Bang-Yen Chen

Bang-Yen Chen is a Taiwanese mathematician who works mainly on differential geometry and related subjects. He was a University Distinguished Professor of Michigan State University from 1990 to 2012. After 2012 he became University Distinguished Professor Emeritus.

Bang-Yen Chen
陳邦彦
Photo Of Bang-Yen Chen
Born(1943-10-03)October 3, 1943
NationalityTaiwanese
CitizenshipUnited States
Alma materTamkang University, National Tsing Hua University, University of Notre Dame
Known for"Chen inequalities", "Chen invariants (or δ-invariants)", "Chen's conjectures", "Chen surface", "Chen-Ricci inequality", "Chen submanifold", "Chen equality", "Submanifolds of finite type", "Slant submanifolds", "(M+,M-)-method for compact symmetric spaces & 2-numbers of Riemannian manifolds (joint with Tadashi Nagano)".
Scientific career
FieldsDifferential geometry, Riemannian Geometry, Geometry of submanifolds
InstitutionsMichigan State University
ThesisOn the G-total curvature and topology of immersed manifolds
Doctoral advisorTadashi Nagano
Doctoral studentsBogdan Suceavă
InfluencesÉlie Cartan, Shiing-Shen Chern, Tadashi Nagano, Tominosuke Otsuki, Kentaro Yano.
Websitewww.researchgate.net/profile/Bang_Yen_Chen

Biography

Bang-Yen Chen (陳邦彦) is a Taiwanese-American mathematician. He received his B.S. from Tamkang University in 1965 and his M.Sc from National Tsing Hua University in 1967. He obtained his Ph.D. degree from University of Notre Dame in 1970 under the supervision of Tadashi Nagano.[1] [2]

Bang-Yen Chen taught at Tamkang University between 1966 and 1968, and at the National Tsing Hua University in the academic year 1967–1968. After his doctoral years (1968-1970) at University of Notre Dame, he joined the faculty at Michigan State University as a research associate from 1970–1972, where he became associate professor in 1972, and full professor in 1976. He was presented with the title of University Distinguished Professor in 1990. After 2012 he became University Distinguished Professor Emeritus.[3] [4]

Bang-Yen Chen is the author of over 500 works including 12 books, mainly in differential geometry and related subjects.[5][6] His works have been cited over 28,000 times.[7]

On October 20–21, 2018, at the 1143rd Meeting of the American Mathematical Society held at Ann Arbor, Michigan, one of the Special Sessions was dedicated to Bang-Yen Chen's 75th birthday.[8] [9] The volume 756 in the Contemporary Mathematics series, published by the American Mathematical Society, is dedicated to Bang-Yen Chen, and it includes many contributions presented in the Ann Arbor event. [10] The volume is edited by Joeri Van der Veken, Alfonso Carriazo, Ivko Dimitrić, Yun Myung Oh, Bogdan Suceavă, and Luc Vrancken.

Research contributions

Given an almost Hermitian manifold, a totally real submanifold is one for which the tangent space is orthogonal to its image under the almost complex structure. From the algebraic structure of the Gauss equation and the Simons formula, Chen and Koichi Ogiue derived a number of information on submanifolds of complex space forms which are totally real and minimal. By using Shiing-Shen Chern, Manfredo do Carmo, and Shoshichi Kobayashi's estimate of the algebraic terms in the Simons formula, Chen and Ogiue showed that closed submanifolds which are totally real and minimal must be totally geodesic if the second fundamental form is sufficiently small.[11] By using the Codazzi equation and isothermal coordinates, they also obtained rigidity results on two-dimensional closed submanifolds of complex space forms which are totally real.

In 1993, Chen studied submanifolds of space forms, showing that the intrinsic sectional curvature at any point is bounded below in terms of the intrinsic scalar curvature, the length of the mean curvature vector, and the curvature of the space form. In particular, as a consequence of the Gauss equation, given a minimal submanifold of Euclidean space, every sectional curvature at a point is greater than or equal to one-half of the scalar curvature at that point. Interestingly, the submanifolds for which the inequality is an equality can be characterized as certain products of minimal surfaces of low dimension with Euclidean spaces.

Chen introduced and systematically studied the notion of a finite type submanifold of Euclidean space, which is a submanifold for which the position vector is a finite linear combination of eigenfunctions of the Laplace-Beltrami operator. He also introduced and studied a generalization of the class of totally real submanifolds and of complex submanifolds; a slant submanifold of an almost Hermitian manifold is a submanifold for which there is a number k such that the image under the almost complex structure of an arbitrary submanifold tangent vector has an angle of k with the submanifold's tangent space.

