TY - JOUR

T1 - The geometry of a vorticity model equation

AU - Escher, Joachim

AU - Kolev, Boris

AU - Wunsch, Marcus

PY - 2012/7

Y1 - 2012/7

N2 - We show that the modified Constantin-Lax-Majda equation modeling vortex and quasi-geostrophic dynamics [27] can be recast as the geodesic flow on the subgroup Diff∞1(S) of orientation-preserving diffeomorphisms φ ∈ Diff∞(S) such that Φ(1) = 1 equipped with the right-invariant metric induced by the homogeneous Sobolev norm Ḣ1/2. On the extended group of diffeomorphisms of Sobolev class Hk with k ≥ 2, this induces a weak Riemannian structure. We establish that the geodesic spray is smooth and we obtain local existence and uniqueness of the geodesics.

AB - We show that the modified Constantin-Lax-Majda equation modeling vortex and quasi-geostrophic dynamics [27] can be recast as the geodesic flow on the subgroup Diff∞1(S) of orientation-preserving diffeomorphisms φ ∈ Diff∞(S) such that Φ(1) = 1 equipped with the right-invariant metric induced by the homogeneous Sobolev norm Ḣ1/2. On the extended group of diffeomorphisms of Sobolev class Hk with k ≥ 2, this induces a weak Riemannian structure. We establish that the geodesic spray is smooth and we obtain local existence and uniqueness of the geodesics.

KW - CLM equation

KW - Euler equation on diffeomorphisms group of the circle

UR - http://www.scopus.com/inward/record.url?scp=84861936438&partnerID=8YFLogxK

U2 - 10.3934/cpaa.2012.11.1407

DO - 10.3934/cpaa.2012.11.1407

M3 - Article

AN - SCOPUS:84861936438

VL - 11

SP - 1407

EP - 1419

JO - Communications on Pure and Applied Analysis

JF - Communications on Pure and Applied Analysis

SN - 1534-0392

IS - 4

ER -