TY - JOUR
T1 - Local Well-Posedness of the Skew Mean Curvature Flow for Small Data in d≧ 2 Dimensions
AU - Huang, Jiaxi
AU - Tataru, Daniel
N1 - Publisher Copyright:
© 2024, The Author(s).
PY - 2024/2
Y1 - 2024/2
N2 - The skew mean curvature flow is an evolution equation for d dimensional manifolds embedded in Rd+2 (or more generally, in a Riemannian manifold). It can be viewed as a Schrödinger analogue of the mean curvature flow, or alternatively as a quasilinear version of the Schrödinger Map equation. In an earlier paper, the authors introduced a harmonic/Coulomb gauge formulation of the problem, and used it to prove small data local well-posedness in dimensions d≧ 4 . In this article, we prove small data local well-posedness in low-regularity Sobolev spaces for the skew mean curvature flow in dimension d≧ 2 . This is achieved by introducing a new, heat gauge formulation of the equations, which turns out to be more robust in low dimensions.
AB - The skew mean curvature flow is an evolution equation for d dimensional manifolds embedded in Rd+2 (or more generally, in a Riemannian manifold). It can be viewed as a Schrödinger analogue of the mean curvature flow, or alternatively as a quasilinear version of the Schrödinger Map equation. In an earlier paper, the authors introduced a harmonic/Coulomb gauge formulation of the problem, and used it to prove small data local well-posedness in dimensions d≧ 4 . In this article, we prove small data local well-posedness in low-regularity Sobolev spaces for the skew mean curvature flow in dimension d≧ 2 . This is achieved by introducing a new, heat gauge formulation of the equations, which turns out to be more robust in low dimensions.
UR - http://www.scopus.com/inward/record.url?scp=85183037354&partnerID=8YFLogxK
U2 - 10.1007/s00205-023-01952-y
DO - 10.1007/s00205-023-01952-y
M3 - Article
AN - SCOPUS:85183037354
SN - 0003-9527
VL - 248
JO - Archive for Rational Mechanics and Analysis
JF - Archive for Rational Mechanics and Analysis
IS - 1
M1 - 10
ER -