/* * C library of Limited memory BFGS (L-BFGS). * * Copyright (c) 1990, Jorge Nocedal * Copyright (c) 2007-2010 Naoaki Okazaki * All rights reserved. * * Permission is hereby granted, free of charge, to any person obtaining a copy * of this software and associated documentation files (the "Software"), to deal * in the Software without restriction, including without limitation the rights * to use, copy, modify, merge, publish, distribute, sublicense, and/or sell * copies of the Software, and to permit persons to whom the Software is * furnished to do so, subject to the following conditions: * * The above copyright notice and this permission notice shall be included in * all copies or substantial portions of the Software. * * THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR * IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, * FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE * AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER * LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, * OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN * THE SOFTWARE. */ /* $Id$ */ #ifndef __LBFGS_H__ #define __LBFGS_H__ #ifdef __cplusplus extern "C" { #endif/*__cplusplus*/ /* * The default precision of floating point values is 64bit (double). */ #ifndef LBFGS_FLOAT #define LBFGS_FLOAT 64 #endif/*LBFGS_FLOAT*/ /* * Activate optimization routines for IEEE754 floating point values. */ #ifndef LBFGS_IEEE_FLOAT #define LBFGS_IEEE_FLOAT 1 #endif/*LBFGS_IEEE_FLOAT*/ #if LBFGS_FLOAT == 32 typedef float lbfgsfloatval_t; #elif LBFGS_FLOAT == 64 typedef double lbfgsfloatval_t; #else #error "libLBFGS supports single (float; LBFGS_FLOAT = 32) or double (double; LBFGS_FLOAT=64) precision only." #endif /** * \addtogroup liblbfgs_api libLBFGS API * @{ * * The libLBFGS API. */ /** * Return values of lbfgs(). * * Roughly speaking, a negative value indicates an error. */ enum { /** L-BFGS reaches convergence. */ LBFGS_SUCCESS = 0, LBFGS_CONVERGENCE = 0, LBFGS_STOP, /** The initial variables already minimize the objective function. */ LBFGS_ALREADY_MINIMIZED, /** Unknown error. */ LBFGSERR_UNKNOWNERROR = -1024, /** Logic error. */ LBFGSERR_LOGICERROR, /** Insufficient memory. */ LBFGSERR_OUTOFMEMORY, /** The minimization process has been canceled. */ LBFGSERR_CANCELED, /** Invalid number of variables specified. */ LBFGSERR_INVALID_N, /** Invalid number of variables (for SSE) specified. */ LBFGSERR_INVALID_N_SSE, /** The array x must be aligned to 16 (for SSE). */ LBFGSERR_INVALID_X_SSE, /** Invalid parameter lbfgs_parameter_t::epsilon specified. */ LBFGSERR_INVALID_EPSILON, /** Invalid parameter lbfgs_parameter_t::past specified. */ LBFGSERR_INVALID_TESTPERIOD, /** Invalid parameter lbfgs_parameter_t::delta specified. */ LBFGSERR_INVALID_DELTA, /** Invalid parameter lbfgs_parameter_t::linesearch specified. */ LBFGSERR_INVALID_LINESEARCH, /** Invalid parameter lbfgs_parameter_t::max_step specified. */ LBFGSERR_INVALID_MINSTEP, /** Invalid parameter lbfgs_parameter_t::max_step specified. */ LBFGSERR_INVALID_MAXSTEP, /** Invalid parameter lbfgs_parameter_t::ftol specified. */ LBFGSERR_INVALID_FTOL, /** Invalid parameter lbfgs_parameter_t::wolfe specified. */ LBFGSERR_INVALID_WOLFE, /** Invalid parameter lbfgs_parameter_t::gtol specified. */ LBFGSERR_INVALID_GTOL, /** Invalid parameter lbfgs_parameter_t::xtol specified. */ LBFGSERR_INVALID_XTOL, /** Invalid parameter lbfgs_parameter_t::max_linesearch specified. */ LBFGSERR_INVALID_MAXLINESEARCH, /** Invalid parameter lbfgs_parameter_t::orthantwise_c specified. */ LBFGSERR_INVALID_ORTHANTWISE, /** Invalid parameter lbfgs_parameter_t::orthantwise_start specified. */ LBFGSERR_INVALID_ORTHANTWISE_START, /** Invalid parameter lbfgs_parameter_t::orthantwise_end specified. */ LBFGSERR_INVALID_ORTHANTWISE_END, /** The line-search step went out of the interval of uncertainty. */ LBFGSERR_OUTOFINTERVAL, /** A logic error occurred; alternatively, the interval of uncertainty became too small. */ LBFGSERR_INCORRECT_TMINMAX, /** A rounding error occurred; alternatively, no line-search step satisfies the sufficient decrease and curvature conditions. */ LBFGSERR_ROUNDING_ERROR, /** The line-search step became smaller than lbfgs_parameter_t::min_step. */ LBFGSERR_MINIMUMSTEP, /** The line-search step became larger than lbfgs_parameter_t::max_step. */ LBFGSERR_MAXIMUMSTEP, /** The line-search routine reaches the maximum number of evaluations. */ LBFGSERR_MAXIMUMLINESEARCH, /** The algorithm routine reaches the maximum number of iterations. */ LBFGSERR_MAXIMUMITERATION, /** Relative width of the interval of uncertainty is at most lbfgs_parameter_t::xtol. */ LBFGSERR_WIDTHTOOSMALL, /** A logic error (negative line-search step) occurred. */ LBFGSERR_INVALIDPARAMETERS, /** The current search direction increases the objective function value. */ LBFGSERR_INCREASEGRADIENT, }; /** * Line search algorithms. */ enum { /** The default algorithm (MoreThuente method). */ LBFGS_LINESEARCH_DEFAULT = 0, /** MoreThuente method proposd by More and Thuente. */ LBFGS_LINESEARCH_MORETHUENTE = 0, /** * Backtracking method with the Armijo condition. * The backtracking method finds the step length such that it satisfies * the sufficient decrease (Armijo) condition, * - f(x + a * d) <= f(x) + lbfgs_parameter_t::ftol * a * g(x)^T d, * * where x is the current point, d is the current search direction, and * a is the step length. */ LBFGS_LINESEARCH_BACKTRACKING_ARMIJO = 1, /** The backtracking method with the defualt (regular Wolfe) condition. */ LBFGS_LINESEARCH_BACKTRACKING = 2, /** * Backtracking method with regular Wolfe condition. * The backtracking method finds the step length such that it satisfies * both the Armijo condition (LBFGS_LINESEARCH_BACKTRACKING_ARMIJO) * and the curvature condition, * - g(x + a * d)^T d >= lbfgs_parameter_t::wolfe * g(x)^T d, * * where x is the current point, d is the current search direction, and * a is the step length. */ LBFGS_LINESEARCH_BACKTRACKING_WOLFE = 2, /** * Backtracking method with strong Wolfe condition. * The backtracking method finds the step length such that it satisfies * both the Armijo condition (LBFGS_LINESEARCH_BACKTRACKING_ARMIJO) * and the following condition, * - |g(x + a * d)^T d| <= lbfgs_parameter_t::wolfe * |g(x)^T d|, * * where x is the current point, d is the current search direction, and * a is the step length. */ LBFGS_LINESEARCH_BACKTRACKING_STRONG_WOLFE = 3, }; /** * L-BFGS optimization parameters. * Call lbfgs_parameter_init() function to initialize parameters to the * default values. */ typedef struct { /** * The number of corrections to approximate the inverse hessian matrix. * The L-BFGS routine stores the computation results of previous \ref m * iterations to approximate the inverse hessian matrix of the current * iteration. This parameter controls the size of the limited memories * (corrections). The default value is \c 6. Values less than \c 3 are * not recommended. Large values will result in excessive computing time. */ int m; /** * Epsilon for convergence test. * This parameter determines the accuracy with which the solution is to * be found. A minimization terminates when * ||g|| < \ref epsilon * max(1, ||x||), * where ||.|| denotes the Euclidean (L2) norm. The default value is * \c 1e-5. */ lbfgsfloatval_t epsilon; /** * Distance for delta-based convergence test. * This parameter determines the distance, in iterations, to compute * the rate of decrease of the objective function. If the value of this * parameter is zero, the library does not perform the delta-based * convergence test. The default value is \c 0. */ int past; /** * Delta for convergence test. * This parameter determines the minimum rate of decrease of the * objective function. The library stops iterations when the * following condition is met: * (f' - f) / f < \ref delta, * where f' is the objective value of \ref past iterations ago, and f is * the objective value of the current iteration. * The default