Showing results 1 to 50 of 50
A new construction of lens spaces Sarkar, Soumen; Suh, Dong Youp, TOPOLOGY AND ITS APPLICATIONS, v.240, pp.1 - 20, 2018-05 |
(A) shape optimization problem of the first mixed Steklov-Dirichlet eigenvalue = 첫번째 혼합 스테클로프-디리클레 고유값에 대한 형상최적화 문제link Seo, Dong-Hwi; Suh, Dong Youp; et al, 한국과학기술원, 2020 |
ALGEBRAIC AND GEOMETRIC PROPERTIES OF FLAG BOTT-SAMELSON VARIETIES AND APPLICATIONS TO REPRESENTATIONS Fujita, Naoki; Lee, Eunjeong; Suh, Dong Youp, PACIFIC JOURNAL OF MATHEMATICS, v.309, no.1, pp.145 - 194, 2020-11 |
ALGEBRAIC REALIZATION OF EQUIVARIANT VECTOR-BUNDLES DOVERMANN, KH; MASUDA, M; Suh, Dong Youp, JOURNAL FUR DIE REINE UND ANGEWANDTE MATHEMATIK, v.448, pp.31 - 64, 1994 |
Algebraic realization problems for low dimensional G manifolds Cho, JH; Suh, Dong Youp, TOPOLOGY AND ITS APPLICATIONS, v.78, no.3, pp.269 - 283, 1997-07 |
Classification of equivariant complex vector bundles over a circle Cho, JH; Kim, SS; Masuda, M; Suh, Dong Youp, JOURNAL OF MATHEMATICS OF KYOTO UNIVERSITY, v.41, no.3, pp.517 - 534, 2001-10 |
Classification of equivariant real vector bundles over a circle Cho, JH; Kim, SS; Masuda, M; Suh, Dong Youp, JOURNAL OF MATHEMATICS OF KYOTO UNIVERSITY, v.42, no.2, pp.223 - 242, 2002-10 |
Classification problems of toric manifolds via topology MIKIYA MASUDA; Suh, Dong Youp, CONTMEPORARY MATHEMATICS, v.460, pp.273 - 286, 2008-01 |
Comparision of Semialgebraic groups with Lie groups and algebraic groups Choi, Myung-Jun; Suh, Dong Youp, Research Institute for Mathematical Science, pp.12 - 20, 2005-06 |
Embedded Surfaces for Symplectic Circle Actions Cho, Yunhyung; Kim, Min Kyu; Suh, Dong Youp, CHINESE ANNALS OF MATHEMATICS SERIES B, v.38, no.6, pp.1197 - 1212, 2017-11 |
Entire rational approximation of G-maps, Topology and Applications-International topology conference. Suh, Dong Youp, Dedicated to P.O. Alexandroff's 100th Birthday, pp.217 - 218, 1996 |
Equivariant Approximation of Topological Objects by Algebraic Ones Suh, Dong Youp, '95 Inha Symposium on Basic Science, 1995 |
Equivariant semi-algebraic triangulation of real algebraic G-varieties Dae Heui PARK; Suh, Dong Youp, KYUSHU JOURNAL OF MATHEMATICS, v.50, no.1, pp.179 - 205, 1996-01 |
Equivariant semialgebraic homotopies Park, DH; Suh, Dong Youp, TOPOLOGY AND ITS APPLICATIONS, v.115, no.2, pp.153 - 174, 2001-09 |
Extending representations of H to G with discrete G/H Cho, JH; Masuda, M; Suh, Dong Youp, JOURNAL OF THE KOREAN MATHEMATICAL SOCIETY, v.43, pp.29 - 43, 2006-01 |
FLAG BOTT MANIFOLDS AND THE TORIC CLOSURE OF A GENERIC ORBIT ASSOCIATED TO A GENERALIZED BOTT MANIFOLD Kuroki, Shintaro; Lee, Eunjeong; Song, Jongbaek; Suh, Dong Youp, PACIFIC JOURNAL OF MATHEMATICS, v.308, no.2, pp.347 - 392, 2020-10 |
