| .. highlight:: c++ |
| |
| .. default-domain:: cpp |
| |
| .. _chapter-tutorial: |
| |
| ======== |
| Tutorial |
| ======== |
| Ceres solves robustified non-linear least squares problems of the form |
| |
| .. math:: \frac{1}{2}\sum_{i=1} \rho_i\left(\left\|f_i\left(x_{i_1}, ... ,x_{i_k}\right)\right\|^2\right). |
| :label: ceresproblem |
| |
| The expression |
| :math:`\rho_i\left(\left\|f_i\left(x_{i_1},...,x_{i_k}\right)\right\|^2\right)` |
| is known as a ``ResidualBlock``, where :math:`f_i(\cdot)` is a |
| :class:`CostFunction` that depends on the parameter blocks |
| :math:`\left[x_{i_1},... , x_{i_k}\right]`. In most optimization |
| problems small groups of scalars occur together. For example the three |
| components of a translation vector and the four components of the |
| quaternion that define the pose of a camera. We refer to such a group |
| of small scalars as a ``ParameterBlock``. Of course a |
| ``ParameterBlock`` can just be a single parameter. |
| |
| :math:`\rho_i` is a :class:`LossFunction`. A :class:`LossFunction` is |
| a scalar function that is used to reduce the influence of outliers on |
| the solution of non-linear least squares problems. As a special case, |
| when :math:`\rho_i(x) = x`, i.e., the identity function, we get the |
| more familiar `non-linear least squares problem |
| <http://en.wikipedia.org/wiki/Non-linear_least_squares>`_. |
| |
| .. math:: \frac{1}{2}\sum_{i=1} \left\|f_i\left(x_{i_1}, ... ,x_{i_k}\right)\right\|^2. |
| :label: ceresproblem2 |
| |
| In this chapter we will learn how to solve :eq:`ceresproblem` using |
| Ceres Solver. Full working code for all the examples described in this |
| chapter and more can be found in the `examples |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/>`_ |
| directory. |
| |
| .. _section-hello-world: |
| |
| Hello World! |
| ============ |
| |
| To get started, consider the problem of finding the minimum of the |
| function |
| |
| .. math:: \frac{1}{2}(10 -x)^2. |
| |
| This is a trivial problem, whose minimum is located at :math:`x = 10`, |
| but it is a good place to start to illustrate the basics of solving a |
| problem with Ceres [#f1]_. |
| |
| The first step is to write a functor that will evaluate this the |
| function :math:`f(x) = 10 - x`: |
| |
| .. code-block:: c++ |
| |
| struct CostFunctor { |
| template <typename T> |
| bool operator()(const T* const x, T* residual) const { |
| residual[0] = T(10.0) - x[0]; |
| return true; |
| } |
| }; |
| |
| The important thing to note here is that ``operator()`` is a templated |
| method, which assumes that all its inputs and outputs are of some type |
| ``T``. The reason for using templates here is because Ceres will call |
| ``CostFunctor::operator<T>()``, with ``T=double`` when just the |
| residual is needed, and with a special type ``T=Jet`` when the |
| Jacobians are needed. In :ref:`section-derivatives` we discuss the |
| various ways of supplying derivatives to Ceres in more detail. |
| |
| Once we have a way of computing the residual function, it is now time |
| to construct a non-linear least squares problem using it and have |
| Ceres solve it. |
| |
| .. code-block:: c++ |
| |
| int main(int argc, char** argv) { |
| google::InitGoogleLogging(argv[0]); |
| |
| // The variable to solve for with its initial value. |
| double initial_x = 5.0; |
| double x = initial_x; |
| |
| // Build the problem. |
| Problem problem; |
| |
| // Set up the only cost function (also known as residual). This uses |
| // auto-differentiation to obtain the derivative (jacobian). |
| CostFunction* cost_function = |
| new AutoDiffCostFunction<CostFunctor, 1, 1>(new CostFunctor); |
| problem.AddResidualBlock(cost_function, NULL, &x); |
| |
