Technique for two-dimensional displacement field determination using a reliability-guided spatial-gradient-based digital image correlation algorithm.

This paper proposed a novel in-plane displacement field measurement algorithm using an optical flow strategy. We built a linear illumination model between images before and after deformation to guarantee intensity invariability. We used image upsampling and a reliability-guided strategy to find the matching points accurate to 0.5 pixels in the reference and deformed images. The criterion to determine the reliability is zero-mean normalized cross-correlation coefficient. Afterward, we used the brightness constancy constraint combined with Lucas-Kanade optical flow constraint in a specific image region to obtain an overdetermined linear equation. We applied the noniterative least-squares algorithm to solve the equations and to achieve the displacement offsets. This research utilized multithread calculation to handle the complete cracking applications. We estimated the computing efficiency and calculation precision of the proposed method through a series of experimental speckle patterns. All results demonstrated the correctness, effectiveness, and robustness of the proposed method.

[1]  D. M. Freeman,et al.  Statistics of subpixel registration algorithms based on spatiotemporal gradients or block matching , 1998 .

[2]  Jun Zhang,et al.  Application of an improved subpixel registration algorithm on digital speckle correlation measurement , 2003 .

[3]  Yaofeng Sun,et al.  Finite element formulation for a digital image correlation method. , 2005, Applied optics.

[4]  Wei Tong,et al.  Fast, Robust and Accurate Digital Image Correlation Calculation Without Redundant Computations , 2013, Experimental Mechanics.

[5]  Fabien Hubert,et al.  Measurement of the elastic properties of swelling clay minerals using the digital image correlation method on a single macroscopic crystal , 2015 .

[6]  A. Asundi,et al.  Digital image correlation using iterative least squares and pointwise least squares for displacement field and strain field measurements , 2009 .

[7]  Shaopeng Ma,et al.  Mesh-based digital image correlation method using higher order isoparametric elements , 2012 .

[8]  Pengwan Chen,et al.  Determining thermal and mechanical properties of polyimide using the DIC method , 2008, International Conference on Experimental Mechanics.

[9]  R. Lewis,et al.  Skin surface and sub-surface strain and deformation imaging using optical coherence tomography and digital image correlation , 2016, SPIE BiOS.

[10]  Bing Pan,et al.  Comparison of Subset-Based Local and Finite Element-Based Global Digital Image Correlation , 2015 .

[11]  Xue-Rong Yao,et al.  Application of iteration and finite element smoothing technique for displacement and strain measurement of digital speckle correlation , 2007 .

[12]  Anand Asundi,et al.  Two-dimensional digital image correlation for in-plane displacement and strain measurement: a review , 2009 .

[13]  Peng Cheng,et al.  In-plane displacements measurement by gradient-based digital image correlation , 2005, International Conference on Experimental Mechanics.

[14]  Hugh Alan Bruck,et al.  Digital image correlation using Newton-Raphson method of partial differential correction , 1989 .

[15]  ChingSeong Tan,et al.  A Review of Surface Deformation and Strain Measurement Using Two-Dimensional Digital Image Correlation , 2016 .

[16]  Simon Baker,et al.  Lucas-Kanade 20 Years On: A Unifying Framework , 2004, International Journal of Computer Vision.

[17]  Jianwen Luo,et al.  A fast normalized cross-correlation calculation method for motion estimation , 2010, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[18]  Ran Tao,et al.  Accurate kinematic measurement at interfaces between dissimilar materials using conforming finite-element-based digital image correlation , 2016 .

[19]  Bing Pan,et al.  Some practical considerations in finite element-based digital image correlation , 2015 .

[20]  Justin A. Blaber,et al.  Ncorr: Open-Source 2D Digital Image Correlation Matlab Software , 2015, Experimental Mechanics.

[21]  Jian Zhong PAN,et al.  Stable homotopy classification of An4-polyhedra with 2- torsion free homology , 2015, 1509.07932.

[22]  Chih-Hung Chiang,et al.  Displacement measurements of highway bridges using digital image correlation methods , 2011, International Symposium on Precision Engineering Measurement and Instrumentation.

[23]  Dimitri Debruyne,et al.  Full-field optical deformation measurement in biomechanics: digital speckle pattern interferometry and 3D digital image correlation applied to bird beaks. , 2012, Journal of the mechanical behavior of biomedical materials.

[24]  Bing Pan,et al.  Reliability-guided digital image correlation for image deformation measurement. , 2009, Applied optics.

[25]  Fanxiu Chen,et al.  Mechanical analysis and force chain determination in granular materials using digital image correlation. , 2016, Applied optics.

[26]  G. Gao,et al.  Application of Digital Image Correlation (DIC) in Dynamic Notched Semi-Circular Bend (NSCB) Tests , 2015 .

[27]  G. Vendroux,et al.  Submicron deformation field measurements: Part 2. Improved digital image correlation , 1998 .

[28]  Xiaoyuan He,et al.  Real-time 3D digital image correlation method and its application in human pulse monitoring. , 2016, Applied optics.

[29]  Peng Zhou,et al.  Subpixel displacement and deformation gradient measurement using digital image/speckle correlation (DISC) , 2001 .