What is optimized in convex relaxations for multilabel problems: connecting discrete and continuously inspired MAP inference.

In this work, we present a unified view on Markov random fields (MRFs) and recently proposed continuous tight convex relaxations for multilabel assignment in the image plane. These relaxations are far less biased toward the grid geometry than Markov random fields on grids. It turns out that the continuous methods are nonlinear extensions of the well-established local polytope MRF relaxation. In view of this result, a better understanding of these tight convex relaxations in the discrete setting is obtained. Further, a wider range of optimization methods is now applicable to find a minimizer of the tight formulation. We propose two methods to improve the efficiency of minimization. One uses a weaker, but more efficient continuously inspired approach as initialization and gradually refines the energy where it is necessary. The other one reformulates the dual energy enabling smooth approximations to be used for efficient optimization. We demonstrate the utility of our proposed minimization schemes in numerical experiments. Finally, we generalize the underlying energy formulation from isotropic metric smoothness costs to arbitrary nonmetric and orientation dependent smoothness terms.

[1]  G. Bouchitté,et al.  The calibration method for the Mumford-Shah functional and free-discontinuity problems , 2001, math/0105013.

[2]  Olga Veksler,et al.  Fast approximate energy minimization via graph cuts , 2001, Proceedings of the Seventh IEEE International Conference on Computer Vision.

[3]  Vladimir Kolmogorov,et al.  Computing geodesics and minimal surfaces via graph cuts , 2003, Proceedings Ninth IEEE International Conference on Computer Vision.

[4]  Carlo Tomasi,et al.  A Pixel Dissimilarity Measure That Is Insensitive to Image Sampling , 1998, IEEE Trans. Pattern Anal. Mach. Intell..

[5]  Hiroshi Ishikawa,et al.  Exact Optimization for Markov Random Fields with Convex Priors , 2003, IEEE Trans. Pattern Anal. Mach. Intell..

[6]  Tomás Werner,et al.  Revisiting the Linear Programming Relaxation Approach to Gibbs Energy Minimization and Weighted Constraint Satisfaction , 2010, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[7]  Heinz H. Bauschke,et al.  Fixed-Point Algorithms for Inverse Problems in Science and Engineering , 2011, Springer Optimization and Its Applications.

[8]  Christoph Schnörr,et al.  Continuous Multiclass Labeling Approaches and Algorithms , 2011, SIAM J. Imaging Sci..

[9]  Christoph Schnörr,et al.  Fast and Exact Primal-Dual Iterations for Variational Problems in Computer Vision , 2010, ECCV.

[10]  Michael I. Jordan,et al.  Graphical Models, Exponential Families, and Variational Inference , 2008, Found. Trends Mach. Learn..

[11]  D. Mumford,et al.  Optimal approximations by piecewise smooth functions and associated variational problems , 1989 .

[12]  M. Niethammer,et al.  Continuous maximal flows and Wulff shapes: Application to MRFs , 2009, 2009 IEEE Conference on Computer Vision and Pattern Recognition.

[13]  Tomás Werner,et al.  A Linear Programming Approach to Max-Sum Problem: A Review , 2007, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[14]  A. Chambolle,et al.  A convex relaxation approach for computing minimal partitions , 2009, 2009 IEEE Conference on Computer Vision and Pattern Recognition.

[15]  Daniel Cremers,et al.  A convex approach for computing minimal partitions , 2008 .

[16]  Daniel Cremers,et al.  Generalized ordering constraints for multilabel optimization , 2011, 2011 International Conference on Computer Vision.

[17]  R. Dykstra,et al.  A Method for Finding Projections onto the Intersection of Convex Sets in Hilbert Spaces , 1986 .

[18]  Tommi S. Jaakkola,et al.  Tightening LP Relaxations for MAP using Message Passing , 2008, UAI.

[19]  Martin J. Wainwright,et al.  Log-determinant relaxation for approximate inference in discrete Markov random fields , 2006, IEEE Transactions on Signal Processing.

[20]  Sigurd B. Angenent,et al.  Finsler Active Contours , 2008, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[21]  Yair Weiss,et al.  MAP Estimation, Linear Programming and Belief Propagation with Convex Free Energies , 2007, UAI.

[22]  Christoph Schnörr,et al.  A study of Nesterov's scheme for Lagrangian decomposition and MAP labeling , 2011, CVPR 2011.

[23]  Marc Pollefeys,et al.  Joint 3D Scene Reconstruction and Class Segmentation , 2013, 2013 IEEE Conference on Computer Vision and Pattern Recognition.

[24]  Nikos Komodakis,et al.  MRF Optimization via Dual Decomposition: Message-Passing Revisited , 2007, 2007 IEEE 11th International Conference on Computer Vision.

[25]  Yurii Nesterov,et al.  Smooth minimization of non-smooth functions , 2005, Math. Program..

[26]  Marc Teboulle,et al.  A Fast Iterative Shrinkage-Thresholding Algorithm for Linear Inverse Problems , 2009, SIAM J. Imaging Sci..

[27]  Dmitrij Schlesinger,et al.  Exact Solution of Permuted Submodular MinSum Problems , 2007, EMMCVPR.

[28]  J. Borwein,et al.  Convex Analysis And Nonlinear Optimization , 2000 .

[29]  Marc Pollefeys,et al.  What is optimized in tight convex relaxations for multi-label problems? , 2012, 2012 IEEE Conference on Computer Vision and Pattern Recognition.

[30]  Richard Szeliski,et al.  High-accuracy stereo depth maps using structured light , 2003, 2003 IEEE Computer Society Conference on Computer Vision and Pattern Recognition, 2003. Proceedings..

[31]  Daniel Cremers,et al.  Tight convex relaxations for vector-valued labeling problems , 2011, 2011 International Conference on Computer Vision.

[32]  S. Osher,et al.  Decomposition of images by the anisotropic Rudin‐Osher‐Fatemi model , 2004 .

[33]  Stephen Gould,et al.  Accelerated dual decomposition for MAP inference , 2010, ICML.

[34]  Antonin Chambolle,et al.  A First-Order Primal-Dual Algorithm for Convex Problems with Applications to Imaging , 2011, Journal of Mathematical Imaging and Vision.

[35]  Marc Niethammer,et al.  Globally Optimal Finsler Active Contours , 2009, DAGM-Symposium.

[36]  Tommi S. Jaakkola,et al.  Fixing Max-Product: Convergent Message Passing Algorithms for MAP LP-Relaxations , 2007, NIPS.

[37]  Jan-Michael Frahm,et al.  Fast Global Labeling for Real-Time Stereo Using Multiple Plane Sweeps , 2008, VMV.

[38]  Dimitri P. Bertsekas,et al.  On the Douglas—Rachford splitting method and the proximal point algorithm for maximal monotone operators , 1992, Math. Program..

[39]  Vladimir Kolmogorov,et al.  Convergent Tree-Reweighted Message Passing for Energy Minimization , 2006, IEEE Transactions on Pattern Analysis and Machine Intelligence.

[40]  Tommi S. Jaakkola,et al.  New Outer Bounds on the Marginal Polytope , 2007, NIPS.