519 lines
15 KiB
C++
519 lines
15 KiB
C++
/**
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* @file ABC_EQF.h
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* @brief Header file for the Attitude-Bias-Calibration Equivariant Filter
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*
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* This file contains declarations for the Equivariant Filter (EqF) for attitude
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* estimation with both gyroscope bias and sensor extrinsic calibration, based
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* on the paper: "Overcoming Bias: Equivariant Filter Design for Biased Attitude
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* Estimation with Online Calibration" by Fornasier et al. Authors: Darshan
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* Rajasekaran & Jennifer Oum
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*/
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#ifndef ABC_EQF_H
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#define ABC_EQF_H
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#pragma once
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#include <gtsam/base/Matrix.h>
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#include <gtsam/base/Vector.h>
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#include <gtsam/geometry/Rot3.h>
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#include <gtsam/geometry/Unit3.h>
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#include <gtsam/inference/Symbol.h>
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#include <gtsam/navigation/ImuBias.h>
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#include <gtsam/nonlinear/Values.h>
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#include <gtsam/slam/dataset.h>
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#include <chrono>
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#include <cmath>
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#include <fstream>
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#include <functional>
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#include <iostream>
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#include <numeric> // For std::accumulate
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#include <string>
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#include <vector>
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#include "ABC.h"
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// All implementations are wrapped in this namespace to avoid conflicts
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namespace gtsam {
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namespace abc_eqf_lib {
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using namespace std;
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using namespace gtsam;
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//========================================================================
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// Helper Functions for EqF
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//========================================================================
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/// Calculate numerical differential
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Matrix numericalDifferential(std::function<Vector(const Vector&)> f,
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const Vector& x);
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/**
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* Compute the lift of the system (Theorem 3.8, Equation 7)
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* @param xi State
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* @param u Input
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* @return Lift vector
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*/
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template <size_t N>
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Vector lift(const State<N>& xi, const Input& u);
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/**
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* Action of the symmetry group on the state space (Equation 4)
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* @param X Group element
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* @param xi State
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* @return New state after group action
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*/
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template <size_t N>
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State<N> operator*(const G<N>& X, const State<N>& xi);
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/**
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* Action of the symmetry group on the input space (Equation 5)
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* @param X Group element
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* @param u Input
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* @return New input after group action
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*/
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template <size_t N>
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Input velocityAction(const G<N>& X, const Input& u);
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/**
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* Action of the symmetry group on the output space (Equation 6)
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* @param X Group element
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* @param y Direction measurement
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* @param idx Calibration index
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* @return New direction after group action
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*/
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template <size_t N>
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Vector3 outputAction(const G<N>& X, const Unit3& y, int idx);
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/**
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* Differential of the phi action at E = Id in local coordinates
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* @param xi State
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* @return Differential matrix
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*/
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template <size_t N>
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Matrix stateActionDiff(const State<N>& xi);
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//========================================================================
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// Equivariant Filter (EqF)
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//========================================================================
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/// Equivariant Filter (EqF) implementation
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template <size_t N>
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class EqF {
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private:
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int dof; // Degrees of freedom
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G<N> X_hat; // Filter state
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Matrix Sigma; // Error covariance
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State<N> xi_0; // Origin state
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Matrix Dphi0; // Differential of phi at origin
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Matrix InnovationLift; // Innovation lift matrix
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/**
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* Return the state matrix A0t (Equation 14a)
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* @param u Input
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* @return State matrix A0t
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*/
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Matrix stateMatrixA(const Input& u) const;
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/**
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* Return the state transition matrix Phi (Equation 17)
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* @param u Input
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* @param dt Time step
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* @return State transition matrix Phi
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*/
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Matrix stateTransitionMatrix(const Input& u, double dt) const;
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/**
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* Return the Input matrix Bt
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* @return Input matrix Bt
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*/
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Matrix inputMatrixBt() const;
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/**
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* Return the measurement matrix C0 (Equation 14b)
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* @param d Known direction
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* @param idx Calibration index
