Add to ORKGIn this article we introduce a definition for the moduli space of equivariant minimal immersions of the Poincar\'e disc into a non-compact symmetric space, where the equivariance is with respect to representations of the fundamental group of a compact Riemann surface of genus at least two. We then study this moduli space for the non-compact symmetric space $\RH^n$ and show how $SO_0(n,1)$-Higgs bundles can be used to parametrise this space, making clear how the classical invariants (induced metric and second fundamental form) figure in this picture. We use this parametrisation to provide details of the moduli spaces for $\RH^3$ and $\RH^4$, and relate their structure to the structure of the corresponding Higgs bundle moduli spaces
The Dirac–Higgs bundle is a vector bundle with a natural connection on the moduli space of stable Hi...
AbstractWe calculate certain homotopy groups of the moduli spaces for representations of a compact o...
Version nr. 2 of the paper (2005/12/07) contains added due credits to the work of Burger, Iozzi and ...
In this article we introduce a definition for the moduli space of equivariant minimal immersions of ...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
Let Σ be a compact Riemann surface of genus g ⥠2. This thesis is dedicated to the study of certai...
Let Σ be a compact Riemann surface of genus g ≥ 2. This thesis is dedicated to the study of certain ...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
Higgs bundles and non-abelian Hodge theory provide holomorphic meth-ods with which to study the modu...
The notions of Hitchin systems and Higgs bundles (also called Higgs pairs) were introduced by N. Hit...
Abstract. Using the L2-norm of the Higgs field as a Morse function, we count the number of connected...
The Dirac–Higgs bundle is a vector bundle with a natural connection on the moduli space of stable Hi...
AbstractWe calculate certain homotopy groups of the moduli spaces for representations of a compact o...
Version nr. 2 of the paper (2005/12/07) contains added due credits to the work of Burger, Iozzi and ...
In this article we introduce a definition for the moduli space of equivariant minimal immersions of ...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
Let Σ be a compact Riemann surface of genus g ⥠2. This thesis is dedicated to the study of certai...
Let Σ be a compact Riemann surface of genus g ≥ 2. This thesis is dedicated to the study of certain ...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
This paper gives a construction for all minimal immersions ƒ of the Poincaré disc into the complex h...
Higgs bundles and non-abelian Hodge theory provide holomorphic meth-ods with which to study the modu...
The notions of Hitchin systems and Higgs bundles (also called Higgs pairs) were introduced by N. Hit...
Abstract. Using the L2-norm of the Higgs field as a Morse function, we count the number of connected...
The Dirac–Higgs bundle is a vector bundle with a natural connection on the moduli space of stable Hi...
AbstractWe calculate certain homotopy groups of the moduli spaces for representations of a compact o...
Version nr. 2 of the paper (2005/12/07) contains added due credits to the work of Burger, Iozzi and ...