S.G. Mikhlin, Linear Integral Equations, Hindustan Publishing Corp., Delhi, India, 1960. Home/Search Document Not in Database Summary Related Articles Check |
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Approximation Of Integrals For Boundary Element Methods - Georg (1991) (8 citations) (Correct)
....1 8 of the sphere. We consider two integrals. The first just describes the area of P(#) 4.1) I 1 : # P(#) 1 (dy) # # 1 P#(dz) # 2 . The second has a weak singularity in x = e 1 at one of the vertices of the triangle. By interpreting the integral as a solid angle, see, e.g. 11] or [16], an exact value is readily obtained: 4.2) I2 : # P(#) #s(x, y) ##(y) dy) # # #s(x, P (z) ##(P (z) P#(dz) # 4 . Below are two tables indicating the performance of the integration method for varying tolerances TolInt. It is important to note that the calculations were performed ....
S. G. Mikhlin, Linear Integral Equations, Hindustan Publishing Corp., Delhi, India, 1960.
Simulating the Behavior MEMS Devices: Computational methods.. - Senturia, al. (1997) (5 citations) (Correct)
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S.G. Mikhlin, Linear Integral Equations, Hindustan Publishing Corp., Delhi, India, 1960.
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