blob: dde9d7e1a96f700bf1f9b7a93bff59acbbcca110 [file] [log] [blame]
.. highlight:: c++
.. default-domain:: cpp
.. _chapter-gradient_problem_solver:
==================================
General Unconstrained Minimization
==================================
Modeling
========
:class:`FirstOrderFunction`
---------------------------
.. class:: FirstOrderFunction
Instances of :class:`FirstOrderFunction` implement the evaluation of
a function and its gradient.
.. code-block:: c++
class FirstOrderFunction {
public:
virtual ~FirstOrderFunction() {}
virtual bool Evaluate(const double* const parameters,
double* cost,
double* gradient) const = 0;
virtual int NumParameters() const = 0;
};
.. function:: bool FirstOrderFunction::Evaluate(const double* const parameters, double* cost, double* gradient) const
Evaluate the cost/value of the function. If ``gradient`` is not
``nullptr`` then evaluate the gradient too. If evaluation is
successful return, ``true`` else return ``false``.
``cost`` guaranteed to be never ``nullptr``, ``gradient`` can be ``nullptr``.
.. function:: int FirstOrderFunction::NumParameters() const
Number of parameters in the domain of the function.
:class:`GradientProblem`
------------------------
.. class:: GradientProblem
.. code-block:: c++
class GradientProblem {
public:
explicit GradientProblem(FirstOrderFunction* function);
GradientProblem(FirstOrderFunction* function,
LocalParameterization* parameterization);
int NumParameters() const;
int NumLocalParameters() const;
bool Evaluate(const double* parameters, double* cost, double* gradient) const;
bool Plus(const double* x, const double* delta, double* x_plus_delta) const;
};
Instances of :class:`GradientProblem` represent general non-linear
optimization problems that must be solved using just the value of the
objective function and its gradient. Unlike the :class:`Problem`
class, which can only be used to model non-linear least squares
problems, instances of :class:`GradientProblem` not restricted in the
form of the objective function.
Structurally :class:`GradientProblem` is a composition of a
:class:`FirstOrderFunction` and optionally a
:class:`LocalParameterization`.
The :class:`FirstOrderFunction` is responsible for evaluating the cost
and gradient of the objective function.
The :class:`LocalParameterization` is responsible for going back and
forth between the ambient space and the local tangent space. When a
:class:`LocalParameterization` is not provided, then the tangent space
is assumed to coincide with the ambient Euclidean space that the
gradient vector lives in.
The constructor takes ownership of the :class:`FirstOrderFunction` and
:class:`LocalParamterization` objects passed to it.
.. function:: void Solve(const GradientProblemSolver::Options& options, const GradientProblem& problem, double* parameters, GradientProblemSolver::Summary* summary)
Solve the given :class:`GradientProblem` using the values in
``parameters`` as the initial guess of the solution.
Solving
=======
:class:`GradientProblemSolver::Options`
---------------------------------------
.. class:: GradientProblemSolver::Options
:class:`GradientProblemSolver::Options` controls the overall
behavior of the solver. We list the various settings and their
default values below.
.. function:: bool GradientProblemSolver::Options::IsValid(string* error) const
Validate the values in the options struct and returns true on
success. If there is a problem, the method returns false with
``error`` containing a textual description of the cause.
.. member:: LineSearchDirectionType GradientProblemSolver::Options::line_search_direction_type
Default: ``LBFGS``
Choices are ``STEEPEST_DESCENT``, ``NONLINEAR_CONJUGATE_GRADIENT``,
``BFGS`` and ``LBFGS``.
.. member:: LineSearchType GradientProblemSolver::Options::line_search_type
Default: ``WOLFE``
Choices are ``ARMIJO`` and ``WOLFE`` (strong Wolfe conditions).
Note that in order for the assumptions underlying the ``BFGS`` and
``LBFGS`` line search direction algorithms to be guaranteed to be
satisifed, the ``WOLFE`` line search should be used.
.. member:: NonlinearConjugateGradientType GradientProblemSolver::Options::nonlinear_conjugate_gradient_type
Default: ``FLETCHER_REEVES``
Choices are ``FLETCHER_REEVES``, ``POLAK_RIBIERE`` and
``HESTENES_STIEFEL``.
.. member:: int GradientProblemSolver::Options::max_lbfs_rank
Default: 20
The L-BFGS hessian approximation is a low rank approximation to the
inverse of the Hessian matrix. The rank of the approximation
determines (linearly) the space and time complexity of using the
approximation. Higher the rank, the better is the quality of the
approximation. The increase in quality is however is bounded for a
number of reasons.