value is \c 0. */ lbfgsfloatval_t delta; /** * The maximum number of iterations. * The lbfgs() function terminates an optimization process with * ::LBFGSERR_MAXIMUMITERATION status code when the iteration count * exceedes this parameter. Setting this parameter to zero continues an * optimization process until a convergence or error. The default value * is \c 0. */ int max_iterations; /** * The line search algorithm. * This parameter specifies a line search algorithm to be used by the * L-BFGS routine. */ int linesearch; /** * The maximum number of trials for the line search. * This parameter controls the number of function and gradients evaluations * per iteration for the line search routine. The default value is \c 20. */ int max_linesearch; /** * The minimum step of the line search routine. * The default value is \c 1e-20. This value need not be modified unless * the exponents are too large for the machine being used, or unless the * problem is extremely badly scaled (in which case the exponents should * be increased). */ lbfgsfloatval_t min_step; /** * The maximum step of the line search. * The default value is \c 1e+20. This value need not be modified unless * the exponents are too large for the machine being used, or unless the * problem is extremely badly scaled (in which case the exponents should * be increased). */ lbfgsfloatval_t max_step; /** * A parameter to control the accuracy of the line search routine. * The default value is \c 1e-4. This parameter should be greater * than zero and smaller than \c 0.5. */ lbfgsfloatval_t ftol; /** * A coefficient for the Wolfe condition. * This parameter is valid only when the backtracking line-search * algorithm is used with the Wolfe condition, * ::LBFGS_LINESEARCH_BACKTRACKING_STRONG_WOLFE or * ::LBFGS_LINESEARCH_BACKTRACKING_WOLFE . * The default value is \c 0.9. This parameter should be greater * the \ref ftol parameter and smaller than \c 1.0. */ lbfgsfloatval_t wolfe; /** * A parameter to control the accuracy of the line search routine. * The default value is \c 0.9. If the function and gradient * evaluations are inexpensive with respect to the cost of the * iteration (which is sometimes the case when solving very large * problems) it may be advantageous to set this parameter to a small * value. A typical small value is \c 0.1. This parameter shuold be * greater than the \ref ftol parameter (\c 1e-4) and smaller than * \c 1.0. */ lbfgsfloatval_t gtol; /** * The machine precision for floating-point values. * This parameter must be a positive value set by a client program to * estimate the machine precision. The line search routine will terminate * with the status code (::LBFGSERR_ROUNDING_ERROR) if the relative width * of the interval of uncertainty is less than this parameter. */ lbfgsfloatval_t xtol; /** * Coeefficient for the L1 norm of variables. * This parameter should be set to zero for standard minimization * problems. Setting this parameter to a positive value activates * Orthant-Wise Limited-memory Quasi-Newton (OWL-QN) method, which * minimizes the objective function F(x) combined with the L1 norm |x| * of the variables, {F(x) + C |x|}. This parameter is the coeefficient * for the |x|, i.e., C. As the L1 norm |x| is not differentiable at * zero, the library modifies function and gradient evaluations from * a client program suitably; a client program thus have only to return * the function value F(x) and gradients G(x) as usual. The default value * is zero. */ lbfgsfloatval_t orthantwise_c; /** * Start index for computing L1 norm of the variables. * This parameter is valid only for OWL-QN method * (i.e., \ref orthantwise_c != 0). This parameter b (0 <= b < N) * specifies the index number from which the library computes the * L1 norm of the variables x, * |x| := |x_{b}| + |x_{b+1}| + ... + |x_{N}| . * In other words, variables x_1, ..., x_{b-1} are not used for * computing the L1 norm. Setting b (0 < b < N), one can protect * variables, x_1, ..., x_{b-1} (e.g., a