Schrodinger Equation 数值计算中的方程
标签: Schrodinger Equation 数值计算 方程
上传时间: 2015-07-02
上传用户:彭玖华
This paper introduces an affine invariant of trapezia, and the explicit constraint Equation between the intrinsic matrix of a camera and the similarity invariants of a trapezium are established using the affine invariant. By this constraint, the inner parameters, motion parameters of the cameras and the similarity invariants of trapezia can be linearly determined using some prior knowledge on the cameras or the trapezia. The proposed algorithms have wide applicability since parallel lines are not rare in many scenes. Experimental results validate the proposed approaches. This work presents a unifying framework based on the parallelism constraint, and the previous methods based on the parallelograms or the parallelepipeds can be integrated into this framework. Key words: invariant parallelism constraint camera calibration 3D reconstruction
标签: introduces constraint invariant explicit
上传时间: 2014-01-16
上传用户:6546544
Ordinary and Partial Differential Equation Routines in C, C++, Fortran, Java, Maple, and MATLAB
标签: Differential and Ordinary Equation
上传时间: 2013-12-25
上传用户:pompey
Ordinary and Partial Differential Equation Routines in C, C++, Fortran, Java, Maple, and MATLAB
标签: Differential and Ordinary Equation
上传时间: 2013-11-30
上传用户:懒龙1988
Ordinary and Partial Differential Equation Routines in C, C++, Fortran, Java, Maple, and MATLAB
标签: Differential and Ordinary Equation
上传时间: 2013-12-06
上传用户:JasonC
Ordinary and Partial Differential Equation Routines in C, C++, Fortran, Java, Maple, and MATLAB
标签: Differential and Ordinary Equation
上传时间: 2015-11-28
上传用户:远远ssad
Ordinary and Partial Differential Equation Routines in C, C++, Fortran, Java, Maple, and MATLAB
标签: Differential and Ordinary Equation
上传时间: 2015-11-28
上传用户:youke111
Ordinary and Partial Differential Equation Routines in C, C++, Fortran, Java, Maple, and MATLAB
标签: Differential and Ordinary Equation
上传时间: 2015-11-28
上传用户:zhangzhenyu
The Equation is written as a system of two first order ODEs. These are evaluated for different values of the parameter Mu. For faster integration, we choose an appropriate solver based on the value of the parameter Mu.
标签: different evaluated Equation written
上传时间: 2013-12-25
上传用户:qazxsw
Ground state of the time-independent Gross-Pitaevskii Equation
标签: Gross-Pitaevskii time-independent Equation Ground
上传时间: 2014-01-04
上传用户:13215175592
