Martin Svensson scite author profile

Wood

2012

Commun. Math. Phys.

Abstract. We use filtrations of the Grassmannian model to produce explicit algebraic formulae for harmonic maps of finite uniton number from a Riemann surface to the unitary group for a general class of factorizations by unitons. We show how these specialize to give explicit formulae for harmonic maps into the special orthogonal and symplectic groups, real, complex and quaternionic Grassmannians, and the spaces SO(2m)/U(m) and Sp(n)/U(n), i.e., all the classical compact Lie groups and their inner symmetric spaces. Our methods also give explicit J 2 -holomorphic lifts for harmonic maps into Grassmannians and an explicit Iwasawa decomposition.

On the Strong Coupling Limit of the Faddeev-Hopf Model

Speight

2007

Commun. Math. Phys.

Abstract. The variational calculus for the Faddeev-Hopf model on a general Riemannian domain, with general Kähler target space, is studied in the strong coupling limit. In this limit, the model has key similarities with pure Yang-Mills theory, namely conformal invariance in dimension 4 and an infinite dimensional symmetry group. The first and second variation formulae are calculated and several examples of stable solutions are obtained. In particular, it is proved that all immersive solutions are stable. Topological lower energy bounds are found in dimensions 2 and 4. An explicit description of the spectral behaviour of the Hopf map S 3 → S 2 is given, and a conjecture of Ward concerning the stability of this map in the full Faddeev-Hopf model is proved.

Harmonic morphisms from four-dimensional Lie groups

Gudmundsson

Journal of Geometry and Physics

2014

Some Global Minimizers of a Symplectic Dirichlet Energy

Speight

The Quarterly Journal of Mathematics

2010

Abstract. The variational problem for the functional F = 1 2 M ϕ * ω 2 is considered, where ϕ : (M, g) → (N, ω) maps a Riemannian manifold to a symplectic manifold. This functional arises in theoretical physics as the strong coupling limit of the Faddeev-Hopf energy, and may be regarded as a symplectic analogue of the Dirichlet energy familiar from harmonic map theory. The Hopf fibration π : S 3 → S 2 is known to be a locally stable critical point of F . It is proved here that π in fact minimizes F in its homotopy class and this result is extended to the case where S 3 is given the metric of the Berger's sphere. It is proved that if ϕ * ω is coclosed then ϕ is a critical point of F and minimizes F in its homotopy class. If M is a compact Riemann surface, it is proved that every critical point of F has ϕ * ω coclosed. A family of holomorphic homogeneous projections into Hermitian symmetric spaces is constructed and it is proved that these too minimize F in their homotopy class.