bias term of logistic * regression) from being regularized. The default value is zero. */ int orthantwise_start; /** * End index for computing L1 norm of the variables. * This parameter is valid only for OWL-QN method * (i.e., \ref orthantwise_c != 0). This parameter e (0 < e <= N) * specifies the index number at which the library stops computing the * L1 norm of the variables x, */ int orthantwise_end; } lbfgs_parameter_t; /** * Callback interface to provide objective function and gradient evaluations. * * The lbfgs() function call this function to obtain the values of objective * function and its gradients when needed. A client program must implement * this function to evaluate the values of the objective function and its * gradients, given current values of variables. * * @param instance The user data sent for lbfgs() function by the client. * @param x The current values of variables. * @param g The gradient vector. The callback function must compute * the gradient values for the current variables. * @param n The number of variables. * @param step The current step of the line search routine. * @retval lbfgsfloatval_t The value of the objective function for the current * variables. */ typedef lbfgsfloatval_t (*lbfgs_evaluate_t)( void *instance, const lbfgsfloatval_t *x, lbfgsfloatval_t *g, const int n, const lbfgsfloatval_t step ); /** * Callback interface to receive the progress of the optimization process. * * The lbfgs() function call this function for each iteration. Implementing * this function, a client program can store or display the current progress * of the optimization process. * * @param instance The user data sent for lbfgs() function by the client. * @param x The current values of variables. * @param g The current gradient values of variables. * @param fx The current value of the objective function. * @param xnorm The Euclidean norm of the variables. * @param gnorm The Euclidean norm of the gradients. * @param step The line-search step used for this iteration. * @param n The number of variables. * @param k The iteration count. * @param ls The number of evaluations called for this iteration. * @retval int Zero to continue the optimization process. Returning a * non-zero value will cancel the optimization process. */ typedef int (*lbfgs_progress_t)( void *instance, const lbfgsfloatval_t *x, const lbfgsfloatval_t *g, const lbfgsfloatval_t fx, const lbfgsfloatval_t xnorm, const lbfgsfloatval_t gnorm, const lbfgsfloatval_t step, int n, int k, int ls ); /* A user must implement a function compatible with ::lbfgs_evaluate_t (evaluation callback) and pass the pointer to the callback function to lbfgs() arguments. Similarly, a user can implement a function compatible with ::lbfgs_progress_t (progress callback) to obtain the current progress (e.g., variables, function value, ||G||, etc) and to cancel the iteration process if necessary. Implementation of a progress callback is optional: a user can pass \c NULL if progress notification is not necessary. In addition, a user must preserve two requirements: - The number of variables must be multiples of 16 (this is not 4). - The memory block of variable array ::x must be aligned to 16. This algorithm terminates an optimization when: ||G|| < \epsilon \cdot \max(1, ||x||) . In this formula, ||.|| denotes the Euclidean norm. */ /** * Start a L-BFGS optimization. * * @param n The number of variables. * @param x The array of variables. A client program can set * default values for the optimization and receive the * optimization result through this array. This array * must be allocated by ::lbfgs_malloc function * for libLBFGS built with SSE/SSE2 optimization routine * enabled. The library built without SSE/SSE2 * optimization does not have such a requirement. * @param ptr_fx The pointer to the variable that receives the final * value of the objective function for the variables. * This argument can be set to \c NULL if the final * value of the objective function is unnecessary. * @param