Differential Geometry
The present book contains 14 papers published in the Special Issue “Differential Geometry” of the journal Mathematics. They represent a selection of the 30 submissions. This book covers a variety of both classical and modern topics in differential geometry. We mention properties of both rectifying a...
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| Format: | Online |
| Language: | English |
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MDPI - Multidisciplinary Digital Publishing Institute
2021
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| Online Access: | 42716 |
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| _version_ | 1869525303062167552 |
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| author | Mihai, Ion |
| author_browse | Mihai, Ion |
| author_facet | Mihai, Ion |
| author_sort | Mihai, Ion |
| collection | Directory of Open Access Books |
| description | The present book contains 14 papers published in the Special Issue “Differential Geometry” of the journal Mathematics. They represent a selection of the 30 submissions. This book covers a variety of both classical and modern topics in differential geometry. We mention properties of both rectifying and affine curves, the geometry of hypersurfaces, angles in Minkowski planes, Euclidean submanifolds, differential operators and harmonic forms on Riemannian manifolds, complex manifolds, contact manifolds (in particular, Sasakian and trans-Sasakian manifolds), curvature invariants, and statistical manifolds and their submanifolds (in particular, Hessian manifolds). We wish to mention that among the authors, there are both well-known geometers and young researchers. The authors are from countries with a tradition in differential geometry: Belgium, China, Greece, Japan, Korea, Poland, Romania, Spain, Turkey, and United States of America. Many of these papers were already cited by other researchers in their articles. This book is useful for specialists in differential geometry, operator theory, physics, and information geometry as well as graduate students in mathematics. |
| format | Online |
| id | doab-20.500.12854ir-45107 |
| institution | Directory of Open Access Books |
| language | eng |
| publishDate | 2021 |
| publishDateRange | 2021 |
| publishDateSort | 2021 |
| publisher | MDPI - Multidisciplinary Digital Publishing Institute |
| publisherStr | MDPI - Multidisciplinary Digital Publishing Institute |
| record_format | ojs |
| spelling | doab-20.500.12854ir-451072023-12-20T18:40:39Z Differential Geometry Mihai, Ion QA1-939 Q1-390 statistical structure constant ratio submanifolds Euclidean submanifold framed helices Sasakian statistical manifold L2-harmonic forms Hodge–Laplacian complete connection concircular vector field cylindrical hypersurface k-th generalized Tanaka–Webster connection Casorati curvature symplectic curves generalized 1-type Gauss map rectifying submanifold manifold with singularity ruled surface Minkowski plane compact complex surfaces conjugate connection T-submanifolds L2-Stokes theorem inextensible flow shape operator generalized normalized ?-Casorati curvature Sasakian manifold centrodes circular helices non-flat complex space form invariant Frenet frame Darboux frame trans-Sasakian 3-manifold singular points symplectic curvatures Kähler–Einstein metrics conjugate symmetric statistical structure sectional ?-curvature circular rectifying curves developable surface capacity Ricci soliton Reeb flow symmetry Minkowskian pseudo-angle conical surface lie derivative position vector field pinching of the curvatures Hessian manifolds Minkowskian angle Hessian sectional curvature Minkowskian length lightlike surface affine sphere concurrent vector field slant affine hypersurface anti-invariant statistical manifolds Ricci operator C-Bochner tensor Ricci curvature real hypersurface scalar curvature framed rectifying curves bic Book Industry Communication::P Mathematics & science The present book contains 14 papers published in the Special Issue “Differential Geometry” of the journal Mathematics. They represent a selection of the 30 submissions. This book covers a variety of both classical and modern topics in differential geometry. We mention properties of both rectifying and affine curves, the geometry of hypersurfaces, angles in Minkowski planes, Euclidean submanifolds, differential operators and harmonic forms on Riemannian manifolds, complex manifolds, contact manifolds (in particular, Sasakian and trans-Sasakian manifolds), curvature invariants, and statistical manifolds and their submanifolds (in particular, Hessian manifolds). We wish to mention that among the authors, there are both well-known geometers and young researchers. The authors are from countries with a tradition in differential geometry: Belgium, China, Greece, Japan, Korea, Poland, Romania, Spain, Turkey, and United States of America. Many of these papers were already cited by other researchers in their articles. This book is useful for specialists in differential geometry, operator theory, physics, and information geometry as well as graduate students in mathematics. 2021-02-11T11:26:23Z 2021-02-11T11:26:23Z 2019-12-09 16:10:12 2019 book 42716 9783039218011 9783039218004 https://directory.doabooks.org/handle/20.500.12854/45107 eng application/octet-stream Attribution-NonCommercial-NoDerivatives 4.0 International https://mdpi.com/books/pdfview/book/1834 MDPI - Multidisciplinary Digital Publishing Institute 10.3390/books978-3-03921-801-1 10.3390/books978-3-03921-801-1 46cabcaa-dd94-4bfe-87b4-55023c1b36d0 9783039218011 9783039218004 166 open access |