| // Run the solver! |
| Solver::Options options; |
| options.linear_solver_type = ceres::DENSE_QR; |
| options.minimizer_progress_to_stdout = true; |
| Solver::Summary summary; |
| Solve(options, &problem, &summary); |
| |
| std::cout << summary.BriefReport() << "\n"; |
| std::cout << "x : " << initial_x |
| << " -> " << x << "\n"; |
| return 0; |
| } |
| |
| :class:`AutoDiffCostFunction` takes a ``CostFunctor`` as input, |
| automatically differentiates it and gives it a :class:`CostFunction` |
| interface. |
| |
| Compiling and running `examples/helloworld.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/helloworld.cc>`_ |
| gives us |
| |
| .. code-block:: bash |
| |
| 0: f: 1.250000e+01 d: 0.00e+00 g: 5.00e+00 h: 0.00e+00 rho: 0.00e+00 mu: 1.00e+04 li: 0 it: 6.91e-06 tt: 1.91e-03 |
| 1: f: 1.249750e-07 d: 1.25e+01 g: 5.00e-04 h: 5.00e+00 rho: 1.00e+00 mu: 3.00e+04 li: 1 it: 2.81e-05 tt: 1.99e-03 |
| 2: f: 1.388518e-16 d: 1.25e-07 g: 1.67e-08 h: 5.00e-04 rho: 1.00e+00 mu: 9.00e+04 li: 1 it: 1.00e-05 tt: 2.01e-03 |
| Ceres Solver Report: Iterations: 2, Initial cost: 1.250000e+01, Final cost: 1.388518e-16, Termination: PARAMETER_TOLERANCE. |
| x : 5 -> 10 |
| |
| Starting from a :math:`x=5`, the solver in two iterations goes to 10 |
| [#f2]_. The careful reader will note that this is a linear problem and |
| one linear solve should be enough to get the optimal value. The |
| default configuration of the solver is aimed at non-linear problems, |
| and for reasons of simplicity we did not change it in this example. It |
| is indeed possible to obtain the solution to this problem using Ceres |
| in one iteration. Also note that the solver did get very close to the |
| optimal function value of 0 in the very first iteration. We will |
| discuss these issues in greater detail when we talk about convergence |
| and parameter settings for Ceres. |
| |
| .. rubric:: Footnotes |
| |
| .. [#f1] `examples/helloworld.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/helloworld.cc>`_ |
| |
| .. [#f2] Actually the solver ran for three iterations, and it was |
| by looking at the value returned by the linear solver in the third |
| iteration, it observed that the update to the parameter block was too |
| small and declared convergence. Ceres only prints out the display at |
| the end of an iteration, and terminates as soon as it detects |
| convergence, which is why you only see two iterations here and not |
| three. |
| |
| .. _section-derivatives: |
| |
| |
| Derivatives |
| =========== |
| |
| Ceres Solver like most optimization packages, depends on being able to |
| evaluate the value and the derivatives of each term in the objective |
| function at arbitrary parameter values. Doing so correctly and |
| efficiently is essential to getting good results. Ceres Solver |
| provides a number of ways of doing so. You have already seen one of |
| them in action -- |
| Automatic Differentiation in `examples/helloworld.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/helloworld.cc>`_ |
| |
| We now consider the other two possibilities. Analytic and numeric |
| derivatives. |
| |
| |
| Numeric Derivatives |
| ------------------- |
| |
| In some cases, its not possible to define a templated cost functor, |
| for example when the evaluation of the residual involves a call to a |
| library function that you do not have control over. In such a |
| situation, numerical differentiation can be used. The user defines a |
| functor which computes the residual value and construct a |
| :class:`NumericDiffCostFunction` using it. e.g., for :math:`f(x) = 10 - x` |
| the corresponding functor would be |
| |
| .. code-block:: c++ |
| |
| struct NumericDiffCostFunctor { |
| bool operator()(const double* const x, double* residual) const { |