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* @return Measurement matrix C0
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*/
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Matrix measurementMatrixC(const Unit3& d, int idx) const;
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/**
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* Return the measurement output matrix Dt
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* @param idx Calibration index
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* @return Measurement output matrix Dt
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*/
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Matrix outputMatrixDt(int idx) const;
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public:
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/**
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* Initialize EqF
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* @param Sigma Initial covariance
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* @param m Number of sensors
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*/
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EqF(const Matrix& Sigma, int m);
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/**
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* Return estimated state
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* @return Current state estimate
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*/
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State<N> stateEstimate() const;
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/**
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* Propagate the filter state
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* @param u Angular velocity measurement
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* @param dt Time step
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*/
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void propagation(const Input& u, double dt);
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/**
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* Update the filter state with a measurement
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* @param y Direction measurement
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*/
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void update(const Measurement& y);
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};
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//========================================================================
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// Helper Functions Implementation
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//========================================================================
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/**
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* Maps system dynamics to the symmetry group
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* @param xi State
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* @param u Input
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* @return Lifted input in Lie Algebra
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* Uses Vector zero & Rot3 inverse, matrix functions
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*/
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template <size_t N>
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Vector lift(const State<N>& xi, const Input& u) {
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Vector L = Vector::Zero(6 + 3 * N);
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// First 3 elements
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L.head<3>() = u.w - xi.b;
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// Next 3 elements
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L.segment<3>(3) = -u.W() * xi.b;
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// Remaining elements
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for (size_t i = 0; i < N; i++) {
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L.segment<3>(6 + 3 * i) = xi.S[i].inverse().matrix() * L.head<3>();
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}
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return L;
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}
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/**
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* Implements group actions on the states
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* @param X A symmetry group element G consisting of the attitude, bias and the
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* calibration components X.a -> Rotation matrix containing the attitude X.b ->
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* A skew-symmetric matrix representing bias X.B -> A vector of Rotation
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* matrices for the calibration components
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* @param xi State object
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* xi.R -> Attitude (Rot3)
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* xi.b -> Gyroscope Bias(Vector 3)
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* xi.S -> Vector of calibration matrices(Rot3)
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* @return Transformed state
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* Uses the Rot3 inverse and Vee functions
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*/
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template <size_t N>
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State<N> operator*(const G<N>& X, const State<N>& xi) {
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std::array<Rot3, N> new_S;
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for (size_t i = 0; i < N; i++) {
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new_S[i] = X.A.inverse() * xi.S[i] * X.B[i];
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}
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return State<N>(xi.R * X.A, X.A.inverse().matrix() * (xi.b - Rot3::Vee(X.a)),
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new_S);
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}
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/**
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* Transforms the angular velocity measurements b/w frames
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* @param X A symmetry group element X with the components
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* @param u Inputs
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* @return Transformed inputs
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* Uses Rot3 Inverse, matrix and Vee functions and is critical for maintaining
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* the input equivariance
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*/
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template <size_t N>
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Input velocityAction(const G<N>& X, const Input& u) {
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return Input{X.A.inverse().matrix() * (u.w - Rot3::Vee(X.a)), u.Sigma};
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}
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/**
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* Transforms the Direction measurements based on the calibration type ( Eqn 6)
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* @param X Group element X
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* @param y Direction measurement y
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* @param idx Calibration index
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* @return Transformed direction
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* Uses Rot3 inverse, matric and Unit3 unitvector functions
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*/
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template <size_t N>
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Vector3 outputAction(const G<N>& X, const Unit3& y, int idx) {
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if (idx == -1) {
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return X.A.inverse().matrix() * y.unitVector();
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} else {
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if (idx >= static_cast<int>(N)) {
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throw std::out_of_range("Calibration index out of range");
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}
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return X.B[idx].inverse().matrix() * y.unitVector();
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}
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}
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/**
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* @brief Calculates the Jacobian matrix using central difference approximation
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* @param f Vector function f
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* @param x The point at which Jacobian is evaluated
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* @return Matrix containing numerical partial derivatives of f at x
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* Uses Vector's size() and Zero(), Matrix's Zero() and col() methods
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*/