proc_evaluate The callback function to provide function and * gradient evaluations given a current values of * variables. A client program must implement a * callback function compatible with \ref * lbfgs_evaluate_t and pass the pointer to the * callback function. * @param proc_progress The callback function to receive the progress * (the number of iterations, the current value of * the objective function) of the minimization * process. This argument can be set to \c NULL if * a progress report is unnecessary. * @param instance A user data for the client program. The callback * functions will receive the value of this argument. * @param param The pointer to a structure representing parameters for * L-BFGS optimization. A client program can set this * parameter to \c NULL to use the default parameters. * Call lbfgs_parameter_init() function to fill a * structure with the default values. * @retval int The status code. This function returns zero if the * minimization process terminates without an error. A * non-zero value indicates an error. */ int lbfgs( int n, lbfgsfloatval_t *x, lbfgsfloatval_t *ptr_fx, lbfgs_evaluate_t proc_evaluate, lbfgs_progress_t proc_progress, void *instance, lbfgs_parameter_t *param ); /** * Initialize L-BFGS parameters to the default values. * * Call this function to fill a parameter structure with the default values * and overwrite parameter values if necessary. * * @param param The pointer to the parameter structure. */ void lbfgs_parameter_init(lbfgs_parameter_t *param); /** * Allocate an array for variables. * * This function allocates an array of variables for the convenience of * ::lbfgs function; the function has a requreiemt for a variable array * when libLBFGS is built with SSE/SSE2 optimization routines. A user does * not have to use this function for libLBFGS built without SSE/SSE2 * optimization. * * @param n The number of variables. */ lbfgsfloatval_t* lbfgs_malloc(int n); /** * Free an array of variables. * * @param x The array of variables allocated by ::lbfgs_malloc * function. */ void lbfgs_free(lbfgsfloatval_t *x); /** @} */ #ifdef __cplusplus } #endif/*__cplusplus*/ /** @mainpage libLBFGS: a library of Limited-memory Broyden-Fletcher-Goldfarb-Shanno (L-BFGS) @section intro Introduction This library is a C port of the implementation of Limited-memory Broyden-Fletcher-Goldfarb-Shanno (L-BFGS) method written by Jorge Nocedal. The original FORTRAN source code is available at: http://www.ece.northwestern.edu/~nocedal/lbfgs.html The L-BFGS method solves the unconstrainted minimization problem,
minimize F(x), x = (x1, x2, ..., xN),only if the objective function F(x) and its gradient G(x) are computable. The well-known Newton's method requires computation of the inverse of the hessian matrix of the objective function. However, the computational cost for the inverse hessian matrix is expensive especially when the objective function takes a large number of variables. The L-BFGS method iteratively finds a minimizer by approximating the inverse hessian matrix by information from last m iterations. This innovation saves the memory storage and computational time drastically for large-scaled problems. Among the various ports of L-BFGS, this library provides several features: - Optimization with L1-norm (Orthant-Wise Limited-memory Quasi-Newton (OWL-QN) method): In addition to standard minimization problems, the library can minimize a function F(x) combined with L1-norm |x| of the variables, {F(x) + C |x|}, where C is a constant scalar parameter. This feature is useful for estimating parameters of sparse log-linear models (e.g., logistic regression and maximum entropy) with L1-regularization (or Laplacian prior). - Clean C code: Unlike C codes generated automatically by f2c (Fortran 77 into C converter), this port includes changes based on my interpretations, improvements, optimizations, and clean-ups so that the ported code would be well-suited for a C code. In addition to comments inherited