objective function</span> | |
| <span class="n">beta</span> <span class="o">=</span> <span class="n">Parameters</span><span class="o">.</span><span class="n">BetaSchedule</span><span class="p">(</span><span class="n">beta0</span><span class="o">=</span><span class="mf">1e-1</span><span class="p">)</span> | |
| <span class="n">obj</span> <span class="o">=</span> <span class="n">ObjFunction</span><span class="o">.</span><span class="n">BaseObjFunction</span><span class="p">(</span><span class="n">survey</span><span class="p">,</span> <span class="n">reg</span><span class="p">,</span> <span class="n">beta</span><span class="o">=</span><span class="n">beta</span><span class="p">)</span> | |
| <span class="c"># Create an inversion object</span> | |
| <span class="n">inv</span> <span class="o">=</span> <span class="n">Inversion</span><span class="o">.</span><span class="n">BaseInversion</span><span class="p">(</span><span class="n">obj</span><span class="p">,</span> <span class="n">opt</span><span class="p">)</span> | |
| <span class="c"># Start the inversion with a model of zeros, and run the inversion</span> | |
| <span class="n">m0</span> <span class="o">=</span> <span class="n">survey</span><span class="o">.</span><span class="n">mtrue</span><span class="o">*</span><span class="mi">0</span> | |
| <span class="n">mopt</span> <span class="o">=</span> <span class="n">inv</span><span class="o">.</span><span class="n">run</span><span class="p">(</span><span class="n">m0</span><span class="p">)</span> | |
| </pre></div> | |
| </div> | |
| </div> | |
| </div> | |
| <div class="output_wrapper"> | |
| <div class="output"> | |
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| <div class="output_subarea output_stream output_stdout output_text"> | |
| <pre> | |
| Regularization has not set mref. SimPEG will set it to m0. | |
| ============================ Inexact Gauss Newton ============================ | |
| # beta phi_d phi_m f |proj(x-g)-x| LS Comment | |
| ----------------------------------------------------------------------------- | |
| 0 1.00e-01 3.94e+03 0.00e+00 3.94e+03 3.80e+03 0 | |
| Setting bfgsH0 to the inverse of the modelObj2Deriv. Done using direct methods. | |
| 1 1.00e-01 1.14e+03 3.65e-01 1.14e+03 5.76e+02 0 | |
| 2 1.00e-01 6.38e+02 1.68e+00 6.38e+02 6.92e+02 0 | |
| 3 5.00e-02 3.74e+02 4.55e+00 3.74e+02 6.00e+02 0 Skip BFGS | |
| 4 5.00e-02 2.65e+02 4.18e+00 2.65e+02 7.62e+02 0 | |
| 5 5.00e-02 2.09e+02 5.70e+00 2.10e+02 4.60e+02 0 | |
| 6 2.50e-02 1.37e+02 8.22e+00 1.37e+02 8.01e+02 0 | |
| 7 2.50e-02 1.21e+02 9.29e+00 1.21e+02 5.88e+02 0 | |
| 8 2.50e-02 1.17e+02 9.44e+00 1.17e+02 6.65e+02 0 | |
| 9 1.25e-02 1.14e+02 9.81e+00 1.14e+02 6.18e+02 0 | |
| 10 1.25e-02 1.10e+02 1.06e+01 1.10e+02 6.70e+02 0 | |
| 11 1.25e-02 1.09e+02 1.05e+01 1.09e+02 6.29e+02 0 | |
| 12 6.25e-03 1.08e+02 1.05e+01 1.08e+02 6.80e+02 0 | |
| 13 6.25e-03 1.07e+02 1.02e+01 1.07e+02 6.86e+02 0 Skip BFGS | |
| 14 6.25e-03 1.06e+02 1.04e+01 1.06e+02 6.65e+02 0 | |
| 15 3.13e-03 1.99e+01 1.19e+01 1.99e+01 1.46e+02 0 Skip BFGS | |
| 16 3.13e-03 1.56e+01 1.12e+01 1.56e+01 1.14e+02 0 | |
| 17 3.13e-03 1.50e+01 1.13e+01 1.50e+01 1.42e+02 0 | |
| 18 1.56e-03 1.22e+01 1.06e+01 1.22e+01 1.03e+02 0 Skip BFGS | |
| 19 1.56e-03 1.16e+01 1.09e+01 1.16e+01 8.47e+01 0 | |
| 20 1.56e-03 1.15e+01 1.10e+01 1.15e+01 9.08e+01 0 Skip BFGS | |
| ------------------------- STOP! ------------------------- | |
| 1 : |fc-fOld| = 1.4209e-01 <= tolF*(1+|f0|) = 3.9393e+02 | |
| 0 : |xc-x_last| = 1.0186e-01 <= tolX*(1+|x0|) = 1.0000e-01 | |
| 0 : |proj(x-g)-x| = 9.0818e+01 <= tolG = 1.0000e-01 | |
| 0 : |proj(x-g)-x| = 9.0818e+01 <= 1e3*eps = 1.0000e-02 | |
| 1 : maxIter = 20 <= iter = 20 | |
| ------------------------- DONE! ------------------------- | |
| </pre> | |
| </div> | |
| </div> | |
| </div> | |
| </div> | |
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| <div class="cell border-box-sizing text_cell rendered"> | |
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| <div class="text_cell_render border-box-sizing rendered_html"> | |
| <p>Explore the documentation to see what other parameters you can tweak in the different elements of the inversion, but let's check how well we recovered the model just by using the default parameters:</p> | |
| </div> | |
| </div> | |
| </div> | |
| <div class="cell border-box-sizing code_cell rendered"> | |
| <div class="input"> | |
| <div class="prompt input_prompt"> | |
| In [6]: | |
| </div> | |
| <div class="inner_cell"> | |
| <div class="input_area"> | |
| <div class="highlight"><pre><span class="n">plot</span><span class="p">(</span><span class="n">M</span><span class="o">.</span><span class="n">vectorCCx</span><span class="p">,</span> <span class="n">np</span><span class="o">.</span><span class="n">c_</span><span class="p">[</span><span class="n">survey</span><span class="o">.</span><span class="n">mtrue</span><span class="p">,</span> <span class="n">mopt</span><span class="p">])</span> | |
| <span class="n">xlabel</span><span class="p">(</span><span class="s">'x'</span><span class="p">)</span> | |
| <span class="n">legend</span><span class="p">((</span><span class="s">'true model'</span><span class="p">,</span><span class="s">'recovered model'</span><span class="p">))</span> | |
| </pre></div> | |
| </div> | |
| </div> | |
| </div> | |
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| <div class="output"> | |
| <div class="output_area"><div class="prompt output_prompt"> | |
| Out[6]:</div> | |
| <div class="output_text output_subarea output_pyout"> | |
| <pre> | |
| <matplotlib.legend.Legend at 0x10db80290> | |
| </pre> | |
| </div> | |
| </div> | |
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| " | |
| > | |
| </div> | |
| </div> | |
| </div> | |
| </div> | |
| </div> | |
| <div class="cell border-box-sizing text_cell rendered"> | |
| <div class="prompt input_prompt"> | |
| </div> | |
| <div class="inner_cell"> | |
| <div class="text_cell_render border-box-sizing rendered_html"> | |
| <p>Hopefully you now have an idea of how to create a Problem class in SimPEG, and how this can be used with the other tools available.</p> | |
| </div> | |
| </div> | |
| </div> |
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