Propagation of radius of analyticity for solutions to a fourth-order nonlinear Schrodinger equation

We prove that the uniform radius of spatial analyticity sigma(t) of solution at time t to the one-dimensional fourth-order nonlinear Schrodinger equation i partial derivative(t)u - partial derivative(4)(x)xu = vertical bar u vertical bar(2)u cannot decay faster than 1/root t for large t, given that the initial data are analytic with fixed radius sigma(0). The main ingredients in the proof are a modified Gevrey space, a method of approximate conservation law, and a Strichartz estimate for free wave associated with the equation.