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- /* ----------------------------------------------------------------------------
- * GTSAM Copyright 2010, Georgia Tech Research Corporation,
- * Atlanta, Georgia 30332-0415
- * All Rights Reserved
- * Authors: Frank Dellaert, et al. (see THANKS for the full author list)
- * See LICENSE for the license information
- * -------------------------------------------------------------------------- */
- /**
- * @file SimpleRotation.cpp
- * @brief This is a super-simple example of optimizing a single rotation according to a single prior
- * @date Jul 1, 2010
- * @author Frank Dellaert
- * @author Alex Cunningham
- */
- /**
- * This example will perform a relatively trivial optimization on
- * a single variable with a single factor.
- */
- // In this example, a 2D rotation will be used as the variable of interest
- #include <gtsam/geometry/Rot2.h>
- // Each variable in the system (poses) must be identified with a unique key.
- // We can either use simple integer keys (1, 2, 3, ...) or symbols (X1, X2, L1).
- // Here we will use symbols
- #include <gtsam/inference/Symbol.h>
- // In GTSAM, measurement functions are represented as 'factors'. Several common factors
- // have been provided with the library for solving robotics/SLAM/Bundle Adjustment problems.
- // We will apply a simple prior on the rotation. We do so via the `addPrior` convenience
- // method in NonlinearFactorGraph.
- // When the factors are created, we will add them to a Factor Graph. As the factors we are using
- // are nonlinear factors, we will need a Nonlinear Factor Graph.
- #include <gtsam/nonlinear/NonlinearFactorGraph.h>
- // The nonlinear solvers within GTSAM are iterative solvers, meaning they linearize the
- // nonlinear functions around an initial linearization point, then solve the linear system
- // to update the linearization point. This happens repeatedly until the solver converges
- // to a consistent set of variable values. This requires us to specify an initial guess
- // for each variable, held in a Values container.
- #include <gtsam/nonlinear/Values.h>
- // Finally, once all of the factors have been added to our factor graph, we will want to
- // solve/optimize to graph to find the best (Maximum A Posteriori) set of variable values.
- // GTSAM includes several nonlinear optimizers to perform this step. Here we will use the
- // standard Levenberg-Marquardt solver
- #include <gtsam/nonlinear/LevenbergMarquardtOptimizer.h>
- using namespace std;
- using namespace gtsam;
- const double degree = M_PI / 180;
- int main() {
- /**
- * Step 1: Create a factor to express a unary constraint
- * The "prior" in this case is the measurement from a sensor,
- * with a model of the noise on the measurement.
- *
- * The "Key" created here is a label used to associate parts of the
- * state (stored in "RotValues") with particular factors. They require
- * an index to allow for lookup, and should be unique.
- *
- * In general, creating a factor requires:
- * - A key or set of keys labeling the variables that are acted upon
- * - A measurement value
- * - A measurement model with the correct dimensionality for the factor
- */
- Rot2 prior = Rot2::fromAngle(30 * degree);
- prior.print("goal angle");
- auto model = noiseModel::Isotropic::Sigma(1, 1 * degree);
- Symbol key('x', 1);
- /**
- * Step 2: Create a graph container and add the factor to it
- * Before optimizing, all factors need to be added to a Graph container,
- * which provides the necessary top-level functionality for defining a
- * system of constraints.
- *
- * In this case, there is only one factor, but in a practical scenario,
- * many more factors would be added.
- */
- NonlinearFactorGraph graph;
- graph.addPrior(key, prior, model);
- graph.print("full graph");
- /**
- * Step 3: Create an initial estimate
- * An initial estimate of the solution for the system is necessary to
- * start optimization. This system state is the "RotValues" structure,
- * which is similar in structure to a STL map, in that it maps
- * keys (the label created in step 1) to specific values.
- *
- * The initial estimate provided to optimization will be used as
- * a linearization point for optimization, so it is important that
- * all of the variables in the graph have a corresponding value in
- * this structure.
- *
- * The interface to all RotValues types is the same, it only depends
- * on the type of key used to find the appropriate value map if there
- * are multiple types of variables.
- */
- Values initial;
- initial.insert(key, Rot2::fromAngle(20 * degree));
- initial.print("initial estimate");
- /**
- * Step 4: Optimize
- * After formulating the problem with a graph of constraints
- * and an initial estimate, executing optimization is as simple
- * as calling a general optimization function with the graph and
- * initial estimate. This will yield a new RotValues structure
- * with the final state of the optimization.
- */
- Values result = LevenbergMarquardtOptimizer(graph, initial).optimize();
- result.print("final result");
- return 0;
- }
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