| residual[0] = 10.0 - x[0]; |
| return true; |
| } |
| }; |
| |
| Which is added to the :class:`Problem` as: |
| |
| .. code-block:: c++ |
| |
| CostFunction* cost_function = |
| new NumericDiffCostFunction<NumericDiffCostFunctor, ceres::CENTRAL, 1, 1, 1>( |
| new NumericDiffCostFunctor) |
| problem.AddResidualBlock(cost_function, NULL, &x); |
| |
| Notice the parallel from when we were using automatic differentiation |
| |
| .. code-block:: c++ |
| |
| CostFunction* cost_function = |
| new AutoDiffCostFunction<CostFunctor, 1, 1>(new CostFunctor); |
| problem.AddResidualBlock(cost_function, NULL, &x); |
| |
| The construction looks almost identical to the one used for automatic |
| differentiation, except for an extra template parameter that indicates |
| the kind of finite differencing scheme to be used for computing the |
| numerical derivatives [#f3]_. For more details see the documentation |
| for :class:`NumericDiffCostFunction`. |
| |
| **Generally speaking we recommend automatic differentiation instead of |
| numeric differentiation. The use of C++ templates makes automatic |
| differentiation efficient, whereas numeric differentiation is |
| expensive, prone to numeric errors, and leads to slower convergence.** |
| |
| |
| Analytic Derivatives |
| -------------------- |
| |
| In some cases, using automatic differentiation is not possible. For |
| example, it may be the case that it is more efficient to compute the |
| derivatives in closed form instead of relying on the chain rule used |
| by the automatic differentiation code. |
| |
| In such cases, it is possible to supply your own residual and jacobian |
| computation code. To do this, define a subclass of |
| :class:`CostFunction` or :class:`SizedCostFunction` if you know the |
| sizes of the parameters and residuals at compile time. Here for |
| example is ``SimpleCostFunction`` that implements :math:`f(x) = 10 - |
| x`. |
| |
| .. code-block:: c++ |
| |
| class QuadraticCostFunction : public ceres::SizedCostFunction<1, 1> { |
| public: |
| virtual ~QuadraticCostFunction() {} |
| virtual bool Evaluate(double const* const* parameters, |
| double* residuals, |
| double** jacobians) const { |
| const double x = parameters[0][0]; |
| residuals[0] = 10 - x; |
| |
| // Compute the Jacobian if asked for. |
| if (jacobians != NULL && jacobians[0] != NULL) { |
| jacobians[0][0] = -1; |
| } |
| return true; |
| } |
| }; |
| |
| |
| ``SimpleCostFunction::Evaluate`` is provided with an input array of |
| ``parameters``, an output array ``residuals`` for residuals and an |
| output array ``jacobians`` for Jacobians. The ``jacobians`` array is |
| optional, ``Evaluate`` is expected to check when it is non-null, and |
| if it is the case then fill it with the values of the derivative of |
| the residual function. In this case since the residual function is |
| linear, the Jacobian is constant [#f4]_ . |
| |
| As can be seen from the above code fragments, implementing |
| :class:`CostFunction` objects is a bit tedious. We recommend that |
| unless you have a good reason to manage the jacobian computation |
| yourself, you use :class:`AutoDiffCostFunction` or |
| :class:`NumericDiffCostFunction` to construct your residual blocks. |
| |
| More About Derivatives |
| ---------------------- |
| |
| Computing derivatives is by far the most complicated part of using |
| Ceres, and depending on the circumstance the user may need more |
| sophisticated ways of computing derivatives. This section just |
| scratches the surface of how derivatives can be supplied to |
| Ceres. Once you are comfortable with using |
| :class:`NumericDiffCostFunction` and :class:`AutoDiffCostFunction` we |