FLAG BOTT MANIFOLDS OF GENERAL LIE TYPE AND THEIR EQUIVARIANT COHOMOLOGY RINGS Kaji, Shizuo; Kuroki, Shintaro; Lee, Eunjeong; Suh, Dong Youp, HOMOLOGY HOMOTOPY AND APPLICATIONS, v.22, no.1, pp.375 - 390, 2020-01 |
Generic Torus Orbit Closures in Flag Bott Manifolds Lee, Eunjeong; Suh, Dong Youp, PROCEEDINGS OF THE STEKLOV INSTITUTE OF MATHEMATICS, v.305, no.1, pp.149 - 160, 2019-05 |
Induction in Equivariant K-theory and s-Smith Equivalence of representations Eung Chun Cho; Suh, Dong Youp, CONTEMPORARY MATHEMATICS, v.36, no.0, pp.311 - 315, 1985-08 |
Linear embeddings of semialgebraic G-spaces Park, DH; Suh, Dong Youp, MATHEMATISCHE ZEITSCHRIFT, v.242, no.4, pp.725 - 742, 2002-05 |
Locally standard torus manifolds = 국소적으로 표준적인 토러스 다양체link Park, Sang Hyun; 박상현; et al, 한국과학기술원, 2015 |
NONISOMORPHIC ALGEBRAIC MODELS OF A SMOOTH MANIFOLD WITH GROUP ACTION DOVERMANN, KH; MASUDA, M; Suh, Dong Youp, PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, v.123, no.1, pp.55 - 61, 1995-01 |
On extensions of representations for compact Lie groups Cho, JH; Kim, MK; Suh, Dong Youp, JOURNAL OF PURE AND APPLIED ALGEBRA, v.178, no.3, pp.245 - 254, 2003-03 |
Proof of semialgebraic covering mapping cylinder conjecture with semialgebraic covering homotopy theorem Choi, MJ; Park, DH; Suh, Dong Youp, TOPOLOGY AND ITS APPLICATIONS, v.154, no.1, pp.69 - 89, 2007-01 |
Properties of Bott manifolds and cohomological rigidity Choi, Suyoung; Suh, Dong Youp, ALGEBRAIC AND GEOMETRIC TOPOLOGY, v.11, no.2, pp.1053 - 1076, 2011 |
Quasimap theory and its applications to mirror symmetry = 콰지맵 이론과 거울 대칭 이론으로의 응용에 대한 연구link Oh, Jeongseok; 오정석; et al, 한국과학기술원, 2017 |
QUASITORIC MANIFOLDS OVER A PRODUCT OF SIMPLICES Choi, S; Masuda, M; Suh, Dong Youp, OSAKA JOURNAL OF MATHEMATICS, v.47, pp.109 - 129, 2010-03 |
Quotients of real algebraic G varieties and algebraic realization problems Suh, Dong Youp, OSAKA JOURNAL OF MATHEMATICS, v.33, no.2, pp.399 - 410, 1996-06 |
Real algebraic quotients and characterization of strongly algebraic G line bundles over free real algebraic G varienties. Suh, Dong Youp, Proceedings of the 1996 Korea-Japan Conference on Transformation Group theory, pp.91 - 103, 1996 |
Real Algebraic Transformation Groups Suh, Dong Youp; Dovermann, K. H., Proceedings of Workshop on Pure and Applied Mathematics, 1991 |
Real algebraic Transformation Groups and Algebraic Realization Problem Suh, Dong Youp, Proceedings of Workshop on Pure and Applied Mathematics, 1993 |
RIGID VERSUS NON-RIGID CYCLIC ACTIONS DOVERMANN, KH; MASUDA, M; Suh, Dong Youp, COMMENTARII MATHEMATICI HELVETICI, v.64, no.2, pp.269 - 287, 1989 |
Rigid versus nonrigid actions of $Z_p$ on homotopy complex projective spaces Suh, Dong Youp, Proceedings of Workshop on Pure and Applied Mathematics, 1987 |
