Co-rotating nearly parallel helical vortices with small cross-section in 3D incompressible Euler equations
Abstract
In this article, we consider clustered solutions to a semilinear elliptic equation in divergence form equation* cases -2div(K(x)∇ u)= (u-q||)p+,\ \ &x∈ ,\\ u=0,\ \ &x∈∂ cases equation* for small values of . Using Green's function of the elliptic operator -div(K(x)∇) and finite-dimensional reduction method, we prove that there exist clustered solutions with cluster point 0 and cluster distance || -12 whose small-structure is governed by some functional HN determined by K and q . As an application, we prove the existence of traveling-rotating helical vorticity fields to 3D incompressible Euler equations in infinite cylinders, whose support sets consist of helical tubes with small cross-section of radius and arbitrary circulation and concentrates near `` 2N '' and `` 2N+1 '' type of co-rotating helical solutions of nearly parallel vortex filaments model as 0 , which justifies the result in Klein, Majda and Damodaran [1995, JFM] and generalizes results in Guerra and Musso [arxiv: 2502.01470]. Several kinds of solutions such as ``2 asymmetric'', `` 2×2 asymmetric'' and `` 2×2+1 asymmetric'' type of co-rotating helical filaments are also considered.
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