| recommend taking a look at :class:`DynamicAutoDiffCostFunction`, |
| :class:`CostFunctionToFunctor`, :class:`NumericDiffFunctor` and |
| :class:`ConditionedCostFunction` for more advanced ways of |
| constructing and computing cost functions. |
| |
| .. rubric:: Footnotes |
| |
| .. [#f3] `examples/helloworld_numeric_diff.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/helloworld_numeric_diff.cc>`_. |
| |
| .. [#f4] `examples/helloworld_analytic_diff.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/helloworld_analytic_diff.cc>`_. |
| |
| |
| .. _section-powell: |
| |
| Powell's Function |
| ================= |
| |
| Consider now a slightly more complicated example -- the minimization |
| of Powell's function. Let :math:`x = \left[x_1, x_2, x_3, x_4 \right]` |
| and |
| |
| .. math:: |
| |
| \begin{align} |
| f_1(x) &= x_1 + 10x_2 \\ |
| f_2(x) &= \sqrt{5} (x_3 - x_4)\\ |
| f_3(x) &= (x_2 - 2x_3)^2\\ |
| f_4(x) &= \sqrt{10} (x_1 - x_4)^2\\ |
| F(x) &= \left[f_1(x),\ f_2(x),\ f_3(x),\ f_4(x) \right] |
| \end{align} |
| |
| |
| :math:`F(x)` is a function of four parameters, has four residuals |
| and we wish to find :math:`x` such that :math:`\frac{1}{2}\|F(x)\|^2` |
| is minimized. |
| |
| Again, the first step is to define functors that evaluate of the terms |
| in the objective functor. Here is the code for evaluating |
| :math:`f_4(x_1, x_4)`: |
| |
| .. code-block:: c++ |
| |
| struct F4 { |
| template <typename T> |
| bool operator()(const T* const x1, const T* const x4, T* residual) const { |
| residual[0] = T(sqrt(10.0)) * (x1[0] - x4[0]) * (x1[0] - x4[0]); |
| return true; |
| } |
| }; |
| |
| |
| Similarly, we can define classes ``F1``, ``F2`` and ``F4`` to evaluate |
| :math:`f_1(x_1, x_2)`, :math:`f_2(x_3, x_4)` and :math:`f_3(x_2, x_3)` |
| respectively. Using these, the problem can be constructed as follows: |
| |
| |
| .. code-block:: c++ |
| |
| double x1 = 3.0; double x2 = -1.0; double x3 = 0.0; double x4 = 1.0; |
| |
| Problem problem; |
| |
| // Add residual terms to the problem using the using the autodiff |
| // wrapper to get the derivatives automatically. |
| problem.AddResidualBlock( |
| new AutoDiffCostFunction<F1, 1, 1, 1>(new F1), NULL, &x1, &x2); |
| problem.AddResidualBlock( |
| new AutoDiffCostFunction<F2, 1, 1, 1>(new F2), NULL, &x3, &x4); |
| problem.AddResidualBlock( |
| new AutoDiffCostFunction<F3, 1, 1, 1>(new F3), NULL, &x2, &x3) |
| problem.AddResidualBlock( |
| new AutoDiffCostFunction<F4, 1, 1, 1>(new F4), NULL, &x1, &x4); |
| |
| |
| Note that each ``ResidualBlock`` only depends on the two parameters |
| that the corresponding residual object depends on and not on all four |
| parameters. Compiling and running `examples/powell.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/powell.cc>`_ |
| gives us: |
| |
| .. code-block:: bash |
| |
| Initial x1 = 3, x2 = -1, x3 = 0, x4 = 1 |
| 0: f: 1.075000e+02 d: 0.00e+00 g: 1.55e+02 h: 0.00e+00 rho: 0.00e+00 mu: 1.00e+04 li: 0 it: 0.00e+00 tt: 0.00e+00 |
| 1: f: 5.036190e+00 d: 1.02e+02 g: 2.00e+01 h: 2.16e+00 rho: 9.53e-01 mu: 3.00e+04 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 2: f: 3.148168e-01 d: 4.72e+00 g: 2.50e+00 h: 6.23e-01 rho: 9.37e-01 mu: 9.00e+04 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 3: f: 1.967760e-02 d: 2.95e-01 g: 3.13e-01 h: 3.08e-01 rho: 9.37e-01 mu: 2.70e+05 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 4: f: 1.229900e-03 d: 1.84e-02 g: 3.91e-02 h: 1.54e-01 rho: 9.37e-01 mu: 8.10e+05 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 5: f: 7.687123e-05 d: 1.15e-03 g: 4.89e-03 h: 7.69e-02 rho: 9.37e-01 mu: 2.43e+06 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 6: f: 4.804625e-06 d: 7.21e-05 g: 6.11e-04 h: 3.85e-02 rho: 9.37e-01 mu: 7.29e+06 