1. The method only uses secant information and not actual
derivatives.
2. The Hessian approximation is constrained to be positive
definite.
So increasing this rank to a large number will cost time and space
complexity without the corresponding increase in solution
quality. There are no hard and fast rules for choosing the maximum
rank. The best choice usually requires some problem specific
experimentation.
.. member:: bool GradientProblemSolver::Options::use_approximate_eigenvalue_bfgs_scaling
Default: ``false``
As part of the ``BFGS`` update step / ``LBFGS`` right-multiply
step, the initial inverse Hessian approximation is taken to be the
Identity. However, [Oren]_ showed that using instead :math:`I *
\gamma`, where :math:`\gamma` is a scalar chosen to approximate an
eigenvalue of the true inverse Hessian can result in improved
convergence in a wide variety of cases. Setting
``use_approximate_eigenvalue_bfgs_scaling`` to true enables this
scaling in ``BFGS`` (before first iteration) and ``LBFGS`` (at each
iteration).
Precisely, approximate eigenvalue scaling equates to
.. math:: \gamma = \frac{y_k' s_k}{y_k' y_k}
With:
.. math:: y_k = \nabla f_{k+1} - \nabla f_k
.. math:: s_k = x_{k+1} - x_k
Where :math:`f()` is the line search objective and :math:`x` the
vector of parameter values [NocedalWright]_.
It is important to note that approximate eigenvalue scaling does
**not** *always* improve convergence, and that it can in fact
*significantly* degrade performance for certain classes of problem,
which is why it is disabled by default. In particular it can
degrade performance when the sensitivity of the problem to different
parameters varies significantly, as in this case a single scalar
factor fails to capture this variation and detrimentally downscales
parts of the Jacobian approximation which correspond to
low-sensitivity parameters. It can also reduce the robustness of the
solution to errors in the Jacobians.
.. member:: LineSearchIterpolationType GradientProblemSolver::Options::line_search_interpolation_type
Default: ``CUBIC``
Degree of the polynomial used to approximate the objective
function. Valid values are ``BISECTION``, ``QUADRATIC`` and
``CUBIC``.
.. member:: double GradientProblemSolver::Options::min_line_search_step_size
The line search terminates if:
.. math:: \|\Delta x_k\|_\infty < \text{min_line_search_step_size}
where :math:`\|\cdot\|_\infty` refers to the max norm, and
:math:`\Delta x_k` is the step change in the parameter values at
the :math:`k`-th iteration.
.. member:: double GradientProblemSolver::Options::line_search_sufficient_function_decrease
Default: ``1e-4``
Solving the line search problem exactly is computationally
prohibitive. Fortunately, line search based optimization algorithms
can still guarantee convergence if instead of an exact solution,
the line search algorithm returns a solution which decreases the
value of the objective function sufficiently. More precisely, we
are looking for a step size s.t.
.. math:: f(\text{step_size}) \le f(0) + \text{sufficient_decrease} * [f'(0) * \text{step_size}]
This condition is known as the Armijo condition.
.. member:: double GradientProblemSolver::Options::max_line_search_step_contraction
Default: ``1e-3``
In each iteration of the line search,
.. math:: \text{new_step_size} \geq \text{max_line_search_step_contraction} * \text{step_size}
Note that by definition, for contraction:
.. math:: 0 < \text{max_step_contraction} < \text{min_step_contraction} < 1
.. member:: double GradientProblemSolver::Options::min_line_search_step_contraction
Default: ``0.6``
In each iteration of the line search,
.. math:: \text{new_step_size} \leq \text{min_line_search_step_contraction} * \text{step_size}
Note that by definition, for contraction:
.. math:: 0 < \text{max_step_contraction} < \text{min_step_contraction} < 1
.. member:: int GradientProblemSolver::Options::max_num_line_search_step_size_iterations
Default: ``20``
Maximum number of trial step size iterations during each line
search, if a step size satisfying the search conditions cannot be
found within this number of trials, the line search will stop.
As this is an 'artificial' constraint (one imposed by the user, not
the underlying math), if ``WOLFE`` line search is being used, *and*
points satisfying the Armijo sufficient (function) decrease
condition have been found during the current search (in :math:`\leq`
``max_num_line_search_step_size_iterations``). Then, the step size
with the lowest function value which satisfies the Armijo condition
will be returned as the new valid step, even though it does *not*
satisfy the strong Wolfe conditions. This behaviour protects
against early termination of the optimizer at a sub-optimal point.
