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Schüth, Dorothee - Institut für Mathematik, Humboldt-Universität zu Berlin
CONTINUOUS FAMILIES OF ISOSPECTRAL METRICS ON SIMPLY CONNECTED MANIFOLDS
Constructing isospectral metrics via principal connections
ISOSPECTRAL ORBIFOLDS WITH DIFFERENT MAXIMAL ISOTROPY ORDERS
Analysis III Wintersemester 2010/11 Schuth
LOCAL SYMMETRY OF HARMONIC SPACES AS DETERMINED BY THE SPECTRA OF SMALL GEODESIC SPHERES
Analysis III Wintersemester 2010/11 Schuth
SPECTRAL ISOLATION OF BI-INVARIANT METRICS ON COMPACT CAROLYN S. GORDON
ON INAUDIBLE CURVATURE PROPERTIES OF CLOSED RIEMANNIAN TERESA ARIAS-MARCO AND DOROTHEE SCHUETH
INTEGRABILITY OF GEODESIC FLOWS AND ISOSPECTRALITY OF RIEMANNIAN MANIFOLDS
ISOSCATTERING DEFORMATIONS FOR COMPLETE MANIFOLDS OF NEGATIVE CURVATURE
ISOSPECTRAL AND ISOSCATTERING MANIFOLDS: A SURVEY OF TECHNIQUES AND EXAMPLES
ISOSPECTRAL POTENTIALS AND CONFORMALLY EQUIVALENT ISOSPECTRAL METRICS
Analysis III Wintersemester 2010/11 Schuth
Analysis III Wintersemester 2010/11 Schuth
ON THE "STANDARD" CONDITION FOR NONCOMPACT HOMOGENEOUS EINSTEIN SPACES
Analysis III Wintersemester 2010/11 Schuth
QUANTUM EQUIVALENT MAGNETIC FIELDS THAT ARE NOT CLASSICALLY CHAMPS MAGN ETIQUES QUANTIQUEMENT EQUIVALENTS MAIS
Analysis III Wintersemester 2010/11 Schuth
ISOSPECTRAL AND ISOSCATTERING MANIFOLDS: A SURVEY OF TECHNIQUES AND EXAMPLES
LOCAL SYMMETRY OF HARMONIC SPACES AS DETERMINED BY THE SPECTRA OF SMALL GEODESIC SPHERES
ON INAUDIBLE CURVATURE PROPERTIES OF CLOSED RIEMANNIAN MANIFOLDS
ISOSPECTRAL ORBIFOLDS WITH DIFFERENT MAXIMAL ISOTROPY ORDERS
ISOSPECTRAL MANIFOLDS WITH DIFFERENT LOCAL GEOMETRIES
ISOSCATTERING DEFORMATIONS FOR COMPLETE MANIFOLDS OF NEGATIVE CURVATURE
ON THE "STANDARD" CONDITION FOR NONCOMPACT HOMOGENEOUS EINSTEIN SPACES
SPECTRAL ISOLATION OF BI-INVARIANT METRICS ON COMPACT LIE GROUPS
ISOSPECTRAL POTENTIALS AND CONFORMALLY EQUIVALENT ISOSPECTRAL METRICS
QUANTUM EQUIVALENT MAGNETIC FIELDS THAT ARE NOT CLASSICALLY EQUIVALENT
Analysis III Wintersemester 2010/11 Schuth
Constructing isospectral metrics via principal connections
CONTINUOUS FAMILIES OF ISOSPECTRAL METRICS ON SIMPLY CONNECTED MANIFOLDS
INTEGRABILITY OF GEODESIC FLOWS AND ISOSPECTRALITY OF RIEMANNIAN MANIFOLDS
ISOSPECTRAL MANIFOLDS WITH DIFFERENT LOCAL GEOMETRIES
CLASSICAL EQUIVALENCE AND QUANTUM EQUIVALENCE OF MAGNETIC FIELDS ON FLAT TORI
CLASSICAL EQUIVALENCE AND QUANTUM EQUIVALENCE OF MAGNETIC FIELDS ON FLAT TORI
Seminar zur Differentialgeometrie Sommersemester 2012 Schuth