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 7: f: 3.003028e-07 d: 4.50e-06 g: 7.64e-05 h: 1.92e-02 rho: 9.37e-01 mu: 2.19e+07 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 8: f: 1.877006e-08 d: 2.82e-07 g: 9.54e-06 h: 9.62e-03 rho: 9.37e-01 mu: 6.56e+07 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 9: f: 1.173223e-09 d: 1.76e-08 g: 1.19e-06 h: 4.81e-03 rho: 9.37e-01 mu: 1.97e+08 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 10: f: 7.333425e-11 d: 1.10e-09 g: 1.49e-07 h: 2.40e-03 rho: 9.37e-01 mu: 5.90e+08 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 11: f: 4.584044e-12 d: 6.88e-11 g: 1.86e-08 h: 1.20e-03 rho: 9.37e-01 mu: 1.77e+09 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| Ceres Solver Report: Iterations: 12, Initial cost: 1.075000e+02, Final cost: 4.584044e-12, Termination: GRADIENT_TOLERANCE. |
| Final x1 = 0.00116741, x2 = -0.000116741, x3 = 0.000190535, x4 = 0.000190535 |
| |
| It is easy to see that the optimal solution to this problem is at |
| :math:`x_1=0, x_2=0, x_3=0, x_4=0` with an objective function value of |
| :math:`0`. In 10 iterations, Ceres finds a solution with an objective |
| function value of :math:`4\times 10^{-12}`. |
| |
| |
| .. rubric:: Footnotes |
| |
| .. [#f5] `examples/powell.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/powell.cc>`_. |
| |
| |
| .. _section-fitting: |
| |
| Curve Fitting |
| ============= |
| |
| The examples we have seen until now are simple optimization problems |
| with no data. The original purpose of least squares and non-linear |
| least squares analysis was fitting curves to data. It is only |
| appropriate that we now consider an example of such a problem |
| [#f6]_. It contains data generated by sampling the curve :math:`y = |
| e^{0.3x + 0.1}` and adding Gaussian noise with standard deviation |
| :math:`\sigma = 0.2`. Let us fit some data to the curve |
| |
| .. math:: y = e^{mx + c}. |
| |
| We begin by defining a templated object to evaluate the |
| residual. There will be a residual for each observation. |
| |
| .. code-block:: c++ |
| |
| struct ExponentialResidual { |
| ExponentialResidual(double x, double y) |
| : x_(x), y_(y) {} |
| |
| template <typename T> |
| bool operator()(const T* const m, const T* const c, T* residual) const { |
| residual[0] = T(y_) - exp(m[0] * T(x_) + c[0]); |
| return true; |
| } |
| |
| private: |
| // Observations for a sample. |
| const double x_; |
| const double y_; |
| }; |
| |
| Assuming the observations are in a :math:`2n` sized array called |
| ``data`` the problem construction is a simple matter of creating a |
| :class:`CostFunction` for every observation. |
| |
| |
| .. code-block:: c++ |
| |
| double m = 0.0; |
| double c = 0.0; |
| |
| Problem problem; |
| for (int i = 0; i < kNumObservations; ++i) { |
| CostFunction* cost_function = |
| new AutoDiffCostFunction<ExponentialResidual, 1, 1, 1>( |
| new ExponentialResidual(data[2 * i], data[2 * i + 1])); |
| problem.AddResidualBlock(cost_function, NULL, &m, &c); |
| } |
| |
| Compiling and running `examples/curve_fitting.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/curve_fitting.cc>`_ |
| gives us: |
| |
| .. code-block:: bash |
| |
| 0: f: 1.211734e+02 d: 0.00e+00 g: 3.61e+02 h: 0.00e+00 rho: 0.00e+00 mu: 1.00e+04 li: 0 it: 0.00e+00 tt: 0.00e+00 |
