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@InProceedings{LewinerVBCMPCLANBPLMPM:2010:TuMaHa,
               author = "Lewiner, Thomas and Vieira, Thales and Bordignon, Alex and Cabral, 
                         Allyson and Marques, Clarissa and Paix{\~a}o, Jo{\~a}o and 
                         Cust{\'o}dio, Lis and Lage, Marcos and Andrade, Maria and 
                         Nascimento, Renata and de Botton, Scarlett and Pesco, Sin{\'e}sio 
                         and Lopes, H{\'e}lio and Mello, Vin{\'{\i}}cius and Peixoto, 
                         Adelailson and Martines, Dimas",
          affiliation = "Matm{\'{\i}}dia Laboratory – Department of Mathematics, PUC–Rio 
                         – Rio de Janeiro, Brazil and Department of Mathematics, UFAL – 
                         Macei{\'o}, Brazil and Matm{\'{\i}}dia Laboratory – Department 
                         of Mathematics, PUC–Rio – Rio de Janeiro, Brazil and 
                         Matm{\'{\i}}dia Laboratory – Department of Mathematics, PUC–Rio 
                         – Rio de Janeiro, Brazil and Matm{\'{\i}}dia Laboratory – 
                         Department of Mathematics, PUC–Rio – Rio de Janeiro, Brazil and 
                         Matm{\'{\i}}dia Laboratory – Department of Mathematics, PUC–Rio 
                         – Rio de Janeiro, Brazil and Matm{\'{\i}}dia Laboratory – 
                         Department of Mathematics, PUC–Rio – Rio de Janeiro, Brazil and 
                         Matm{\'{\i}}dia Laboratory – Department of Mathematics, PUC–Rio 
                         – Rio de Janeiro, Brazil and Matm{\'{\i}}dia Laboratory – 
                         Department of Mathematics, PUC–Rio – Rio de Janeiro, Brazil and 
                         Matm{\'{\i}}dia Laboratory – Department of Mathematics, PUC–Rio 
                         – Rio de Janeiro, Brazil and Matm{\'{\i}}dia Laboratory – 
                         Department of Mathematics, PUC–Rio – Rio de Janeiro, Brazil and 
                         Matm{\'{\i}}dia Laboratory – Department of Mathematics, PUC–Rio 
                         – Rio de Janeiro, Brazil and Matm{\'{\i}}dia Laboratory – 
                         Department of Mathematics, PUC–Rio – Rio de Janeiro, Brazil and 
                         Department of Mathematics, UFBA – Salvador, Brazil and Department 
                         of Mathematics, UFAL – Macei{\'o}, Brazil and Department of 
                         Mathematics, UFAL – Macei{\'o}, Brazil",
                title = "Tuning Manifold Harmonics Filters",
            booktitle = "Proceedings...",
                 year = "2010",
               editor = "Bellon, Olga and Esperan{\c{c}}a, Claudio",
         organization = "Conference on Graphics, Patterns and Images, 23. (SIBGRAPI)",
            publisher = "IEEE Computer Society",
              address = "Los Alamitos",
             keywords = "manifold harmonics, sound visualization, geometry processing, GPU, 
                         design galleries.",
             abstract = "There are several techniques for automatic music visualization, 
                         which are included with virtually any media player. The basic 
                         ingredient of those techniques is spectral analysis of the sound, 
                         used to automatically generate parameters for procedural image 
                         generation. However, only a few music visualizations rely on 3d 
                         models. This paper proposes to use spectral mesh processing 
                         techniques, namely manifold harmonics, to produce 3d music 
                         visualization. The images are generated from 3d models by 
                         deforming an initial shape, mapping the sound frequencies to the 
                         mesh harmonics. A concise representation of such frequency mapping 
                         is proposed to permit for an animated gallery interface with 
                         genetic reproduction. Such galleries allow the user to quickly 
                         navigate between visual effects. Rendering such animated galleries 
                         in real-time is a challenging task, since it requires computing 
                         and rendering the deformed shapes at a very high rate. This paper 
                         introduces a direct GPU implementation of manifold harmonics 
                         filters, which allows to display animated gallery. .",
  conference-location = "Gramado",
      conference-year = "Aug. 30 - Sep. 3, 2010",
             language = "en",
           targetfile = "TuningMH_sibgrapi_final.pdf",
        urlaccessdate = "2020, Dec. 04"
}


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