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Displaying 161 – 180 of 864

Slant submanifolds in cosymplectic manifolds

Ram Shankar Gupta, S. M. Khursheed Haider, A. Sharfuddin (2006)

Colloquium Mathematicae

We give some examples of slant submanifolds of cosymplectic manifolds. Also, we study some special slant submanifolds, called austere submanifolds, and establish a relation between minimal and anti-invariant submanifolds which is based on properties of the second fundamental form. Moreover, we give an example to illustrate our result.

Slant submanifolds with prescribed scalar curvature into cosymplectic space form.

Gupta, Ram Shankar, Haider, S.M.Khrusheed, Sharfuddin, A. (2006)

Balkan Journal of Geometry and its Applications (BJGA)

Slant surfaces of codimension two

Bang-Yen Chen, Yoshihiko Tazawa (1990)

Annales de la Faculté des sciences de Toulouse : Mathématiques

Slant surfaces with prescribed Gaussian curvature.

Chen, Bang-Yen, Vrancken, Luc (2002)

Balkan Journal of Geometry and its Applications (BJGA)

Slicing of generalized surfaces with curvature measures and diameter's estimate

Silvano Delladio (1996)

Annales Polonici Mathematici

We prove generalizations of Meusnier's theorem and Fenchel's inequality for a class of generalized surfaces with curvature measures. Moreover, we apply them to obtain a diameter estimate.

Small eigenvalues of Riemann surfaces and graphs.

Marc Burger (1990)

Mathematische Zeitschrift

Small eigenvalues on Riemann surfaces of genus 2.

Paul Schmutz (1991)

Inventiones mathematicae

Small eigenvalues on Y-pieces and on Riemann surfaces.

Paul Schmutz (1990)

Commentarii mathematici Helvetici

Small time heat kernel behavior on Riemannian complexes.

Pivarski, Melanie, Saloff-Coste, Laurent (2008)

The New York Journal of Mathematics [electronic only]

Smooth bundles of generalized half-densities

Daniel Canarutto (2000)

Archivum Mathematicum

Smooth bundles, whose fibres are distribution spaces, are introduced according to the notion of smoothness due to Frölicher. Some fundamental notions of differential geometry, such as tangent and jet spaces, Frölicher-Nijenhuis bracket, connections and curvature, are suitably generalized. It is also shown that a classical connection on a finite-dimensional bundle naturally determines a connection on an associated distributional bundle.

Smooth, but not Complex-Analytic Pluripolar Sets.

J.E. Fornaess, K. Diederich (1982)

Manuscripta mathematica

Smooth Equivariant Triangulations of G-Manifolds for G a Finite Group.

Sören Illman (1978)

Mathematische Annalen

Smooth lines on projective planes over two-dimensional algebras and submanifolds with degenerate Gauss maps.

Akivis, Maks A., Goldberg, Vladislav V. (2003)

Beiträge zur Algebra und Geometrie

Smooth metric measure spaces, quasi-Einstein metrics, and tractors

Jeffrey Case (2012)

Open Mathematics

We introduce the tractor formalism from conformal geometry to the study of smooth metric measure spaces. In particular, this gives rise to a correspondence between quasi-Einstein metrics and parallel sections of certain tractor bundles. We use this formulation to give a sharp upper bound on the dimension of the vector space of quasi-Einstein metrics, providing a different perspective on some recent results of He, Petersen and Wylie.

Smooth quasigroups and loops: forty-five years of incredible growth

Lev Vasilʹevich Sabinin (2000)

Commentationes Mathematicae Universitatis Carolinae

The remarkable development of the theory of smooth quasigroups is surveyed.

Smooth static solutions of the spherically symmetric Vlasov-Einstein system

G. Rein, A. D. Rendall (1993)

Annales de l'I.H.P. Physique théorique

Smoothing of real algebraic hypersurfaces by rigid isotopies

Alexander Nabutovsky (1991)

Annales de l'institut Fourier

Define for a smooth compact hypersurface $M^{n}$ of $R^{n + 1}$ its crumpleness $κ (M^{n})$ as the ratio ${diam}_{R^{n + 1}} (M^{n}) / r (M^{n})$ , where $r (M^{n})$ is the distance from $M^{n}$ to its central set. (In other words, $r (M^{n})$ is the maximal radius of an open non-selfintersecting tube around $M^{n}$ in $R^{n + 1} .)$ We prove that any $n$ -dimensional non-singular compact algebraic hypersurface of degree $d$ is rigidly isotopic to an algebraic hypersurface of degree $d$ and of crumpleness $\leq exp (c (n) d^{α (n) d^{n + 1}})$ . Here $c (n)$ , $α (n)$ depend only on $n$ , and rigid isotopy means an isotopy passing only through hypersurfaces of degree...

Smoothing Riemannian Metrics.

Ernst A. Ruh, Josef Bemelmans, Min-Oo (1984/1985)

Mathematische Zeitschrift

Smoothing Riemannian metrics with Ricci curvature bounds.

X. Dai, G. Wie, R. Ye (1996)

Manuscripta mathematica

Smoothness and geometry of boundaries associated to skeletal structures I: sufficient conditions for smoothness

James Damon (2003)

Annales de l’institut Fourier

We introduce a skeletal structure $(M, U)$ in $ℝ^{n + 1}$ , which is an $n$ - dimensional Whitney stratified set $M$ on which is defined a multivalued “radial vector field” $U$ . This is an extension of notion of the Blum medial axis of a region in $ℝ^{n + 1}$ with generic smooth boundary. For such a skeletal structure there is defined an “associated boundary” $ℬ$ . We introduce geometric invariants of the radial vector field $U$ on $M$ and a “radial flow” from $M$ to $ℬ$ . Together these allow us to provide sufficient numerical conditions for...

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