Asymptotic Stability of Harmonic Maps on the Hyperbolic Plane Under the Schrödinger Maps Evolution

Abstract: We consider the Cauchy problem for the Schrödinger maps evolution when the domain is the hyperbolic plane. An interesting feature of this problem compared to the more widely studied case on the Euclidean plane is the existence of a rich new family of finite energy harmonic maps. These are stationary solutions, and thus play an important role in the dynamics of Schrödinger maps. The main result of this article is the asymptotic stability of (some of) such harmonic maps under the Schrödinger maps evolution. More… Show more

“…See the work of Krieger-Schlag [45] and more recently Krieger-Miao-Schlag [44] for instance. See also the many works of Lawrie-Oh-Shahshahani [46,47,48,49,50,51] for treatment of geometric wave and Schrödinger equations in hyperbolic space. Pointwise decay estimates also play a role in obtaining enhanced existence times using normal form methods, see for instance recent works of Ifrim-Tataru [41] and Germain-Pusateri-Rousset [23].…”

Pointwise dispersive estimates for Schrödinger operators on product cones

“…See the work of Krieger-Schlag [45] and more recently Krieger-Miao-Schlag [44] for instance. See also the many works of Lawrie-Oh-Shahshahani [46,47,48,49,50,51] for treatment of geometric wave and Schrödinger equations in hyperbolic space. Pointwise decay estimates also play a role in obtaining enhanced existence times using normal form methods, see for instance recent works of Ifrim-Tataru [41] and Germain-Pusateri-Rousset [23].…”

Pointwise dispersive estimates for Schrödinger operators on product cones