Paul Smith
Published 2010-09-30, updated 2011-12-06Version 2
The caloric gauge was introduced by Tao with studying large data energy critical wave maps mapping from $\mathbf{R}^{2+1}$ to hyperbolic space $\mathbf{H}^m$ in view. In \cite{BIKT} Bejenaru, Ionescu, Kenig, and Tataru adapted the caloric gauge to the setting of Schr\"odinger maps from $\mathbf{R}^{d + 1}$ to the standard sphere $S^2 \hookrightarrow \mathbf{R}^3$ with initial data small in the critical Sobolev norm. Here we develop the caloric gauge in a bounded geometry setting with a construction valid up to the ground state energy.
Comments: 39 pages; Typos and argument for noncompact target manifolds corrected; Published form available at http://imrn.oxfordjournals.org/cgi/content/abstract/rnr169?ijkey=OXVb8Exb1XuXqLz&keytype=ref
Ground states and energy asymptotics of the nonlinear Schrödinger equation
Improved nonrelativistic limit for ground states of the Schrödinger and Hartree equations
Constrained energy minimization and ground states for NLS with point defects
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