Mémoire de bachelor : Haute Ecole Arc Conservation-Restauration, 2020.
The Olympic Foundation for Culture and Heritage possesses a very large collection of sportswear and costumes, but encounters various problems when displaying these artefacts. First of all, the morphologies of the athletes rarely correspond to standard mannequins. Secondly, the outfits are often incomplete, which makes it difficult to achieve a coherent visual appearance. The use of replicas or...
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Mémoire de master : Haute Ecole Arc Conservation-Restauration, 2020.
This project compares different coatings for Keris blades, in the framework of the collaboration with the Museum der Kulturen Basel (MKB). The Keris blade collection of the MKB shows a wide variety of coatings, which are unique in that they are used for corrosion protection, but also for aesthetical and spiritual reasons. The objects, that arrived in different moments to the museum, have hardly...
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In: ACM transactions on graphics, 2020, vol. 39, no. 4, p. 16 p
Digital drawing tools are now standard in art and design workflows. These tools offer comfort, portability, and precision as well as native integration with digital-art workflows, software, and tools. At the same time, artists continue to work with long-standing, traditional drawing tools. One feature of traditional tools, well-appreciated by many artists and lacking in digital tools, is the...
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In: BioNanoMaterials, 2016, vol. 17, no. 3-4, p. 193-204
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In: Behavioral Ecology and Sociobiology, 2011, vol. 65, no. 4, p. 559-567
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In: The International Journal of Life Cycle Assessment, 2003, vol. 8, no. 4, p. 201-208
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In: Clinical Oral Investigations, 2011, vol. 15, no. 3, p. 351-356
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In: Applied Physics A, 2005, vol. 80, no. 7, p. 1485-1495
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In this paper we study the ability of convergent subdivision schemes to reproduce polynomials in the sense that for initial data, which is sampled from some polynomial function, the scheme yields the same polynomial in the limit. This property is desirable because the reproduction of polynomials up to some degree d implies that a scheme has approximation order d + 1. We first show that any...
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In: Journal of approximation theory, 2011, vol. 163, no. 4, p. 413-437
In this paper, we study the ability of convergent subdivision schemes to reproduce polynomials in the sense that for initial data, which is sampled from some polynomial function, the scheme yields the same polynomial in the limit. This property is desirable because the reproduction of polynomials up to some degree d implies that a scheme has approximation order d+1. We first show that any...
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