We consider the twistor descriptions of harmonic maps of the Riemann sphere into Kähler manifolds and Yang–Mills fields on four-dimensional Euclidean space. The motivation to study twistor interpretations of these objects comes from the harmonic spheres conjecture stating the existence of the bijective correspondence between based harmonic spheres in the loop space \(\Omega G\) of a compact Lie group \(G\) and the moduli space of Yang–Mills \(G\)-fields on \(\mathbb R^4\)
金沢大学人間社会研究域学校教育系We determine surfaces of genus zero in self-dual Einstein manifolds whose twistor li...
Let X ⊂ Rⁿ be a generalised annulus and consider the Dirichlet energy functional E[u; X] := 1/2∫X...
We lift the recently proposed theories of higher-spin self-dual Yang-Mills (SDYM) and gravity (SDGR)...
We consider the twistor descriptions of harmonic maps of the Riemann sphere into Kähler manifolds an...
Abstract: We consider the twistor descriptions of harmonic maps of the Riemann sphere into Kähler ma...
Twistor methods provide a powerful tool in the study of harmonic maps and harmonic morphisms. Indeed...
We introduce the twistor correspondence in 4-dimensions via a classical formula of Whittaker for har...
A harmonic map of the Riemann sphere into the unit 4-dimensional sphere has area 4 pi d for some pos...
A harmonic map of the Riemann sphere into the unit 4-dimensional sphere has area $4{\pi}d$ for some ...
We consider the Yang–Mills equations with a matrix gauge group G on the de Sitter dS4, anti-de Sitte...
AbstractWe give a proof that the sphere S6 does not admit an integrable orthogonal complex structure...
We show that a harmonic map from a Riemann surface into the exceptional symmetric space G₂/SO(4) has...
Abstract. There exist many four dimensional integrable theories. They include self-dual gauge and gr...
Abstract. The application of twistor methods to construct harmonic morphisms has proved to be a frui...
Harmonic maps are fundamental objects in differential geometry. They play an important role in study...
金沢大学人間社会研究域学校教育系We determine surfaces of genus zero in self-dual Einstein manifolds whose twistor li...
Let X ⊂ Rⁿ be a generalised annulus and consider the Dirichlet energy functional E[u; X] := 1/2∫X...
We lift the recently proposed theories of higher-spin self-dual Yang-Mills (SDYM) and gravity (SDGR)...
We consider the twistor descriptions of harmonic maps of the Riemann sphere into Kähler manifolds an...
Abstract: We consider the twistor descriptions of harmonic maps of the Riemann sphere into Kähler ma...
Twistor methods provide a powerful tool in the study of harmonic maps and harmonic morphisms. Indeed...
We introduce the twistor correspondence in 4-dimensions via a classical formula of Whittaker for har...
A harmonic map of the Riemann sphere into the unit 4-dimensional sphere has area 4 pi d for some pos...
A harmonic map of the Riemann sphere into the unit 4-dimensional sphere has area $4{\pi}d$ for some ...
We consider the Yang–Mills equations with a matrix gauge group G on the de Sitter dS4, anti-de Sitte...
AbstractWe give a proof that the sphere S6 does not admit an integrable orthogonal complex structure...
We show that a harmonic map from a Riemann surface into the exceptional symmetric space G₂/SO(4) has...
Abstract. There exist many four dimensional integrable theories. They include self-dual gauge and gr...
Abstract. The application of twistor methods to construct harmonic morphisms has proved to be a frui...
Harmonic maps are fundamental objects in differential geometry. They play an important role in study...
金沢大学人間社会研究域学校教育系We determine surfaces of genus zero in self-dual Einstein manifolds whose twistor li...
Let X ⊂ Rⁿ be a generalised annulus and consider the Dirichlet energy functional E[u; X] := 1/2∫X...
We lift the recently proposed theories of higher-spin self-dual Yang-Mills (SDYM) and gravity (SDGR)...