Analysis of $CP^{N-1}$ sigma models via projective structure

TL;DR

This paper investigates rank-1 projector solutions to the integrable $CP^{N-1}$ sigma model, exploring their geometric interpretation via immersed surfaces and providing gauge-invariant proofs and conditions linking surfaces to the model.

Contribution

The paper offers a gauge-invariant analysis of $CP^{N-1}$ solutions, generalizes existing proofs, and characterizes surfaces associated with the model through geometric and topological properties.

Findings

Solutions can be expressed via raising/lowering operators on holomorphic/antiholomorphic functions.

Surfaces are conformally parameterized with area equal to the model's action.

Necessary and sufficient conditions relate surfaces to the $CP^{N-1}$ sigma model.

Abstract

In this paper, we study rank-1 projector solutions to the completely integrable Euclidean $CP^{N-1}$ sigma model in two dimension and their associated surfaces immersed in the $su(N)$ Lie algebra. We reinterpret and generalize the proof of A.M. Din and W.J. Zakzrewski [1980] that any solution for the $CP^{N-1}$$ sigma model defined on the Riemann sphere with finite action can be written as a raising operator acting on a holomorphic one, or a lowering operator acting on a antiholomorphic one. Our proof is formulated in terms of rank-1 Hermitian projectors so it is explicitly gauge invariant and gives new results on the structure of the corresponding sequence of rank-1 projectors. Next, we analyze surfaces associated with the $CP^{N-1}$ models defined using the Generalized Weierstrass Formula for immersion, introduced by B. Konopelchenko [1996]. We show that the surfaces are conformally parameterized by the Lagrangian density with finite area equal to the action of the model and express several other geometrical characteristics of the surface in terms of the Lagrangian density and topological charge density of the model. We demonstrate that any such surface must be orthogonal to the sequence of projectors defined by repeated application of the raising and lowering operators. Finally, we provide necessary and sufficient conditions that a surface be related to a $CP^{N-1}$ sigma model.