| 1: f: 1.211734e+02 d:-2.21e+03 g: 3.61e+02 h: 7.52e-01 rho:-1.87e+01 mu: 5.00e+03 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 2: f: 1.211734e+02 d:-2.21e+03 g: 3.61e+02 h: 7.51e-01 rho:-1.86e+01 mu: 1.25e+03 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 3: f: 1.211734e+02 d:-2.19e+03 g: 3.61e+02 h: 7.48e-01 rho:-1.85e+01 mu: 1.56e+02 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 4: f: 1.211734e+02 d:-2.02e+03 g: 3.61e+02 h: 7.22e-01 rho:-1.70e+01 mu: 9.77e+00 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 5: f: 1.211734e+02 d:-7.34e+02 g: 3.61e+02 h: 5.78e-01 rho:-6.32e+00 mu: 3.05e-01 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 6: f: 3.306595e+01 d: 8.81e+01 g: 4.10e+02 h: 3.18e-01 rho: 1.37e+00 mu: 9.16e-01 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 7: f: 6.426770e+00 d: 2.66e+01 g: 1.81e+02 h: 1.29e-01 rho: 1.10e+00 mu: 2.75e+00 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 8: f: 3.344546e+00 d: 3.08e+00 g: 5.51e+01 h: 3.05e-02 rho: 1.03e+00 mu: 8.24e+00 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 9: f: 1.987485e+00 d: 1.36e+00 g: 2.33e+01 h: 8.87e-02 rho: 9.94e-01 mu: 2.47e+01 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 10: f: 1.211585e+00 d: 7.76e-01 g: 8.22e+00 h: 1.05e-01 rho: 9.89e-01 mu: 7.42e+01 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 11: f: 1.063265e+00 d: 1.48e-01 g: 1.44e+00 h: 6.06e-02 rho: 9.97e-01 mu: 2.22e+02 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 12: f: 1.056795e+00 d: 6.47e-03 g: 1.18e-01 h: 1.47e-02 rho: 1.00e+00 mu: 6.67e+02 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| 13: f: 1.056751e+00 d: 4.39e-05 g: 3.79e-03 h: 1.28e-03 rho: 1.00e+00 mu: 2.00e+03 li: 1 it: 0.00e+00 tt: 0.00e+00 |
| Ceres Solver Report: Iterations: 13, Initial cost: 1.211734e+02, Final cost: 1.056751e+00, Termination: FUNCTION_TOLERANCE. |
| Initial m: 0 c: 0 |
| Final m: 0.291861 c: 0.131439 |
| |
| |
| Starting from parameter values :math:`m = 0, c=0` with an initial |
| objective function value of :math:`121.173` Ceres finds a solution |
| :math:`m= 0.291861, c = 0.131439` with an objective function value of |
| :math:`1.05675`. These values are a a bit different than the |
| parameters of the original model :math:`m=0.3, c= 0.1`, but this is |
| expected. When reconstructing a curve from noisy data, we expect to |
| see such deviations. Indeed, if you were to evaluate the objective |
| function for :math:`m=0.3, c=0.1`, the fit is worse with an objective |
| function value of :math:`1.082425`. The figure below illustrates the fit. |
| |
| .. figure:: least_squares_fit.png |
| :figwidth: 500px |
| :height: 400px |
| :align: center |
| |
| Least squares curve fitting. |
| |
| |
| .. rubric:: Footnotes |
| |
| .. [#f6] `examples/curve_fitting.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/curve_fitting.cc>`_ |
| |
| |
| Robust Curve Fitting |
| ===================== |
| |
| Now suppose the data we are given has some outliers, i.e., we have |
| some points that do not obey the noise model. If we were to use the |
| code above to fit such data, we would get a fit that looks as |
| below. Notice how the fitted curve deviates from the ground truth. |
| |
| .. figure:: non_robust_least_squares_fit.png |
| :figwidth: 500px |
| :height: 400px |
| :align: center |
| |
| To deal with outliers, a standard technique is to use a |
| :class:`LossFunction`. Loss functions, reduce the influence of |
| residual blocks with high residuals, usually the ones corresponding to |
| outliers. To associate a loss function in a residual block, we change |
| |
| .. code-block:: c++ |
| |
| problem.AddResidualBlock(cost_function, NULL , &m, &c); |
| |
| to |
| |
| .. code-block:: c++ |
| |
| problem.AddResidualBlock(cost_function, new CauchyLoss(0.5) , &m, &c); |
| |
| :class:`CauchyLoss` is one of the loss functions that ships with Ceres |
| Solver. The argument :math:`0.5` specifies the scale of the loss |
| function. As a result, we get the fit below [#f7]_. Notice how the |
| fitted curve moves back closer to the ground truth curve. |
| |
| .. figure:: robust_least_squares_fit.png |
