Title :
Smooth Approximation of L_infinity-Norm for Multi-view Geometry
Author :
Dai, Yuchao ; Li, Hongdong ; He, Mingyi ; Shen, Chunhua
Author_Institution :
Shaanxi Key Lab. of Inf. Acquisition & Process., Northwestern Polytech. Univ., China
Abstract :
Recently the L∞-norm optimization has been introduced to multi-view geometry to achieve global optimality. It is solved through solving a sequence of SOCP (second order cone programming) feasibility problems which needs sophisticated solvers and time consuming. This paper presents an efficient smooth approximation of L∞-norm optimization in multi-view geometry using log-sum-exp functions. We have proven that the proposed approximation is pseudo-convex with the property of uniform convergence. This allows us to solve the problem using gradient based algorithms such as gradient descent to overcome the non-differentiable property of L∞ norm. Experiments on both synthetic and real image sequence have shown that the proposed algorithm achieves high precision and also significantly speeds up the implementation.
Keywords :
geometry; gradient methods; image sequences; optimisation; L∞-norm optimization; gradient based algorithms; log-sum-exp functions; multiview geometry; nondifferentiable property; pseudo-convex approximation; real image sequence; second order cone programming; smooth approximation; synthetic image sequence; uniform convergence; Cameras; Computational geometry; Computer vision; Image sequences; Information geometry; Iterative methods; Minimax techniques; Newton method; Polynomials; Testing; $L_infty$ norm; log-sum-exp; smooth approximation;
Conference_Titel :
Digital Image Computing: Techniques and Applications, 2009. DICTA '09.
Conference_Location :
Melbourne, VIC
Print_ISBN :
978-1-4244-5297-2
Electronic_ISBN :
978-0-7695-3866-2
DOI :
10.1109/DICTA.2009.64