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Matrix numericalDifferential(std::function<Vector(const Vector&)> f,
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const Vector& x) {
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double h = 1e-6;
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Vector fx = f(x);
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int n = fx.size();
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int m = x.size();
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Matrix Df = Matrix::Zero(n, m);
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for (int j = 0; j < m; j++) {
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Vector ej = Vector::Zero(m);
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ej(j) = 1.0;
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Vector fplus = f(x + h * ej);
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Vector fminus = f(x - h * ej);
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Df.col(j) = (fplus - fminus) / (2 * h);
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}
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return Df;
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}
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/**
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* Computes the differential of a state action at the identity of the symmetry
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* group
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* @param xi State object Xi representing the point at which to evaluate the
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* differential
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* @return A matrix representing the jacobian of the state action
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* Uses numericalDifferential, and Rot3 expmap, logmap
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*/
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template <size_t N>
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Matrix stateActionDiff(const State<N>& xi) {
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std::function<Vector(const Vector&)> coordsAction = [&xi](const Vector& U) {
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G<N> groupElement = G<N>::exp(U);
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State<N> transformed = groupElement * xi;
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return xi.localCoordinates(transformed);
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};
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Vector zeros = Vector::Zero(6 + 3 * N);
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Matrix differential = numericalDifferential(coordsAction, zeros);
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return differential;
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}
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//========================================================================
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// Equivariant Filter (EqF) Implementation
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//========================================================================
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/**
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* Initializes the EqF with state dimension validation and computes lifted
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* innovation mapping
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* @param Sigma Initial covariance
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* @param n Number of calibration states
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* @param m Number of sensors
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* Uses SelfAdjointSolver, completeOrthoganalDecomposition().pseudoInverse()
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*/
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template <size_t N>
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EqF<N>::EqF(const Matrix& Sigma, int m)
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: dof(6 + 3 * N),
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X_hat(G<N>::identity(N)),
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Sigma(Sigma),
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xi_0(State<N>::identity()) {
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if (Sigma.rows() != dof || Sigma.cols() != dof) {
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throw std::invalid_argument(
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"Initial covariance dimensions must match the degrees of freedom");
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}
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// Check positive semi-definite
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Eigen::SelfAdjointEigenSolver<Matrix> eigensolver(Sigma);
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if (eigensolver.eigenvalues().minCoeff() < -1e-10) {
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throw std::invalid_argument(
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"Covariance matrix must be semi-positive definite");
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}
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if (N < 0) {
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throw std::invalid_argument(
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"Number of calibration states must be non-negative");
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}
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if (m <= 1) {
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throw std::invalid_argument(
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"Number of direction sensors must be at least 2");
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}
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// Compute differential of phi
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Dphi0 = stateActionDiff(xi_0);
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InnovationLift = Dphi0.completeOrthogonalDecomposition().pseudoInverse();
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}
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/**
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* Computes the internal group state to a physical state estimate
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* @return Current state estimate
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*/
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template <size_t N>
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State<N> EqF<N>::stateEstimate() const {
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return X_hat * xi_0;
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}
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/**
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* Implements the prediction step of the EqF using system dynamics and
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* covariance propagation and advances the filter state by symmtery-preserving
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* dynamics.Uses a Lie group integrator scheme for discrete time propagation
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* @param u Angular velocity measurements
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* @param dt time steps
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* Updated internal state and covariance
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*/
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template <size_t N>
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void EqF<N>::propagation(const Input& u, double dt) {
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State<N> state_est = stateEstimate();
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Vector L = lift(state_est, u);
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Matrix Phi_DT = stateTransitionMatrix(u, dt);
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Matrix Bt = inputMatrixBt();
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Matrix tempSigma = blockDiag(u.Sigma, repBlock(1e-9 * I_3x3, N));
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Matrix M_DT = (Bt * tempSigma * Bt.transpose()) * dt;
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X_hat = X_hat * G<N>::exp(L * dt);
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Sigma = Phi_DT * Sigma * Phi_DT.transpose() + M_DT;
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}
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/**
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* Implements the correction step of the filter using discrete measurements
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* Computes the measurement residual, Kalman gain and the updates both the state
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* and covariance
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*
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* @param y Measurements
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*/
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template <size_t N>
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void EqF<N>::update(const Measurement& y) {
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if (y.cal_idx > static_cast<int>(N)) {
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throw std::invalid_argument("Calibration index out of range");
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}