| :figwidth: 500px |
| :height: 400px |
| :align: center |
| |
| Using :class:`LossFunction` to reduce the effect of outliers on a |
| least squares fit. |
| |
| |
| .. rubric:: Footnotes |
| |
| .. [#f7] `examples/robust_curve_fitting.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/robust_curve_fitting.cc>`_ |
| |
| |
| Bundle Adjustment |
| ================= |
| |
| One of the main reasons for writing Ceres was our need to solve large |
| scale bundle adjustment problems [HartleyZisserman]_, [Triggs]_. |
| |
| Given a set of measured image feature locations and correspondences, |
| the goal of bundle adjustment is to find 3D point positions and camera |
| parameters that minimize the reprojection error. This optimization |
| problem is usually formulated as a non-linear least squares problem, |
| where the error is the squared :math:`L_2` norm of the difference between |
| the observed feature location and the projection of the corresponding |
| 3D point on the image plane of the camera. Ceres has extensive support |
| for solving bundle adjustment problems. |
| |
| Let us solve a problem from the `BAL |
| <http://grail.cs.washington.edu/projects/bal/>`_ dataset [#f8]_. |
| |
| The first step as usual is to define a templated functor that computes |
| the reprojection error/residual. The structure of the functor is |
| similar to the ``ExponentialResidual``, in that there is an |
| instance of this object responsible for each image observation. |
| |
| Each residual in a BAL problem depends on a three dimensional point |
| and a nine parameter camera. The nine parameters defining the camera |
| are: three for rotation as a Rodriques' axis-angle vector, three |
| for translation, one for focal length and two for radial distortion. |
| The details of this camera model can be found the `Bundler homepage |
| <http://phototour.cs.washington.edu/bundler/>`_ and the `BAL homepage |
| <http://grail.cs.washington.edu/projects/bal/>`_. |
| |
| .. code-block:: c++ |
| |
| struct SnavelyReprojectionError { |
| SnavelyReprojectionError(double observed_x, double observed_y) |
| : observed_x(observed_x), observed_y(observed_y) {} |
| |
| template <typename T> |
| bool operator()(const T* const camera, |
| const T* const point, |
| T* residuals) const { |
| // camera[0,1,2] are the angle-axis rotation. |
| T p[3]; |
| ceres::AngleAxisRotatePoint(camera, point, p); |
| // camera[3,4,5] are the translation. |
| p[0] += camera[3]; p[1] += camera[4]; p[2] += camera[5]; |
| |
| // Compute the center of distortion. The sign change comes from |
| // the camera model that Noah Snavely's Bundler assumes, whereby |
| // the camera coordinate system has a negative z axis. |
| T xp = - p[0] / p[2]; |
| T yp = - p[1] / p[2]; |
| |
| // Apply second and fourth order radial distortion. |
| const T& l1 = camera[7]; |
| const T& l2 = camera[8]; |
| T r2 = xp*xp + yp*yp; |
| T distortion = T(1.0) + r2 * (l1 + l2 * r2); |
| |
| // Compute final projected point position. |
| const T& focal = camera[6]; |
| T predicted_x = focal * distortion * xp; |
| T predicted_y = focal * distortion * yp; |
| |
| // The error is the difference between the predicted and observed position. |
| residuals[0] = predicted_x - T(observed_x); |
| residuals[1] = predicted_y - T(observed_y); |
| return true; |
| } |
| |
| // Factory to hide the construction of the CostFunction object from |
| // the client code. |
| static ceres::CostFunction* Create(const double observed_x, |
| const double observed_y) { |
| return (new ceres::AutoDiffCostFunction<SnavelyReprojectionError, 2, 9, 3>( |
| new SnavelyReprojectionError(observed_x, observed_y))); |
| } |
| |
| double observed_x; |
| double observed_y; |
| }; |
| |
| |
