Veronese subsequent analytic solutions of the CP2s sigma model equations described via Krawtchouk polynomials

Abstract

The objective of this paper is to establish a new relationship between the Veronese subsequent analytic solutions of the Euclidean CP2s sigma model in two dimensions and the orthogonal Krawtchouk polynomials. We show that such solutions of the CP2s model, defined on the Riemann sphere and having a finite action, can be explicitly parametrised in terms of these polynomials. We apply the obtained results to the analysis of surfaces associated with CP2s sigma models, defined using the generalized Weierstrass formula for immersion. We show that these surfaces are spheres immersed in the su(2s+1) Lie algebra, and express several other geometrical characteristics in terms of the Krawtchouk polynomials. Finally, a new connection between the su(2) spin-s representation and the CP2s model is explored in detail. It is shown that for any given holomorphic vector function in C2s+1 written as a Veronese sequence, it is possible to derive subsequent solutions of the CP2s model through algebraic recurrence relations which turn out to be simpler than the analytic relations known in the literature.