1999, Mathematical physics, ISBN 9781571460714, Volume 12, 257

Book

1983, Progress in mathematics, ISBN 3764331194, Volume 30., cm. --

Book

2000, Memoirs of the American Mathematical Society, ISBN 9780821821114, Volume no. 700., vii, 63

Book

1982, Rev. ed., ISBN 0444860177, v.

Book

2006, ESI lectures in mathematics and physics, ISBN 3037190256, x, 172

Book

Glasgow Mathematical Journal, ISSN 0017-0895, 01/2017, Volume 59, Issue 1, pp. 167 - 187

We suggest a way to quantize, using Berezin-Toeplitz quantization, a compact hyperkahler manifold (equipped with a natural 3-plectic form), or a compact...

KAHLER-MANIFOLDS | MATHEMATICS | NAMBU | DEFORMATION QUANTIZATION | DYNAMICS | GENERALIZED POISSON | GEOMETRY | Topological manifolds | Algebra

KAHLER-MANIFOLDS | MATHEMATICS | NAMBU | DEFORMATION QUANTIZATION | DYNAMICS | GENERALIZED POISSON | GEOMETRY | Topological manifolds | Algebra

Journal Article

2003, ISBN 3540440593, viii, 239

Book

2001, DMV Seminar, ISBN 0817666028, Volume Bd. 31, xiii, 375

Book

Quarterly Journal of Mathematics, ISSN 0033-5606, 09/2003, Volume 54, Issue 3, pp. 281 - 308

A geometrical structure on even-dimensional manifolds is defined which generalizes the notion of a Calabi-Yau manifold and also a symplectic manifold. Such...

KAHLER-MANIFOLDS | MATHEMATICS | GEOMETRY

KAHLER-MANIFOLDS | MATHEMATICS | GEOMETRY

Journal Article

Geometriae Dedicata, ISSN 0046-5755, 12/2018, Volume 197, Issue 1, pp. 49 - 60

We study compact complex manifolds bimeromorphic to locally conformally Kahler (LCK) manifolds. This is an analogy of studying a compact complex manifold...

Locally conformally Kahler | Locally conformally class C | Locally conformally balanced | MATHEMATICS

Locally conformally Kahler | Locally conformally class C | Locally conformally balanced | MATHEMATICS

Journal Article

Annali di Matematica Pura ed Applicata (1923 -), ISSN 0373-3114, 10/2017, Volume 196, Issue 5, pp. 1835 - 1853

A product of Kähler manifolds also carries a Kähler metric. In this short note, we would like to study the product of generalized p-Kähler manifolds, compact...

Positive forms and currents | Primary 53C55 | Kähler manifold | Balanced manifold | 53C56 | Secondary 32J27 | SG manifold | Mathematics, general | Mathematics | p -Kähler manifold | SKT manifold | p-Kähler manifold | EXISTENCE | MATHEMATICS | MATHEMATICS, APPLIED | p-Kahler manifold | SPECIAL METRICS | TORSION | Kahler manifold | COMPACT COMPLEX-MANIFOLDS

Positive forms and currents | Primary 53C55 | Kähler manifold | Balanced manifold | 53C56 | Secondary 32J27 | SG manifold | Mathematics, general | Mathematics | p -Kähler manifold | SKT manifold | p-Kähler manifold | EXISTENCE | MATHEMATICS | MATHEMATICS, APPLIED | p-Kahler manifold | SPECIAL METRICS | TORSION | Kahler manifold | COMPACT COMPLEX-MANIFOLDS

Journal Article

Communications in Mathematical Physics, ISSN 0010-3616, 2019, Volume 367, Issue 3, pp. 1095 - 1151

In the present work we provide a constructive method to describe contact structures on compact homogeneous contact manifolds. The main feature of our approach...

EXAMPLES | PHYSICS, MATHEMATICAL | EINSTEIN-METRICS | KAHLER-METRICS | Algebra | Mathematics - Differential Geometry

EXAMPLES | PHYSICS, MATHEMATICAL | EINSTEIN-METRICS | KAHLER-METRICS | Algebra | Mathematics - Differential Geometry

Journal Article

Transactions of the American Mathematical Society, ISSN 0002-9947, 07/2017, Volume 369, Issue 7, pp. 5157 - 5196

In this paper, we introduce the first Aeppli-Chern class for complex manifolds and show that the (1,1)-component of the curvature 2-form of the Levi-Civita...

EXISTENCE | MATHEMATICS | KAHLER STRUCTURES | METRICS | TORSION | SCALAR CURVATURE | VANISHING THEOREMS | COMPLEX STRUCTURES | MONGE-AMPERE EQUATION

EXISTENCE | MATHEMATICS | KAHLER STRUCTURES | METRICS | TORSION | SCALAR CURVATURE | VANISHING THEOREMS | COMPLEX STRUCTURES | MONGE-AMPERE EQUATION

Journal Article

PROCEEDINGS OF THE AMERICAN MATHEMATICAL SOCIETY, ISSN 0002-9939, 05/2019, Volume 147, Issue 5, pp. 2197 - 2206

We prove a Lichnerowicz-type lower bound for the first nontrivial eigenvalue of the p-Laplacian on Kahler manifolds. Parallel to the p = 2 case, the first...

MATHEMATICS | first eigenvalue | MATHEMATICS, APPLIED | p-Laplacian | Kahler manifolds

MATHEMATICS | first eigenvalue | MATHEMATICS, APPLIED | p-Laplacian | Kahler manifolds

Journal Article

Communications in Mathematical Physics, ISSN 0010-3616, 9/2019, Volume 370, Issue 3, pp. 853 - 871

We study the Rarita–Schwinger operator on compact Riemannian spin manifolds. In particular, we find examples of compact Einstein manifolds with positive scalar...

