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In case of b > 0, formula (1) describes a curve which diverges selleck compound at the origin as ? increases. In case of b VAV2 n? is the number of sampling points within the 2�� radian on the curve. Given an image ��, the Log-Spiral mapping ��(x, y) ? Sp(��) is as follows: Spk=��xk,yk, (4) where Sp is a one-dimensional transformed vector. (B) Log-Spiral Sampling Pattern for Keypoint Detection. We here introduce a Log-Spiral sampling pattern for the multiscale corner keypoint detection from original image. FAST uses Bresenham's circle of diameter 7 pixels as test mask; 16 pixels on a circle have to be compared to the value of the nucleus. In the case of FAST-9, the criteria for a pixel to be a corner must be at least 9 connected pixels on the circle which are brighter or darker than a threshold determined by the center pixel value. To detect the multiscale corner keypoints, ns of octave images with different resolution (downsampled by a factor of 2) and Bresenham's circle of 16 Tyrosine Kinase Inhibitor Library pixels are universally used. In contrast, our method relies on the premise that multiscale corner keypoints could be detected from an original image using ns of multiscale discrete circles. We define the multiscale discrete circles of which individual diameter satisfy formula (5). Each multiscale discrete circle consists of 16 sampling points: dt=7��2t,?t=0,��,ns?1, (5) where t is a scale factor. To design a Log-Spiral sampling pattern which replaces typical image pyramid consisting of 4 octave layers, we set ns to 4. Figure 3(a) (up) shows the 4 concentric multiscale discrete circles. Spacing angle between two neighboring sampling points on all multiscale discrete circles is the same. When t = 0, a red discrete circle of diameter 7 pixels becomes Bresenham's circle and it is used as test mask on an original image. When t = 1, a pink discrete circle of diameter 14 pixels in Figure 3(a) (up) becomes Bresenham's circle of diameter 7 pixels on first octave image (Figure 3(a) (down)). Note that although the downsampling operation changes the size of multiscale discrete circles, it does not change the structural relationship between the intensity values of sampling points on a circle.