from the original code, a number of comments were added through my interpretations. - Callback interface: The library receives function and gradient values via a callback interface. The library also notifies the progress of the optimization by invoking a callback function. In the original implementation, a user had to set function and gradient values every time the function returns for obtaining updated values. - Thread safe: The library is thread-safe, which is the secondary gain from the callback interface. - Cross platform. The source code can be compiled on Microsoft Visual Studio 2010, GNU C Compiler (gcc), etc. - Configurable precision: A user can choose single-precision (float) or double-precision (double) accuracy by changing ::LBFGS_FLOAT macro. - SSE/SSE2 optimization: This library includes SSE/SSE2 optimization (written in compiler intrinsics) for vector arithmetic operations on Intel/AMD processors. The library uses SSE for float values and SSE2 for double values. The SSE/SSE2 optimization routine is disabled by default. This library is used by: - CRFsuite: A fast implementation of Conditional Random Fields (CRFs) - Classias: A collection of machine-learning algorithms for classification - mlegp: an R package for maximum likelihood estimates for Gaussian processes - imaging2: the imaging2 class library - Algorithm::LBFGS - Perl extension for L-BFGS - YAP-LBFGS (an interface to call libLBFGS from YAP Prolog) @section download Download - Source code - GitHub repository libLBFGS is distributed under the term of the MIT license. @section changelog History - Version 1.10 (2010-12-22): - Fixed compiling errors on Mac OS X; this patch was kindly submitted by Nic Schraudolph. - Reduced compiling warnings on Mac OS X; this patch was kindly submitted by Tamas Nepusz. - Replaced memalign() with posix_memalign(). - Updated solution and project files for Microsoft Visual Studio 2010. - Version 1.9 (2010-01-29): - Fixed a mistake in checking the validity of the parameters "ftol" and "wolfe"; this was discovered by Kevin S. Van Horn. - Version 1.8 (2009-07-13): - Accepted the patch submitted by Takashi Imamichi; the backtracking method now has three criteria for choosing the step length: - ::LBFGS_LINESEARCH_BACKTRACKING_ARMIJO: sufficient decrease (Armijo) condition only - ::LBFGS_LINESEARCH_BACKTRACKING_WOLFE: regular Wolfe condition (sufficient decrease condition + curvature condition) - ::LBFGS_LINESEARCH_BACKTRACKING_STRONG_WOLFE: strong Wolfe condition - Updated the documentation to explain the above three criteria. - Version 1.7 (2009-02-28): - Improved OWL-QN routines for stability. - Removed the support of OWL-QN method in MoreThuente algorithm because it accidentally fails in early stages of iterations for some objectives. Because of this change, the OW-LQN method must be used with the backtracking algorithm (::LBFGS_LINESEARCH_BACKTRACKING), or the library returns ::LBFGSERR_INVALID_LINESEARCH. - Renamed line search algorithms as follows: - ::LBFGS_LINESEARCH_BACKTRACKING: regular Wolfe condition. - ::LBFGS_LINESEARCH_BACKTRACKING_LOOSE: regular Wolfe condition. - ::LBFGS_LINESEARCH_BACKTRACKING_STRONG: strong Wolfe condition. - Source code clean-up. - Version 1.6 (2008-11-02): - Improved line-search algorithm with strong Wolfe condition, which was contributed by Takashi Imamichi. This routine is now default for ::LBFGS_LINESEARCH_BACKTRACKING. The previous line search algorithm with regular Wolfe condition is still available as ::LBFGS_LINESEARCH_BACKTRACKING_LOOSE. - Configurable stop index for L1-norm computation. A member variable ::lbfgs_parameter_t::orthantwise_end was added to specify the index number at which the library stops computing the L1 norm of the variables. This is useful to prevent some variables from being regularized by the OW-LQN method. - A sample program written in C++ (sample/sample.cpp). - Version 1.5 (2008-07-10): - Configurable starting index for L1-norm computation. A member variable ::lbfgs_parameter_t::orthantwise_start was added to specify the index number from which the library computes the L1 norm of the variables. This is useful to prevent some variables from being regularized by the OWL-QN method. - Fixed a zero-division error when the initial variables have already been a minimizer (reported by Takashi Imamichi). In this case, the library returns ::LBFGS_ALREADY_MINIMIZED status code. - Defined ::LBFGS_SUCCESS status code as zero; removed unused constants, LBFGSFALSE and LBFGSTRUE. - Fixed a compile error in an implicit down-cast. - Version 1.4 (2008-04-25): - Configurable line search algorithms. A member variable ::lbfgs_parameter_t::linesearch was added to choose either MoreThuente method (::LBFGS_LINESEARCH_MORETHUENTE) or backtracking algorithm (::LBFGS_LINESEARCH_BACKTRACKING). - Fixed a bug: the previous version did not compute psuedo-gradients properly in the line search routines for OWL-QN. This bug might quit an iteration process too early when the OWL-QN routine was activated (0 < ::lbfgs_parameter_t::orthantwise_c). - Configure script for POSIX environments. - SSE/SSE2 optimizations with GCC. - New functions ::lbfgs_malloc and ::lbfgs_free to use SSE/SSE2 routines transparently. It is uncessary to use these functions for libLBFGS built without SSE/SSE2 routines; you can still use any memory allocators if SSE/SSE2 routines are disabled in libLBFGS. - Version 1.3 (2007-12-16): - An API change. An argument was added to lbfgs() function to receive the final value of the objective function. This argument can be set to \c NULL if the final value is unnecessary. - Fixed a null-pointer bug in the sample code (reported by Takashi Imamichi). - Added build scripts for Microsoft Visual Studio 2005 and GCC. - Added README file. - Version 1.2 (2007-12-13): - Fixed a serious bug in orthant-wise L-BFGS. An important variable was used without initialization. - Version 1.1 (2007-12-01): - Implemented orthant-wise L-BFGS. - Implemented lbfgs_parameter_init() function. - Fixed several bugs. - API documentation. - Version 1.0 (2007-09-20): - Initial release. @section api Documentation - @ref liblbfgs_api "libLBFGS API" @section sample Sample code @include sample.c @section ack Acknowledgements The L-BFGS algorithm is described in: - Jorge Nocedal. Updating Quasi-Newton Matrices with Limited Storage. Mathematics of Computation, Vol. 35, No. 151, pp. 773--782, 1980. - Dong C. Liu and Jorge Nocedal. On the limited memory BFGS method for large scale optimization. Mathematical Programming B, Vol. 45, No. 3, pp. 503-528, 1989. The line search algorithms used in this implementation are described in: - John E. Dennis and Robert B. Schnabel. Numerical Methods for Unconstrained Optimization and Nonlinear Equations, Englewood Cliffs, 1983. - Jorge J. More and David J. Thuente. Line search algorithm with guaranteed sufficient decrease. ACM Transactions on Mathematical Software (TOMS), Vol. 20, No. 3, pp. 286-307, 1994. This library also implements Orthant-Wise Limited-memory Quasi-Newton (OWL-QN) method presented in: - Galen Andrew and Jianfeng Gao. Scalable training of L1-regularized log-linear models. In Proceedings of the 24th International Conference on Machine Learning (ICML 2007), pp. 33-40, 2007. Special thanks go to: - Yoshimasa Tsuruoka and Daisuke Okanohara for technical information about OWL-QN - Takashi Imamichi for the useful enhancements of the backtracking method - Kevin S. Van Horn, Nic Schraudolph, and Tamas Nepusz for bug fixes Finally I would like to thank the original author, Jorge Nocedal, who has been distributing the effieicnt and explanatory implementation in an open source licence. @section reference Reference - L-BFGS by Jorge Nocedal. - Orthant-Wise Limited-memory Quasi-Newton Optimizer for L1-regularized Objectives by Galen Andrew. - C port (via f2c) by Taku Kudo. - C#/C++/Delphi/VisualBasic6 port in ALGLIB. - Computational Crystallography Toolbox includes scitbx::lbfgs. */ #endif/*__LBFGS_H__*/