The binary phase diagram for alumina–silica (Figure 3.23) is of special relevance to the refractories industry, an industry which produces the bricks, slabs, shapes, etc. for the high-temperature plant that make steel-making, glass-making, heat-treatment, etc. possible. The profile of its li...
To adapt our method to any plans and any elements with arbitrary directions, a more advanced segmentation model would need to be incorporated in place of the slicing and slice segmentation steps to detect points corresponding to structural elements in arbitrary planes. 4) We evaluated our method ...
metrics could be used to compare (among other things) melodic shapes, they are interesting in their own right in the area of discrete optimization. In this paper, we show that for some specific graphsG=(R∪B,E), whereEis the set of edges connecting permitted pairings, the minimum-weight ...
introduced the rolling constraints occurring between the fingertips of arbitrary shapes in detail [19]. Yoshida et al. utilized a mathematical and computational method to establish the model of pinching an object with arbitrary shape by two fingers with hemispherical ends [20]. Regarding the ...
Presented in this paper is the formulation of a generalized electrostatic micro-mirror (GEM) model with an arbitrary convex piecewise linear shape that is readily implemented in MATLAB and SIMULINK for steady-state and dynamic simulations. Additionally, such a model permits an arbitrary shaped mirror...
2(d). It has been shown that nonlocality eliminates collapse in all physical dimensions for arbitrary shapes of the nonlocal response, as long as the response function is symmetric and has a positive definite Fourier spectrum36. In this paper, the Fourier transform of a Gaussian response ...
Kudryashov, N.A., Biswas, A.: Optical solitons of nonlinear Schrödinger’s equation with arbitrary dual-power law parameters. Optik 252, 168497 (2022) Google Scholar Zafar, A., Shakeel, M., Ali, A., Akinyemi, L., Rezazadeh, H.: Optical solitons of nonlinear complex Ginzburg–Landau...
On Steinitz's theorem concerning convex 3-polytopes and some properties of planar graphs Lecture Notes in Math., Vol. 110, Springer, Berlin (1969), pp. 27-40 Google Scholar [4] P. Kleinschmidt On facets with non-arbitrary shapes Pacific J. Math., 65 (1976), pp. 97-101 CrossrefView...
although it will be appreciated that the position sensor is transparent and would not be visible in practice. Since the sensing layer and associated electronics is able to report an X-Y location, the position of buttons is arbitrary as it would be with any analogue touch screen input device....
19. The sensor system of claim 18, wherein the first and second conductive elements of each conductive trace pattern have complementary clover and cruciform shapes. 20. The sensor system of claim 18, wherein the first and second conductive elements of each conductive trace pattern have interdigit...