Add to ORKGIn this paper we generalize special geometry to arbitrary signatures in target space. We formulate the definitions in a precise mathematical setting and give a translation to the coordinate formalism used in physics. For the projective case, we first discuss in detail projective Kähler manifolds, appearing in $N=1$ supergravity. We develop a new point of view based on the intrinsic construction of the line bundle. The topological properties are then derived and the Levi-Civita connection in the projective manifold is obtained as a particular projection of a Levi-Civita connection in a `mother' manifold with one extra complex dimension. The origin of this approach is in the superconformal formalism of physics, which is also explained in deta...
We obtain the bosonic Lagrangians of vector and hypermultiplets coupled to four-dimensional $\mathca...
In this thesis we are concerned with some aspects of special Kahler geometry arising in string theor...
AbstractWe describe a relation between statistical manifolds which combines conformally related metr...
In this paper we generalize special geometry to arbitrary signatures in target space. We formulate t...
The scalars in vector multiplets of N=2 supersymmetric theories in 4 dimensions exhibit `special Kae...
Special geometry is most known from 4-dimensional N=2 supergravity, though it contains also quaterni...
Special K\"ahler manifolds are defined by coupling of vector multiplets to N=2 supergravity. The cou...
Lay summary Topology studies the geometric properties of spaces that are preserved by continuous d...
Two Kähler metrics on a complex manifold are called c-projectively equivalent if their $J$-planar cu...
summary:This is a survey of recent contributions to the area of special K\"ahler geometry. A (pseudo...
A vector field on a Kähler manifold is called c-projective if its flow preserves the J-planar curves...
summary:This is a survey of recent contributions to the area of special K\"ahler geometry. A (pseudo...
The target space geometry of abelian vector multiplets in ${\cal N}= 2$ theories in four and five sp...
Kahler manifolds have a natural hyperkahler structure associated with (part of) its cotangent bundle...
In this thesis we are concerned with some aspects of special Kahler geometry arising in string theor...
We obtain the bosonic Lagrangians of vector and hypermultiplets coupled to four-dimensional $\mathca...
In this thesis we are concerned with some aspects of special Kahler geometry arising in string theor...
AbstractWe describe a relation between statistical manifolds which combines conformally related metr...
In this paper we generalize special geometry to arbitrary signatures in target space. We formulate t...
The scalars in vector multiplets of N=2 supersymmetric theories in 4 dimensions exhibit `special Kae...
Special geometry is most known from 4-dimensional N=2 supergravity, though it contains also quaterni...
Special K\"ahler manifolds are defined by coupling of vector multiplets to N=2 supergravity. The cou...
Lay summary Topology studies the geometric properties of spaces that are preserved by continuous d...
Two Kähler metrics on a complex manifold are called c-projectively equivalent if their $J$-planar cu...
summary:This is a survey of recent contributions to the area of special K\"ahler geometry. A (pseudo...
A vector field on a Kähler manifold is called c-projective if its flow preserves the J-planar curves...
summary:This is a survey of recent contributions to the area of special K\"ahler geometry. A (pseudo...
The target space geometry of abelian vector multiplets in ${\cal N}= 2$ theories in four and five sp...
Kahler manifolds have a natural hyperkahler structure associated with (part of) its cotangent bundle...
In this thesis we are concerned with some aspects of special Kahler geometry arising in string theor...
We obtain the bosonic Lagrangians of vector and hypermultiplets coupled to four-dimensional $\mathca...
In this thesis we are concerned with some aspects of special Kahler geometry arising in string theor...
AbstractWe describe a relation between statistical manifolds which combines conformally related metr...