![Project orange: Parabolic maximal regularity and the Kato square root property](/media/cache/video_light/uploads/video/2024-06-17_projet_orange-6f0cc16867030d6fb61a3dc2e4a8d3ec.jpg)
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Project orange: Parabolic maximal regularity and the Kato square root property
De Wolfgang Arendt , Azam Jahandideh , Vinzenzo Leone , Henning Heister , Manuel Schlierf , Sofian Abahmami
![An implicit formulation for incorporating different priors into a deformation model](/media/cache/video_light/uploads/video/2024-05-28_Gris.mp4-f6c4ec5c58d085b334b6ec78f08566a6-video-527c034210f79de45cc8656956e599b4.jpg)
![](/assets/front/img/icon-video-play-7e3956a0b9.png)
An implicit formulation for incorporating different priors into a deformation model
De Barbara Gris
![Parabolic maximal regularity applied to diffusion networks with time-dependent transmission conditions](/media/cache/video_light/uploads/video/2024-03-18_Arendt.mp4-8ba728ffc821485c9a6464ce35bf18f3-video-45b2b992075cb0da29c32dbb42c0537d.jpg)
![](/assets/front/img/icon-video-play-7e3956a0b9.png)
Parabolic maximal regularity applied to diffusion networks with time-dependent transmission conditions
De Wolfgang Arendt
![Numerical quadrature for singular integrals over self-similar measures on fractal sets](/media/cache/video_light/uploads/video/2024-03-19_Hewett_2.mp4-3f48b232ce87c3660881d45b596551df-video-641b547df6262dbee640d6925b8ab4b6.jpg)
![](/assets/front/img/icon-video-play-7e3956a0b9.png)
Numerical quadrature for singular integrals over self-similar measures on fractal sets
De David Hewett
![Some advances in numerical algebraic geometry for computing real solutions](/media/cache/video_light/uploads/video/Capture%20d%E2%80%99%C3%A9cran%202023-11-20%20%C3%A0%2011.56.45%20%282%29.png)
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Some advances in numerical algebraic geometry for computing real solutions
De Jon Hauenstein