Hamiltonian F-stability of complete Lagrangian self-shrinkers
Abstract
In this paper, we study the Lagrangian F-stability and Hamiltonian F-stability of Lagrangian self-shrinkers. We prove a characterization theorem for the Hamiltonian F-stability of n-dimensional complete Lagrangian self-shrinkers without boundary, with polynomial volume growth and with the second fundamental form satisfying the condition that there exist constants C0>0 and <116n such that |A|2≤ C0+ |x|2. We characterize the Hamiltonian F-stablity by the eigenvalues and eigenspaces of the drifted Laplacian.
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