| spellingShingle | QA1-939 Q1-390 statistical structure constant ratio submanifolds Euclidean submanifold framed helices Sasakian statistical manifold L2-harmonic forms Hodge–Laplacian complete connection concircular vector field cylindrical hypersurface k-th generalized Tanaka–Webster connection Casorati curvature symplectic curves generalized 1-type Gauss map rectifying submanifold manifold with singularity ruled surface Minkowski plane compact complex surfaces conjugate connection T-submanifolds L2-Stokes theorem inextensible flow shape operator generalized normalized ?-Casorati curvature Sasakian manifold centrodes circular helices non-flat complex space form invariant Frenet frame Darboux frame trans-Sasakian 3-manifold singular points symplectic curvatures Kähler–Einstein metrics conjugate symmetric statistical structure sectional ?-curvature circular rectifying curves developable surface capacity Ricci soliton Reeb flow symmetry Minkowskian pseudo-angle conical surface lie derivative position vector field pinching of the curvatures Hessian manifolds Minkowskian angle Hessian sectional curvature Minkowskian length lightlike surface affine sphere concurrent vector field slant affine hypersurface anti-invariant statistical manifolds Ricci operator C-Bochner tensor Ricci curvature real hypersurface scalar curvature framed rectifying curves bic Book Industry Communication::P Mathematics & science Mihai, Ion Differential Geometry |
| title | Differential Geometry |
| title_full | Differential Geometry |
| title_fullStr | Differential Geometry |
| title_full_unstemmed | Differential Geometry |
| title_short | Differential Geometry |
| title_sort | differential geometry |
| topic | QA1-939 Q1-390 statistical structure constant ratio submanifolds Euclidean submanifold framed helices Sasakian statistical manifold L2-harmonic forms Hodge–Laplacian complete connection concircular vector field cylindrical hypersurface k-th generalized Tanaka–Webster connection Casorati curvature symplectic curves generalized 1-type Gauss map rectifying submanifold manifold with singularity ruled surface Minkowski plane compact complex surfaces conjugate connection T-submanifolds L2-Stokes theorem inextensible flow shape operator generalized normalized ?-Casorati curvature Sasakian manifold centrodes circular helices non-flat complex space form invariant Frenet frame Darboux frame trans-Sasakian 3-manifold singular points symplectic curvatures Kähler–Einstein metrics conjugate symmetric statistical structure sectional ?-curvature circular rectifying curves developable surface capacity Ricci soliton Reeb flow symmetry Minkowskian pseudo-angle conical surface lie derivative position vector field pinching of the curvatures Hessian manifolds Minkowskian angle Hessian sectional curvature Minkowskian length lightlike surface affine sphere concurrent vector field slant affine hypersurface anti-invariant statistical manifolds Ricci operator C-Bochner tensor Ricci curvature real hypersurface scalar curvature framed rectifying curves bic Book Industry Communication::P Mathematics & science |
| topic_facet | QA1-939 Q1-390 statistical structure constant ratio submanifolds Euclidean submanifold framed helices Sasakian statistical manifold L2-harmonic forms Hodge–Laplacian complete connection concircular vector field cylindrical hypersurface k-th generalized Tanaka–Webster connection Casorati curvature symplectic curves generalized 1-type Gauss map rectifying submanifold manifold with singularity ruled surface Minkowski plane compact complex surfaces conjugate connection T-submanifolds L2-Stokes theorem inextensible flow shape operator generalized normalized ?-Casorati curvature Sasakian manifold centrodes circular helices non-flat complex space form invariant Frenet frame Darboux frame trans-Sasakian 3-manifold singular points symplectic curvatures Kähler–Einstein metrics conjugate symmetric statistical structure sectional ?-curvature circular rectifying curves developable surface capacity Ricci soliton Reeb flow symmetry Minkowskian pseudo-angle conical surface lie derivative position vector field pinching of the curvatures Hessian manifolds Minkowskian angle Hessian sectional curvature Minkowskian length lightlike surface affine sphere concurrent vector field slant affine hypersurface anti-invariant statistical manifolds Ricci operator C-Bochner tensor Ricci curvature real hypersurface scalar curvature framed rectifying curves bic Book Industry Communication::P Mathematics & science |
| url | 42716 |
| work_keys_str_mv | AT mihaiion differentialgeometry |