On spectral decomposition of immersions of finite type

Bang-Yen Chen; Mira Petrovic

doi:10.1017/S0004972700029518

Abstract

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Let x: M → Em be an immersion of finite type. In this paper we study the following two problems: (1) When is the spectral decomposition ofthe immersion x linearly independent? (2) When is the spectral decomposition orthogonal? Several results in this respect were obtained.

References

[1]Chen, B.Y., Total mean curvature and submanifolds of finite type (World Scientific, Singapore, New Jersey, London, Hong Kong, 1984).CrossRef Google Scholar

[2]Chen, B.Y., Finite type submanifolds and generalizations (University of Rome, 1985).Google Scholar

[3]Chen, B.Y., ‘Linear independent, orthogonal and equivariant immersions’, Kodai Math. J. 14 (1991).CrossRef Google Scholar

[4]Chen, B.Y., Dillen, F. and Verstraelen, L., ‘Finite type space curves’, Soochow J. Math 12 (1986), 1–10.Google Scholar

[5]Chen, B.Y., Deprez, J., Dillen, F., Verstraelen, L. and Vrancken, L., ‘Curves of finite type’, Geometry and Topology of Submanifolds II (1990), 76–110.Google Scholar

[6]Chen, B.Y., Dillen, F., Verstraelen, L., and Vrancken, L., ‘Ruled surfaces of finite type’, Bull. Austral. Math. Soc. 42 (1990), 447–453.CrossRef Google Scholar

[7]Chen, B.Y. and Li, S.J., ‘3-type hypersurfaces in a hypersphere’, Bull. Soc. Math. Belg. 43 (1991).Google Scholar

[8]Dillen, F., Pas, J. and Verstraelen, L., ‘On surfaces of finite type in Euclidean 3-space’, Kodai Math. J. 13 (1990), 10–21.CrossRef Google Scholar

[9]Garay, O., ‘On a certain class of finite type surfaces of revolution’, Kodai Math. J. 11 (1988), 25–31.CrossRef Google Scholar

[10]Garay, O., ‘An extension of Takahashi's theorem’, Geom. Dedicata 34 (1990), 105–112.CrossRef Google Scholar

[11]Hasanis, T. and Vlachos, T., ‘Coordinate finite type submanifolds’ (to appear).Google Scholar

[12]Takahashi, T., ‘Minimal immersions of Riemannian manifolds’, J. Math. Soc. Japan 18 (1966), 380–385.CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Chen, Bang-Yen 1991. Linearly independent, orthogonal and equivariant immersions. Kodai Mathematical Journal, Vol. 14, Issue. 3,

Verstraelen, Leopold 1991. On submanifolds of Finite Chen type and of Restricted type. Results in Mathematics, Vol. 20, Issue. 3-4, p. 744.

Chen, Ban -Yen Dillen, Franki Verstraelen, Leopold and Vrancken, Luc 1993. Submanifolds of restricted type. Journal of Geometry, Vol. 46, Issue. 1-2, p. 20.

Defever, Filip Deszcz, Ryszard and Verstraelen, Leopold 1993. The compact cyclides of Dupin and a conjecture of B.-Y. Chen. Journal of Geometry, Vol. 46, Issue. 1-2, p. 33.

BARROS, Manuel and GARA, Oscar Jesus 1994. A new characterization of the Clifford torus in <i>S</i><sup>3</sup> via the quadric representation. Japanese journal of mathematics. New series, Vol. 20, Issue. 2, p. 213.

Garay, Oscar J. 1994. Orthogonal surfaces with constant mean curvature in the Euclidean 4-space. Annals of Global Analysis and Geometry, Vol. 12, Issue. 1, p. 79.

Alías, Luis J. Ferrández, Angel and Lucas, Pascual 1995. Hypersurfaces in space forms satisfying the condition Δ𝑥=𝐴𝑥+𝐵. Transactions of the American Mathematical Society, Vol. 347, Issue. 5, p. 1793.

Zafindratafa, Georges 1996. Hypersurfaces whose mean curvature function is of finite type. Journal of Geometry, Vol. 55, Issue. 1-2, p. 182.

LI, Shi-Jie and HUANG, Jin-Neng 1996. QUADRIC REPRESENTATION OF MINIMAL SURFACES OF AN m-DIMENSIONAL SPHERE. Kyushu Journal of Mathematics, Vol. 50, Issue. 1, p. 207.

Chen, Bang-Yen 2000. Vol. 1, Issue. , p. 187.

CrossRef

Kim, Dong-Soo Kim, Young-Ho and Yoon, Dae-Won 2003. ON RULED SURFACES IN MINKOWSKl SPACES. Communications of the Korean Mathematical Society, Vol. 18, Issue. 2, p. 289.

Alías, Luis J. and Gürbüz, Nevin 2007. An extension of Takahashi theorem for the linearized operators of the higher order mean curvatures. Geometriae Dedicata, Vol. 121, Issue. 1, p. 113.

Dimitrić, Ivko 2009. Low-type submanifolds of real space forms via the immersions by projectors. Differential Geometry and its Applications, Vol. 27, Issue. 4, p. 507.

Alías, Luis J. and Kashani, S. M. B. 2010. HYPERSURFACES IN SPACE FORMS SATISFYING THE CONDITION $L_k x = Ax + b$. Taiwanese Journal of Mathematics, Vol. 14, Issue. 5,

Lucas, Pascual and Ramírez-Ospina, H. Fabián 2011. Hypersurfaces in the Lorentz-Minkowski space satisfying L k ψ = Aψ + b. Geometriae Dedicata, Vol. 153, Issue. 1, p. 151.

Lucas, Pascual and Ramirez-Ospina, H. Fabian 2012. HYPERSURFACES IN NON-FLAT LORENTZIAN SPACE FORMS SATISFYING Lkψ = Aψ + b. Taiwanese Journal of Mathematics, Vol. 16, Issue. 3,

Lucas, Pascual and Ramírez-Ospina, Héctor-Fabián 2013. HYPERSURFACES IN NON-FLAT PSEUDO-RIEMANNIAN SPACE FORMS SATISFYING A LINEAR CONDITION IN THE LINEARIZED OPERATOR OF A HIGHER ORDER MEAN CURVATURE. Taiwanese Journal of Mathematics, Vol. 17, Issue. 1,

Lucas, Pascual and Ramírez-Ospina, Hector Fabián 2013. Hypersurfaces in pseudo-Euclidean spaces satisfying a linear condition on the linearized operator of a higher order mean curvature. Differential Geometry and its Applications, Vol. 31, Issue. 2, p. 175.

Balmuş, Adina Montaldo, Stefano and Oniciuc, Cezar 2013. Biharmonic PNMC submanifolds in spheres. Arkiv för Matematik, Vol. 51, Issue. 2, p. 197.

Chen, Bang-Yen and Munteanu, Marian Ioan 2013. Biharmonic ideal hypersurfaces in Euclidean spaces. Differential Geometry and its Applications, Vol. 31, Issue. 1, p. 1.

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On spectral decomposition of immersions of finite type

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