Quantum Physics | Mathematical Physics | Classical and Quantum Gravitation, Relativity Theory | Theoretical, Mathematical and Computational Physics | Complex Systems | Physics | PHYSICS, MATHEMATICAL | KAHLER-EINSTEIN METRICS | ELLIPTIC GENERA

Quantum Physics | Mathematical Physics | Classical and Quantum Gravitation, Relativity Theory | Theoretical, Mathematical and Computational Physics | Complex Systems | Physics | PHYSICS, MATHEMATICAL | KAHLER-EINSTEIN METRICS | ELLIPTIC GENERA

Journal Article

2008, Oxford mathematical monographs, ISBN 0198564953, xi, 613

Sasakian manifolds were first introduced in 1962. This book's main focus is on the intricate relationship between Sasakian and Kähler geometries, especially...

Manifolds (Mathematics) | Foliations (Mathematics) | Sasakian manifolds | Kählerian manifolds | Geometry, Differential | Contact structures | Algebraic varieties | Complex structures | Kähler geometry | Killing spinors | Orbibundles | Foliations | Orbifolds | Monge-ampère problem | Kähler-einstein metrics

Manifolds (Mathematics) | Foliations (Mathematics) | Sasakian manifolds | Kählerian manifolds | Geometry, Differential | Contact structures | Algebraic varieties | Complex structures | Kähler geometry | Killing spinors | Orbibundles | Foliations | Orbifolds | Monge-ampère problem | Kähler-einstein metrics

Book

1997, Lecture notes in mathematics, ISBN 9783540631057, Volume 1661., viii, 207

Book

Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg, ISSN 0025-5858, 4/2018, Volume 88, Issue 1, pp. 217 - 245

This paper is devoted, first of all, to give a complete unified proof of the characterization theorem for compact generalized Kähler manifolds. The proof is...

Primary 53C55 | Kähler manifold | Balanced manifold | SG manifold | Mathematics | Topology | Geometry | Positive forms and currents | Algebra | Secondary 53C56 | 32J27 | Mathematics, general | Number Theory | Differential Geometry | SKT manifold | p -Kähler manifold | p-Kähler manifold | 1-DIMENSIONAL EXCEPTIONAL SET | STRONGLY GAUDUCHON METRICS | CONVEXITY | SPACES | Kahler manifold | 1-CONVEX MANIFOLDS | MATHEMATICS | p-Kahler manifold | CYCLES | COMPACT COMPLEX-MANIFOLDS

Primary 53C55 | Kähler manifold | Balanced manifold | SG manifold | Mathematics | Topology | Geometry | Positive forms and currents | Algebra | Secondary 53C56 | 32J27 | Mathematics, general | Number Theory | Differential Geometry | SKT manifold | p -Kähler manifold | p-Kähler manifold | 1-DIMENSIONAL EXCEPTIONAL SET | STRONGLY GAUDUCHON METRICS | CONVEXITY | SPACES | Kahler manifold | 1-CONVEX MANIFOLDS | MATHEMATICS | p-Kahler manifold | CYCLES | COMPACT COMPLEX-MANIFOLDS

Journal Article

Turkish Journal of Mathematics, ISSN 1300-0098, 2018, Volume 42, Issue 3, pp. 967 - 976

We study the class of strict nearly Kenmotsu manifolds and prove that there is no Einstein manifold or locally symmetric or locally phi-symmetric in this class...

Kenmotsu manifold | Almost Hermitian manifold | Kähler manifold | Nearly Ken- motsu manifold | Nearly Kähler manifold | MATHEMATICS | nearly Kahler manifold | Kahler manifold | nearly Kenmotsu manifold

Kenmotsu manifold | Almost Hermitian manifold | Kähler manifold | Nearly Ken- motsu manifold | Nearly Kähler manifold | MATHEMATICS | nearly Kahler manifold | Kahler manifold | nearly Kenmotsu manifold

Journal Article

The Journal of Geometric Analysis, ISSN 1050-6926, 4/2017, Volume 27, Issue 2, pp. 947 - 967

In this paper, we consider a proper modification $$f : \tilde{M} \rightarrow M$$ f : M ~ → M between complex manifolds, and study when a generalized p-Kähler...

Modification | Primary 53C55 | Kähler manifold | Balanced manifold | Mathematics | Blow-up | Abstract Harmonic Analysis | Fourier Analysis | 32L05 | Convex and Discrete Geometry | Secondary 32J27 | Global Analysis and Analysis on Manifolds | Differential Geometry | Dynamical Systems and Ergodic Theory | p -Kähler manifold | SKT manifold | p-Kähler manifold | MATHEMATICS | COMPACT | p-Kahler manifold | SPECIAL METRICS | SPACES | COMPLEX-MANIFOLDS | Kahler manifold

Modification | Primary 53C55 | Kähler manifold | Balanced manifold | Mathematics | Blow-up | Abstract Harmonic Analysis | Fourier Analysis | 32L05 | Convex and Discrete Geometry | Secondary 32J27 | Global Analysis and Analysis on Manifolds | Differential Geometry | Dynamical Systems and Ergodic Theory | p -Kähler manifold | SKT manifold | p-Kähler manifold | MATHEMATICS | COMPACT | p-Kahler manifold | SPECIAL METRICS | SPACES | COMPLEX-MANIFOLDS | Kahler manifold

Journal Article

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