Litcius/Paper detail

Solving Jigsaw Puzzles by the Graph Connection Laplacian

Vahan Huroyan, Gilad Lerman, Hau-Tieng Wu

2020SIAM Journal on Imaging Sciences24 citationsDOIOpen Access PDF

Abstract

We propose a novel mathematical framework to address the problem of automatically solving large jigsaw puzzles. This problem assumes a large image, which is cut into equal square pieces that are arbitrarily rotated and shuffled, and asks to recover the original image given the transformed pieces. The main contribution of this work is a method for recovering the rotations of the pieces when both shuffles and rotations are unknown. A major challenge of this procedure is estimating the graph connection Laplacian without the knowledge of shuffles. A careful combination of our proposed method for estimating rotations with any existing method for estimating shuffles results in a practical solution for the jigsaw puzzle problem. Our theory guarantees, in a clean setting, that our basic idea of recovering rotations is robust to some corruption of the connection graph. Numerical experiments demonstrate the competitive accuracy of this solution, its robustness to corruption, and its computational advantage for large puzzles. © 2020 Society for Industrial and Applied Mathematics.

Topics & Concepts

JigsawConnection (principal bundle)Robustness (evolution)Laplace operatorLaplacian matrixGraphMathematicsComputer scienceAlgorithmTheoretical computer scienceGraph theoryMathematical optimizationDirected graphExistential quantificationRotation (mathematics)Image Processing and 3D ReconstructionImage and Object Detection Techniques3D Shape Modeling and Analysis