〈Tab〉 for a two-dimensional Vaidya space-time

We study the two-dimensional Navier-Stokes equations with periodic boundary conditions perturbed by a space-time white noise. It is shown that, although the solution is not expected to be smooth, the nonlinear term can be defined without changing the equation. We first construct a stationary marting

Different models of field theories in two dimensions can be described by the action Tr .F. In the presence of a curved background, we construct local supersymmetry-like transformations under which the action is invariant. Furthermore, by analyzing the cohomology of the theory we show the absence of

Wilson loops are formally defined as \(e^{i f_{C} \cdot A \cdot x d y}\) where \(C\) is a closed curve and \(A\) is the electromagnetic vector potential. In this paper the case of two-dimensional Euclidean space-time is investigated. \(A\) satisfies the equation \(\partial A=F, F\) being generalized