| Note that unlike the examples before, this is a non-trivial function |
| and computing its analytic Jacobian is a bit of a pain. Automatic |
| differentiation makes life much simpler. The function |
| :func:`AngleAxisRotatePoint` and other functions for manipulating |
| rotations can be found in ``include/ceres/rotation.h``. |
| |
| Given this functor, the bundle adjustment problem can be constructed |
| as follows: |
| |
| .. code-block:: c++ |
| |
| ceres::Problem problem; |
| for (int i = 0; i < bal_problem.num_observations(); ++i) { |
| ceres::CostFunction* cost_function = |
| new ceres::AutoDiffCostFunction<SnavelyReprojectionError, 2, 9, 3>( |
| new SnavelyReprojectionError( |
| bal_problem.observations()[2 * i + 0], |
| bal_problem.observations()[2 * i + 1])); |
| problem.AddResidualBlock(cost_function, |
| NULL /* squared loss */, |
| bal_problem.mutable_camera_for_observation(i), |
| bal_problem.mutable_point_for_observation(i)); |
| } |
| |
| |
| Notice that the problem construction for bundle adjustment is very |
| similar to the curve fitting example -- one term is added to the |
| objective function per observation. |
| |
| Since this large sparse problem (well large for ``DENSE_QR`` anyways), |
| one way to solve this problem is to set |
| :member:`Solver::Options::linear_solver_type` to |
| ``SPARSE_NORMAL_CHOLESKY`` and call :member:`Solve`. And while this is |
| a reasonable thing to do, bundle adjustment problems have a special |
| sparsity structure that can be exploited to solve them much more |
| efficiently. Ceres provides three specialized solvers (collectively |
| known as Schur-based solvers) for this task. The example code uses the |
| simplest of them ``DENSE_SCHUR``. |
| |
| .. code-block:: c++ |
| |
| ceres::Solver::Options options; |
| options.linear_solver_type = ceres::DENSE_SCHUR; |
| options.minimizer_progress_to_stdout = true; |
| ceres::Solver::Summary summary; |
| ceres::Solve(options, &problem, &summary); |
| std::cout << summary.FullReport() << "\n"; |
| |
| For a more sophisticated bundle adjustment example which demonstrates |
| the use of Ceres' more advanced features including its various linear |
| solvers, robust loss functions and local parameterizations see |
| `examples/bundle_adjuster.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/bundle_adjuster.cc>`_ |
| |
| |
| .. rubric:: Footnotes |
| |
| .. [#f8] `examples/simple_bundle_adjuster.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/simple_bundle_adjuster.cc>`_ |
| |
| |
| Other Examples |
| ============== |
| |
| Besides the examples in this chapter, the `example |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/>`_ |
| directory contains a number of other examples: |
| |
| #. `bundle_adjuster.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/bundle_adjuster.cc>`_ |
| shows how to use the various features of Ceres to solve bundle |
| adjustment problems. |
| |
| #. `circle_fit.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/circle_fit.cc>`_ |
| shows how to fit data to a circle. |
| |
| #. `denoising.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/denoising.cc>`_ |
| implements image denoising using the `Fields of Experts |
| <http://www.gris.informatik.tu-darmstadt.de/~sroth/research/foe/index.html>`_ |
| model. |
| |
| #. `nist.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/nist.cc>`_ |
| implements and attempts to solves the `NIST |
| <http://www.itl.nist.gov/div898/strd/nls/nls_main.shtm>`_ |
| non-linear regression problems. |
| |
| #. `libmv_bundle_adjuster.cc |
| <https://ceres-solver.googlesource.com/ceres-solver/+/master/examples/libmv_bundle_adjuster.cc>`_ |
| is the bundle adjustment algorithm used by `Blender <www.blender.org>`_/libmv. |
| |
| |