In Riemannian geometry, Chen and Kentaro Yano initiated the study of spaces of quasi-constant curvature. Chen also introduced the δ-invariants (also called Chen invariants), which are certain kinds of partial traces of the sectional curvature; they can be viewed as an interpolation between sectional curvature and scalar curvature. Due to the Gauss equation, the δ-invariants of a Riemannian submanifold can be controlled by the length of the mean curvature vector and the size of the sectional curvature of the ambient manifold. Submanifolds of space forms which satisfy the equality case of this inequality are known as ideal immersions; such submanifolds are critical points of a certain restriction of the Willmore energy.

Publications

Major articles

  • Bang-yen Chen and Koichi Ogiue. On totally real submanifolds. Trans. Amer. Math. Soc. 193 (1974), 257–266. doi:10.1090/S0002-9947-1974-0346708-7
  • Bang-Yen Chen. Some pinching and classification theorems for minimal submanifolds. Arch. Math. (Basel) 60 (1993), no. 6, 568–578. doi:10.1007/BF01236084

Surveys

Books

  • Bang-yen Chen. Geometry of submanifolds. Pure and Applied Mathematics, No. 22. Marcel Dekker, Inc., New York, 1973. vii+298 pp.
  • Bang-yen Chen. Geometry of submanifolds and its applications. Science University of Tokyo, Tokyo, 1981. iii+96 pp.
  • Bang-Yen Chen. Finite type submanifolds and generalizations. Università degli Studi di Roma "La Sapienza", Istituto Matematico "Guido Castelnuovo", Rome, 1985. iv+68 pp.
  • Bang-Yen Chen. A new approach to compact symmetric spaces and applications. A report on joint work with Professor T. Nagano. Katholieke Universiteit Leuven, Louvain, 1987. 83 pp.
  • Bang-Yen Chen. Geometry of slant submanifolds. Katholieke Universiteit Leuven, Louvain, 1990. 123 pp. arXiv:1307.1512
  • Bang-Yen Chen and Leopold Verstraelen. Laplace transformations of submanifolds. Centre for Pure and Applied Differential Geometry (PADGE), 1. Katholieke Universiteit Brussel, Group of Exact Sciences, Brussels; Katholieke Universiteit Leuven, Department of Mathematics, Leuven, 1995. x+126 pp.
  • Bang-Yen Chen. Pseudo-Riemannian geometry, δ-invariants and applications. With a foreword by Leopold Verstraelen. World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ, 2011. xxxii+477 pp. ISBN 978-981-4329-63-7, 981-4329-63-0. doi:10.1142/8003
  • Bang-Yen Chen. Total mean curvature and submanifolds of finite type. Second edition of the 1984 original. With a foreword by Leopold Verstraelen. Series in Pure Mathematics, 27. World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ, 2015. xviii+467 pp. ISBN 978-981-4616-69-0, 978-981-4616-68-3. doi:10.1142/9237
  • Bang-Yen Chen. Differential geometry of warped product manifolds and submanifolds. With a foreword by Leopold Verstraelen. World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ, 2017. xxx+486 pp. ISBN 978-981-3208-92-6
  • Ye-Lin Ou and Bang-Yen Chen. Biharmonic submanifolds and biharmonic maps in Riemannian geometry. World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ, 2020. xii+528 pp. ISBN 978-981-121-237-6

References

  1. "Bang-Yen Chen's Ph.D. thesis".
  2. "Bang-Yen Chen on Genealogy Project".
  3. "Bang-Yen Chen on MSU domain".
  4. "Bang-Yen Chen on Google Scholar".
  5. "Bang-Yen Chen on Zentralblatt".
  6. "Bang-Yen Chen on Research Gate".
  7. "Bang-Yen Chen on ResearchGate".
  8. "American Mathematical Society, Meeting No. 1143".
  9. "Notices of AMS" (PDF).
  10. "Contemporary Mathematics, Volume 756".
  11. S.S. Chern, M. do Carmo, and S. Kobayashi. Minimal submanifolds of a sphere with second fundamental form of constant length. 1970 Functional Analysis and Related Fields (Proc. Conf. for M. Stone, Univ. Chicago, Chicago, Ill., 1968) pp. 59–75 Springer, New York
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