Abstract
We construct a minimal cubature formula of degree \(2 \) for a torus in \({\mathbb R}^3 \).
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REFERENCES
I. M. Fedotova, “Cubature formulas for a torus of degree \(2 \) with a minimal number of knots,” in: Cubature Formulae and Their Applications, 201 (Krasnoyarsk Gos. Tekh. Univ., Krasnoyarsk, 2000) [in Russian].
I. P. Mysovskukh, Interpolational Cubature Formulas (Nauka, Moscow, 1981) [in Russian].
M. V. Noskov, “On approximate integration over the torus surface,” Vestn. St.-Peterburg. Univ., Ser. I, Mat. Mekh. Astron., no. 3, 100 (1992) [Vestn. St. Petersburg. Univ., Math. 25:3, 61 (1992)].
M. V. Noskov and I. M. Fedotova, “On invariant cubature formulas for a torus in \( {\mathbb R}^3\),” Zh. Vychisl. Mat. Mat. Fiz. 43, 1323 (2003) [Comput. Math. Math. Phys. 43, 1270 (2003)].
M. V. Noskov and I. M. Fedotova, “Minimal cubature formulas of degree \(3 \) for a torus in \({\mathbb R}^3 \),” Mat. Trudy 18, 49 (2015) [Siberian Adv. Math. 26, 90 (2016)].
S. L. Sobolev and V. L. Vaskevich, The Theory of Cubature Formulas (Izd. Inst. Mat. SO RAN, Novosibirsk, 1996) [The Theory of Cubature Formulas (Kluwer Academic Publishers, Dordrecht, 1997)].
Funding
The research was carried out within the state assignment of the Ministry of Science and Higher Education of the Russian Federation (project No. FSRZ-2020-0011).
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Noskov, M.V., Fedotova, I.M. On a Minimal Cubature Formula of Degree Two for a Torus in \({\mathbb R}^3 \). Sib. Adv. Math. 31, 45–52 (2021). https://doi.org/10.1134/S1055134421010053
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DOI: https://doi.org/10.1134/S1055134421010053