I tried contouring for the first time and it wasn't as hard as it looked


For a beauty junkie, I shamefully have never given makeup contouring a shot for fear of looking like a walking plastic doll due to my less-than-deft blending skills. I've watched plenty of tutorials on YouTube and I also studied "clown contouring" when it was a thing last year, but it always seemed to require more effort that I was willing to put in. But celebrity tattoo artist Kat Von D's new contouring makeup range landed on my desk and I figured I had to jump on it to see how a noob would do. Von D's eponymous cosmetics line will launch in Singapore in July at Sephora, and I've heard from the great beauty grapevine that her contour palettes and lipsticks are expected to sell like hotcakes. The face contour palette comes with three light and three dark powder shades, and will suit several skin tones.

2 Snake - Atlas Model

AAAI Conferences

There has been considerable interest in recent years in the possibility of segmenting anatomical structures as seen in three-dimensional (3D) magnetic resonance (MR) scans. By "segment", we imply the labelling of the image at every voxel with the correct anatomical descriptor(s). It may be argued that such a labelling is ill-defined in that a crisp anatomical boundary may not exist at the resolution of the MR image. In this initial work we simply ignore difficulties associated with the notion of "ground truth". There are many possible applications for a successful segmentation.


AAAI Conferences

We prove that the scale map of the.zero-crossings of almost all signals filtered by a gaussian of variable size determines the signal uniquely, up to a constant scaling.


AAAI Conferences

Jon A. Wcbbt and Edward Pervint Dfy2rtmc ut of Computer Scicuce Carnegie-Mellon University, Pittsburgh, PA 15217 tPerq Systems Corporation Pittsburgh, PA 15217 ABSTRACT We develop a theoretical framework for interpolating visual contours and apply it to subjective contours. The theory is based on the idea of consistency: a curve fitting algorithm must give consistent answers when presented with more data consistent with its hypothesis, or the same data under different conditions. Using this assumption, we prove that the subjective contour through two point-tangents is a parabola. Sample output of programs implementing the theory is provided. I. INTRODUCTION Subjective contours are curves filled in by the visual system in the absence of an explicit curve.