The deformation of symplectic critical surfaces in a K\"ahler surface-I

Abstract

In this paper we derive the Euler-Lagrange equation of the functional Lβ=∫1βαdμ, ~~β≠ -1 in the class of symplectic surfaces. It is 3α H=β(J(J∇α)), which is an elliptic equation when β≥ 0. We call such a surface a β-symplectic critical surface. We first study the properties for each fixed β-symplectic critical surface and then prove that the set of β where there is a stable β-symplectic critical surface is open. We believe it should be also closed. As a precise example, we study rotationally symmetric β-symplectic critical surfaces in C2 carefully .