Friedrich, Thomas - Institut f�r Mathematik, Humboldt-Universit�t zu Berlin

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Friedrich, Thomas - Institut f�r Mathematik, Humboldt-Universit�t zu Berlin

ON THE HOLONOMY OF CONNECTIONS WITH SKEW-SYMMETRIC TORSION
Journal of Geometry and Physics 56 (2006) 24032414 www.elsevier.com/locate/jgp
EIGENVALUES ESTIMATES FOR THE DIRAC OPERATOR IN TERMS OF CODAZZI TENSORS
Some Remarks on the Hijazi Inequality and Generalizations of the Killing Equation for Spinors. \Lambda
G 2 MANIFOLDS WITH PARALLEL CHARACTERISTIC TORSION THOMAS FRIEDRICH
Cartan Spinor Bundles on Manifolds. \Lambda Thomas Friedrich, Berlin
Eigenvalue estimates of the Dirac operator depending on the Ricci tensor. \Lambda
On the Spinor Representation of Surfaces in Euclidean 3Space. \Lambda
ON TYPES OF NON-INTEGRABLE GEOMETRIES THOMAS FRIEDRICH
Clifford structures and spinor bundles Thomas Friedrich
THE CASIMIR OPERATOR OF A METRIC CONNECTION WITH SKEW-SYMMETRIC TORSION
Upper bounds for the first eigenvalue of the Dirac operator on surfaces. \Lambda
THE GAUSSIAN MEASURE ON ALGEBRAIC VARIETIES ILKA AGRICOLA AND THOMAS FRIEDRICH
THE SECOND DIRAC EIGENVALUE OF A NEARLY PARALLEL G2-MANIFOLD
Solutions of the EinsteinDirac Equation on Riemannian 3Manifolds with Constant Scalar Curvature. \Lambda
A NOTE ON FLAT METRIC CONNECTIONS WITH ANTISYMMETRIC TORSION
ALMOST CONTACT MANIFOLDS AND TYPE II STRING EQUATIONS THOMAS FRIEDRICH AND STEFAN IVANOV
New Solutions of the EinsteinDirac Equation in Dimension n = 3. \Lambda
KILLING SPINORS IN SUPERGRAVITY WITH 4-FLUXES ILKA AGRICOLA AND THOMAS FRIEDRICH
ALMOST HERMITIAN 6MANIFOLDS REVISITED BOGDAN ALEXANDROV, THOMAS FRIEDRICH, AND NILS SCHOEMANN
SPIN(9)-STRUCTURES AND CONNECTIONS WITH TOTALLY SKEW-SYMMETRIC TORSION
KILLING SPINOR EQUATIONS IN DIMENSION 7 AND GEOMETRY OF INTEGRABLE G 2 -MANIFOLDS
The EinsteinDirac Equation on Riemannian Spin Manifolds. \Lambda
EIGENVALUE ESTIMATES FOR THE DIRAC OPERATOR DEPENDING ON THE WEYL TENSOR
ON THE RICCI TENSOR IN TYPE II B STRING THEORY I. AGRICOLA, T. FRIEDRICH, P.A. NAGY, AND C. PUHLE
A geometric estimate for a periodic Schrodinger operator whose potential is the curvature of a spherical curve. \Lambda
math.DG/9812044 A comparison of the eigenvalues of the Dirac and Laplace
Weak Spin(9)Structures on 16dimensional Riemannian Manifolds. \Lambda
AHLER AND NEARLY PARALLEL G 2 STRUCTURES THOMAS FRIEDRICH
Parallel spinors and connections with skewsymmetric torsion in string theory \Lambda
On Nearly Parallel G 2 Structures Th. Friedrich (Berlin), I. Kath (Berlin), A. Moroianu (Paris), U. Semmelmann (Berlin)
EIGENVALUE ESTIMATES FOR DIRAC OPERATORS WITH PARALLEL CHARACTERISTIC TORSION
On Superminimal Surfaces. \Lambda Thomas Friedrich (Berlin)