Pages that link to "Item:Q5921032"
From MaRDI portal
The following pages link to Integral formulas for submanifolds and their applications (Q5921032):
Displaying 21 items.
- An extension of Hsiung-Minkowski formulas and some applications (Q254231) (← links)
- Isometric immersions with prefixed second order geometry in minimal codimension (Q326723) (← links)
- Conditions for a two-dimensional surface in \(E^5\) to be contained in a hypersphere or a hyperplane (Q382370) (← links)
- Stability of submanifolds with parallel mean curvature in calibrated manifolds (Q611925) (← links)
- Contact properties of codimension 2 submanifolds with flat normal bundle (Q616597) (← links)
- On complete submanifolds with bounded mean curvature (Q719407) (← links)
- On integral formulas for submanifolds of spaces of constant curvature and some applications (Q760924) (← links)
- Semiumbilics and 2-regular immersions of surfaces in Euclidean spaces (Q812503) (← links)
- Geometric contacts of surfaces immersed in \(\mathbb R^n,n\geqslant 5\) (Q1023418) (← links)
- Reduction of the codimension of regular isometric immersions (Q1151642) (← links)
- Umbilicity of surfaces with orthogonal asymptotic lines in \(\mathbb R^ 4\). (Q1608973) (← links)
- Yamabe and quasi-Yamabe solitons on Euclidean submanifolds (Q1756936) (← links)
- New Hsiung-Minkowski identities (Q1979219) (← links)
- Hopf-type theorem for self-shrinkers (Q2065875) (← links)
- Minkowski identities for hypersurfaces in constant sectional curvature manifolds (Q2328005) (← links)
- Integral formulas for compact submanifolds in Euclid space (Q3385985) (← links)
- Codazzi Tensors and Reducible Submanifolds (Q3928597) (← links)
- Space-like submanifolds of codimension two embedded in a Minkowski space (Q4162150) (← links)
- Euclidean submanifolds with conformal canonical vector field (Q4614830) (← links)
- Pseudo-umbilical submanifolds of codimension $3$ with constant mean curvature (Q4774695) (← links)
- My education in differential geometry and my indebtedness (Q4965209) (← links)