.. member:: int GradientProblemSolver::Options::max_num_line_search_direction_restarts
Default: ``5``
Maximum number of restarts of the line search direction algorithm
before terminating the optimization. Restarts of the line search
direction algorithm occur when the current algorithm fails to
produce a new descent direction. This typically indicates a
numerical failure, or a breakdown in the validity of the
approximations used.
.. member:: double GradientProblemSolver::Options::line_search_sufficient_curvature_decrease
Default: ``0.9``
The strong Wolfe conditions consist of the Armijo sufficient
decrease condition, and an additional requirement that the
step size be chosen s.t. the *magnitude* ('strong' Wolfe
conditions) of the gradient along the search direction
decreases sufficiently. Precisely, this second condition
is that we seek a step size s.t.
.. math:: \|f'(\text{step_size})\| \leq \text{sufficient_curvature_decrease} * \|f'(0)\|
Where :math:`f()` is the line search objective and :math:`f'()` is the derivative
of :math:`f` with respect to the step size: :math:`\frac{d f}{d~\text{step size}}`.
.. member:: double GradientProblemSolver::Options::max_line_search_step_expansion
Default: ``10.0``
During the bracketing phase of a Wolfe line search, the step size
is increased until either a point satisfying the Wolfe conditions
is found, or an upper bound for a bracket containing a point
satisfying the conditions is found. Precisely, at each iteration
of the expansion:
.. math:: \text{new_step_size} \leq \text{max_step_expansion} * \text{step_size}
By definition for expansion
.. math:: \text{max_step_expansion} > 1.0
.. member:: int GradientProblemSolver::Options::max_num_iterations
Default: ``50``
Maximum number of iterations for which the solver should run.
.. member:: double GradientProblemSolver::Options::max_solver_time_in_seconds
Default: ``1e6``
Maximum amount of time for which the solver should run.
.. member:: double GradientProblemSolver::Options::function_tolerance
Default: ``1e-6``
Solver terminates if
.. math:: \frac{|\Delta \text{cost}|}{\text{cost}} \leq \text{function_tolerance}
where, :math:`\Delta \text{cost}` is the change in objective
function value (up or down) in the current iteration of the line search.
.. member:: double GradientProblemSolver::Options::gradient_tolerance
Default: ``1e-10``
Solver terminates if
.. math:: \|x - \Pi \boxplus(x, -g(x))\|_\infty \leq \text{gradient_tolerance}
where :math:`\|\cdot\|_\infty` refers to the max norm, :math:`\Pi`
is projection onto the bounds constraints and :math:`\boxplus` is
Plus operation for the overall local parameterization associated
with the parameter vector.
.. member:: double GradientProblemSolver::Options::parameter_tolerance
Default: ``1e-8``
Solver terminates if
.. math:: \|\Delta x\| \leq (\|x\| + \text{parameter_tolerance}) * \text{parameter_tolerance}
where :math:`\Delta x` is the step computed by the linear solver in
the current iteration of the line search.
.. member:: LoggingType GradientProblemSolver::Options::logging_type
Default: ``PER_MINIMIZER_ITERATION``
.. member:: bool GradientProblemSolver::Options::minimizer_progress_to_stdout
Default: ``false``
By default the :class:`Minimizer` progress is logged to ``STDERR``
depending on the ``vlog`` level. If this flag is set to true, and
:member:`GradientProblemSolver::Options::logging_type` is not
``SILENT``, the logging output is sent to ``STDOUT``.
The progress display looks like
.. code-block:: bash
0: f: 2.317806e+05 d: 0.00e+00 g: 3.19e-01 h: 0.00e+00 s: 0.00e+00 e: 0 it: 2.98e-02 tt: 8.50e-02
1: f: 2.312019e+05 d: 5.79e+02 g: 3.18e-01 h: 2.41e+01 s: 1.00e+00 e: 1 it: 4.54e-02 tt: 1.31e-01
2: f: 2.300462e+05 d: 1.16e+03 g: 3.17e-01 h: 4.90e+01 s: 2.54e-03 e: 1 it: 4.96e-02 tt: 1.81e-01
Here
#. ``f`` is the value of the objective function.
