In this paper a quasi-Newton projection method for image deblurring is presented. The image restoration problem is mathematically formulated as a nonnegatively constrained minimization problem where the objective function is the sum of the Kullback–Leibler divergence, used to express fidelity to the data in the presence of Poisson noise, and of a Tikhonov regularization term. The Hessian of the objective function is approximated so that the Newton system can be efficiently solved by using Fast Fourier Transforms. The numerical results show the potential of the proposed method both in terms of relative error reduction and computational efficiency.
G. Landi, E. Loli Piccolomini (2012). An improved Newton projection method for nonnegative deblurring of Poisson-corrupted images with Tikhonov regularization. NUMERICAL ALGORITHMS, 60(1), 169-188 [10.1007/s11075-011-9517-y].
An improved Newton projection method for nonnegative deblurring of Poisson-corrupted images with Tikhonov regularization
LANDI, GERMANA;LOLI PICCOLOMINI, ELENA
2012
Abstract
In this paper a quasi-Newton projection method for image deblurring is presented. The image restoration problem is mathematically formulated as a nonnegatively constrained minimization problem where the objective function is the sum of the Kullback–Leibler divergence, used to express fidelity to the data in the presence of Poisson noise, and of a Tikhonov regularization term. The Hessian of the objective function is approximated so that the Newton system can be efficiently solved by using Fast Fourier Transforms. The numerical results show the potential of the proposed method both in terms of relative error reduction and computational efficiency.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.