04-04-2014

  • New paper accepted in CIP 2014

    Authors: Pantelis Bouboulis, G. Papageorgiou, S. Theodoridis

    Title: Robust Image Denoising in RKHS via Orthogonal Matching Pursuit

    We present a robust method for the image denoising task based on kernel ridge regression and sparse modeling. Added noise is assumed to consist of two parts. One part is impulse noise assumed to be sparse (outliers), while the other part is bounded noise. The noisy image is divided into small regions of interest, whose pixels are regarded as points of a two-dimensional surface. A kernel based ridge regression method, whose parameters are selected adaptively, is employed to fit the data, whereas the outliers are detected via the use of the increasingly popular orthogonal matching pursuit (OMP) algorithm. To this end, a new variant of the OMP rationale is employed that has the additional advantage to automatically terminate, when all outliers have been selected.

15-02-2011

  • New paper accepted in Elsevier's Computational and Applied Mathematics

    Authors: Pantelis Bouboulis, M. Mavroforakis

    Title: Reproducing Kernel Hilbert Spaces and Fractal Interpolation

    Finally, this paper has been accepted. This is the first time that fractals are used to construct kernels. Myself and Dr. Mavroforakis hope that this work will pave the road for applying fractal-based kernels in many real problems.

16-11-2010

  • New paper accepted in IEEE Transactions on Signal Processing

    Authors: Pantelis Bouboulis, Sergios Theodoridis

    Title: Extension of Wirtinger?s Calculus to Reproducing Kernel Hilbert Spaces and the Complex Kernel LMS

    I was notified that my paper "Extension of Wirtinger?s Calculus to Reproducing Kernel Hilbert Spaces and the Complex Kernel LMS" has been accepted for publication in the March or April 2011 issue of the IEEE Transactions on Signal Processing. You may find the preprint version at Arxiv. If you are interested in Wirtinger's Calculus you may find useful my detailed notes on the subject.

26-07-2010

  • ICPR 2010 Best paper award

    Authors: Pantelis Bouboulis, K. Slavakis, Sergios Theodoridis Title: Edge Preserving Image Denoising in Reproducing kernel Hilbert Spaces

    This work has been selected for the Best Scientific Paper Award (Track III: Signal, Speech, Image and Video Processing) click here for details.

29-06-2010

  • New paper accepted in the 20th International Conference on Artificial Neural Networks (ICANN 2010)

    Authors: Pantelis Bouboulis, Sergios Theodoridis

    Title: The Complex Gaussian Kernel and the Complex Kernel LMS algorithm

28-05-2010

  • New paper accepted in the Machine Learning for Signal Processing 2010 (MLSP 2010) Conference

    Authors: Pantelis Bouboulis, Sergios Theodoridis

    Title: Extension of Wirtinger Calculus in RKH spaces and the Complex Kernel LMS

25-05-2010

  • New paper published in the IEEE Transactions On Image Processing.

    Authors: Pantelis Bouboulis, K. Slavakis, Sergios Theodoridis

    Title: Adaptive Kernel-based Image Denoising employing Semi-Parametric Regularization

    You can read a preprint version of the manuscript at the publications section. Below, you can read the abstract.

    Abstract: The main contribution of this paper is the development of a novel approach, based on the theory of Reproducing Kernel Hilbert Spaces (RKHS), for the problem of Noise Removal in the spatial domain. The proposed methodology has the advantage that it is able to remove any kind of additive noise (impulse, gaussian, uniform, e.t.c.) from any digital image, in contrast to the most commonly used denoising techniques, which are noise-dependent. The problem is cast as an optimization task in a RKHS, by taking advantage of the celebrated Representer Theorem in its semi-parametric formulation. The semiparametric formulation, although known in theory, has so far found limited, to our knowledge, application. However, in the image denoising problem its use is dictated by the nature of the problem itself. The need for edge preservation naturally leads to such a modeling. Examples verify that in the presence of gaussian noise the proposed methodology performs well compared to wavelet based technics and outperforms them significantly in the presence of impulse or mixed noise.

08-04-2010

  • New paper accepted in the ICPR 2010 conference

    Authors: Pantelis Bouboulis, K. Slavakis, Sergios Theodoridis Title: Edge Preserving Image Denoising in Reproducing kernel Hilbert Spaces

    This is a presentation of the article that will be published in the IEEE Transactions of Image Processing with title "Adaptive Kernel-based Image Denoising employing Semi-Parametric Regularization".

15-01-2010

  • New paper accepted in the IEEE Transactions of Image Processing

    Today I received the letter of acceptance for this manuscript.

    Title: Adaptive Kernel-based Image Denoising employing Semi-Parametric Regularization.

12-01-2010

  • New paper published by the Journal of Mathematical Sciences: Advances and Applications

    Title: Modeling Discrete Sequences with Fractal interpolation Functions of higher order

    Abstract: A new construction of fractal interpolation surfaces, using solutions of partial differential equations, is presented. We consider a set of interpolation points placed on a rectangular grid and a specific PDE, such that its Dirichlet's problem is uniquely solvable inside any given orthogonal region. We solve the PDE, using numerical methods, for a number of regions, to construct two functions H and B, which are then used to produce the fractal surface, as the attractor of an appropriately chosen recurrent iterated function system.

08-01-2010

  • New paper published by SRX Mathematics

    SRX Mathematics is a relatively new open access journal. Visit its web site here.

    Title: Construction of Fractal surfaces via solutions of Partial Differential Equations

    Abstract: A new construction of fractal interpolation surfaces, using solutions of partial differential equations, is presented. We consider a set of interpolation points placed on a rectangular grid and a specific PDE, such that its Dirichlet's problem is uniquely solvable inside any given orthogonal region. We solve the PDE, using numerical methods, for a number of regions, to construct two functions H and B, which are then used to produce the fractal surface, as the attractor of an appropriately chosen recurrent iterated function system.