#. ``d`` is the change in the value of the objective function if
the step computed in this iteration is accepted.
#. ``g`` is the max norm of the gradient.
#. ``h`` is the change in the parameter vector.
#. ``s`` is the optimal step length computed by the line search.
#. ``it`` is the time take by the current iteration.
#. ``tt`` is the total time taken by the minimizer.
.. member:: vector<IterationCallback> GradientProblemSolver::Options::callbacks
Callbacks that are executed at the end of each iteration of the
:class:`Minimizer`. They are executed in the order that they are
specified in this vector. By default, parameter blocks are updated
only at the end of the optimization, i.e., when the
:class:`Minimizer` terminates. This behavior is controlled by
:member:`GradientProblemSolver::Options::update_state_every_variable`. If
the user wishes to have access to the update parameter blocks when
his/her callbacks are executed, then set
:member:`GradientProblemSolver::Options::update_state_every_iteration`
to true.
The solver does NOT take ownership of these pointers.
.. member:: bool Solver::Options::update_state_every_iteration
Default: ``false``
Normally the parameter vector is only updated when the solver
terminates. Setting this to true updates it every iteration. This
setting is useful when building an interactive application using
Ceres and using an :class:`IterationCallback`.
:class:`GradientProblemSolver::Summary`
---------------------------------------
.. class:: GradientProblemSolver::Summary
Summary of the various stages of the solver after termination.
.. function:: string GradientProblemSolver::Summary::BriefReport() const
A brief one line description of the state of the solver after
termination.
.. function:: string GradientProblemSolver::Summary::FullReport() const
A full multiline description of the state of the solver after
termination.
.. function:: bool GradientProblemSolver::Summary::IsSolutionUsable() const
Whether the solution returned by the optimization algorithm can be
relied on to be numerically sane. This will be the case if
`GradientProblemSolver::Summary:termination_type` is set to `CONVERGENCE`,
`USER_SUCCESS` or `NO_CONVERGENCE`, i.e., either the solver
converged by meeting one of the convergence tolerances or because
the user indicated that it had converged or it ran to the maximum
number of iterations or time.
.. member:: TerminationType GradientProblemSolver::Summary::termination_type
The cause of the minimizer terminating.
.. member:: string GradientProblemSolver::Summary::message
Reason why the solver terminated.
.. member:: double GradientProblemSolver::Summary::initial_cost
Cost of the problem (value of the objective function) before the
optimization.
.. member:: double GradientProblemSolver::Summary::final_cost
Cost of the problem (value of the objective function) after the
optimization.
.. member:: vector<IterationSummary> GradientProblemSolver::Summary::iterations
:class:`IterationSummary` for each minimizer iteration in order.
.. member:: int num_cost_evaluations
Number of times the cost (and not the gradient) was evaluated.
.. member:: int num_gradient_evaluations
Number of times the gradient (and the cost) were evaluated.
.. member:: double GradientProblemSolver::Summary::total_time_in_seconds
Time (in seconds) spent in the solver.
.. member:: double GradientProblemSolver::Summary::cost_evaluation_time_in_seconds
Time (in seconds) spent evaluating the cost vector.
.. member:: double GradientProblemSolver::Summary::gradient_evaluation_time_in_seconds
Time (in seconds) spent evaluating the gradient vector.
.. member:: int GradientProblemSolver::Summary::num_parameters
Number of parameters in the problem.
.. member:: int GradientProblemSolver::Summary::num_local_parameters
Dimension of the tangent space of the problem. This is different
from :member:`GradientProblemSolver::Summary::num_parameters` if a
:class:`LocalParameterization` object is used.
.. member:: LineSearchDirectionType GradientProblemSolver::Summary::line_search_direction_type
Type of line search direction used.
.. member:: LineSearchType GradientProblemSolver::Summary::line_search_type
Type of the line search algorithm used.
.. member:: LineSearchInterpolationType GradientProblemSolver::Summary::line_search_interpolation_type
When performing line search, the degree of the polynomial used to
approximate the objective function.
.. member:: NonlinearConjugateGradientType GradientProblemSolver::Summary::nonlinear_conjugate_gradient_type
If the line search direction is `NONLINEAR_CONJUGATE_GRADIENT`,
then this indicates the particular variant of non-linear conjugate
gradient used.
.. member:: int GradientProblemSolver::Summary::max_lbfgs_rank
If the type of the line search direction is `LBFGS`, then this
indicates the rank of the Hessian approximation.