Rigidity Problems in Toric Topology: A Survey Choi, Suyoung; Masuda, Mikiya; Suh, Dong Youp, PROCEEDINGS OF THE STEKLOV INSTITUTE OF MATHEMATICS, v.275, no.1, pp.177 - 190, 2011-12 |
s-Smith equivalent representations of finite abelian groups Suh, Dong Youp, CONTEMPORARY MATHEMATICS, v.36, no.0, pp.323 - 329, 1985-08 |
SMITH EQUIVALENCE FOR FINITE ABELIAN-GROUPS DOVERMANN, KH; Suh, Dong Youp, PACIFIC JOURNAL OF MATHEMATICS, v.152, no.1, pp.41 - 78, 1992-01 |
STRONG COHOMOLOGICAL RIGIDITY OF A PRODUCT OF PROJECTIVE SPACES Choi, Suyoung; Suh, Dong Youp, BULLETIN OF THE KOREAN MATHEMATICAL SOCIETY, v.49, no.4, pp.761 - 765, 2012-07 |
Symplectic capacities from Hamiltonian circle actions Hwang, Taekgyu; Suh, Dong Youp, JOURNAL OF SYMPLECTIC GEOMETRY, v.15, no.3, pp.785 - 802, 2017 |
The equivariant whitehead groups of semialgebraic G-sets Park, DH; Suh, Dong Youp, OSAKA JOURNAL OF MATHEMATICS, v.40, no.2, pp.287 - 311, 2003-06 |
The existence of semialgebraic slices and its applications Choi, MJ; Park, DH; Suh, Dong Youp, JOURNAL OF THE KOREAN MATHEMATICAL SOCIETY, v.41, no.4, pp.629 - 646, 2004-07 |
The Gromov Width of Generalized Bott Manifolds Hwang, Taekgyu; Lee, Eunjeong; Suh, Dong Youp, INTERNATIONAL MATHEMATICS RESEARCH NOTICES, v.2021, no.9, pp.7096 - 7131, 2021-05 |
(The) integral cohomology ring of toric orbifolds = 토릭 오비폴드의 정수 계수 코호몰로지 환link Song, Jongbaek; 송종백; et al, 한국과학기술원, 2017 |
(The) topology of hessenberg varieties = 헤센버그 다양체의 위상적 성질link Lee, Jeong-Hyeon; 이정현; et al, 한국과학기술원, 2016 |
TOPOLOGICAL CLASSIFICATION OF GENERALIZED BOTT TOWERS Choi, Suyoung; Masuda, Mikiya; Suh, Dong Youp, TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, v.362, no.2, pp.1097 - 1112, 2010-02 |
TOPOLOGICAL INVARIANTS OF REAL ALGEBRAIC ACTIONS DOVERMANN, KH; KNOP, F; Suh, Dong Youp, TOPOLOGY AND ITS APPLICATIONS, v.40, no.2, pp.171 - 188, 1991-07 |
Topology and geometry of flag bott-samelson varieties and bott towers = 플래그 보트-사멜슨 다양체와 보트 다양체의 위상과 기하에 관한 연구link Lee, Eunjeong; Suh, Dong Youp; et al, 한국과학기술원, 2018 |
Toric cohomological rigidity of simple convex polytopes Choi, S.; Panov, T.; Suh, Dong Youp, JOURNAL OF THE LONDON MATHEMATICAL SOCIETY-SECOND SERIES, v.82, pp.343 - 360, 2010-10 |
Torus bundles over locally symmetric varieties associated to cocycles of discrete groups Lee, MH; Suh, Dong Youp, MONATSHEFTE FUR MATHEMATIK, v.130, no.2, pp.127 - 141, 2000 |
Transformation Groups on Spheres-A Survey Suh, Dong Youp, Proceedings of Workshop on Pure and Applied Mathematics, pp.217 - 237, 1989 |
Variational properties of the catenoid = 현수면의 변분법적 성질link Seo, Donghwi; 서동휘; et al, 한국과학기술원, 2015 |
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