On the Gevrey ultradifferentiability of weak solutions of an abstract evolution equation with a scalar type spectral operator

Abstract

Found are conditions on a scalar type spectral operator A in a complex Banach space necessary and sufficient for all weak solutions of the evolution equation equation* y'(t)=Ay(t),\ t 0, equation* to be strongly Gevrey ultradifferentiable of order β 1, in particular analytic or entire, on [0,∞). Certain inherent smoothness improvement effects are analyzed.