An equation for the solubility surface of ternary “sub-regular” solutions

## Abstract We consider the Cauchy problem for second‐order strictly hyperbolic equations with time‐depending non‐regular coefficients. There is a possibility that singular coefficients make a regularity loss for the solution. The main purpose of this paper is to derive an optimal singularity for t

In this paper we "nd su$cient conditions, involving only the pressure, that ensure the regularity of weak solutions to the Navier}Stokes equations. Conditions involving only the pressure were previously obtained in [7,4]. Following a remark in this last reference we improve, in particular, Kaniel's

We propose a method for computing the regular singular formal solutions of a linear differential system in the neighbourhood of a singular point. This algorithm avoids the use of cyclic vectors and has been implemented † in the computer algebra system Maple.

In this paper we show that every variational solution of the steady-state Boussinesq equations (u, p, ) with thermocapillarity e!ect on the surface of the liquid has the following regularity: u3H( ), p3H( ), 3H( ) under appropriate hypotheses on the angles of the &2-D' container (a cross-section of