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// Get vector representations for checking
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Vector3 y_vec = y.y.unitVector();
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Vector3 d_vec = y.d.unitVector();
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// Skip update if any NaN values are present
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if (std::isnan(y_vec[0]) || std::isnan(y_vec[1]) || std::isnan(y_vec[2]) ||
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std::isnan(d_vec[0]) || std::isnan(d_vec[1]) || std::isnan(d_vec[2])) {
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return; // Skip this measurement
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}
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Matrix Ct = measurementMatrixC(y.d, y.cal_idx);
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Vector3 action_result = outputAction(X_hat.inv(), y.y, y.cal_idx);
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Vector3 delta_vec = Rot3::Hat(y.d.unitVector()) * action_result;
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Matrix Dt = outputMatrixDt(y.cal_idx);
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Matrix S = Ct * Sigma * Ct.transpose() + Dt * y.Sigma * Dt.transpose();
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Matrix K = Sigma * Ct.transpose() * S.inverse();
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Vector Delta = InnovationLift * K * delta_vec;
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X_hat = G<N>::exp(Delta) * X_hat;
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Sigma = (Matrix::Identity(dof, dof) - K * Ct) * Sigma;
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}
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/**
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* Computes linearized continuous time state matrix
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* @param u Angular velocity
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* @return Linearized state matrix
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* Uses Matrix zero and Identity functions
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*/
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template <size_t N>
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Matrix EqF<N>::stateMatrixA(const Input& u) const {
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Matrix3 W0 = velocityAction(X_hat.inv(), u).W();
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Matrix A1 = Matrix::Zero(6, 6);
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A1.block<3, 3>(0, 3) = -I_3x3;
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A1.block<3, 3>(3, 3) = W0;
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Matrix A2 = repBlock(W0, N);
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return blockDiag(A1, A2);
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}
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/**
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* Computes the discrete time state transition matrix
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* @param u Angular velocity
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* @param dt time step
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* @return State transition matrix in discrete time
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*/
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template <size_t N>
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Matrix EqF<N>::stateTransitionMatrix(const Input& u, double dt) const {
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Matrix3 W0 = velocityAction(X_hat.inv(), u).W();
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Matrix Phi1 = Matrix::Zero(6, 6);
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Matrix3 Phi12 = -dt * (I_3x3 + (dt / 2) * W0 + ((dt * dt) / 6) * W0 * W0);
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Matrix3 Phi22 = I_3x3 + dt * W0 + ((dt * dt) / 2) * W0 * W0;
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Phi1.block<3, 3>(0, 0) = I_3x3;
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Phi1.block<3, 3>(0, 3) = Phi12;
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Phi1.block<3, 3>(3, 3) = Phi22;
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Matrix Phi2 = repBlock(Phi22, N);
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return blockDiag(Phi1, Phi2);
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}
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/**
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* Computes the input uncertainty propagation matrix
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* @return
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* Uses the blockdiag matrix
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*/
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template <size_t N>
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Matrix EqF<N>::inputMatrixBt() const {
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Matrix B1 = blockDiag(X_hat.A.matrix(), X_hat.A.matrix());
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Matrix B2(3 * N, 3 * N);
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for (size_t i = 0; i < N; ++i) {
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B2.block<3, 3>(3 * i, 3 * i) = X_hat.B[i].matrix();
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}
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return blockDiag(B1, B2);
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}
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/**
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* Computes the linearized measurement matrix. The structure depends on whether
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* the sensor has a calibration state
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* @param d reference direction
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* @param idx Calibration index
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* @return Measurement matrix
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* Uses the matrix zero, Rot3 hat and the Unitvector functions
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*/
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template <size_t N>
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Matrix EqF<N>::measurementMatrixC(const Unit3& d, int idx) const {
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Matrix Cc = Matrix::Zero(3, 3 * N);
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// If the measurement is related to a sensor that has a calibration state
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if (idx >= 0) {
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// Set the correct 3x3 block in Cc
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Cc.block<3, 3>(0, 3 * idx) = Rot3::Hat(d.unitVector());
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}
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Matrix3 wedge_d = Rot3::Hat(d.unitVector());
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// Create the combined matrix
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Matrix temp(3, 6 + 3 * N);
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temp.block<3, 3>(0, 0) = wedge_d;
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temp.block<3, 3>(0, 3) = Matrix3::Zero();
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temp.block(0, 6, 3, 3 * N) = Cc;
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return wedge_d * temp;
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}
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/**
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* Computes the measurement uncertainty propagation matrix
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* @param idx Calibration index
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* @return Returns B[idx] for calibrated sensors, A for uncalibrated
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*/
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template <size_t N>
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Matrix EqF<N>::outputMatrixDt(int idx) const {
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// If the measurement is related to a sensor that has a calibration state
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if (idx >= 0) {
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if (idx >= static_cast<int>(N)) {
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throw std::out_of_range("Calibration index out of range");
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}
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return X_hat.B[idx].matrix();
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} else {
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return X_hat.A.matrix();
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}
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}
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} // namespace abc_eqf_lib
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template <size_t N>
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struct traits<abc_eqf_lib::EqF<N>>
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: internal::LieGroupTraits<abc_eqf_lib::EqF<N>> {};
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} // namespace gtsam
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#endif // ABC_EQF_H
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