The existence and uniqueness of analytic solutions for a moving boundary problem for Hele-Shaw flows in the plane

The partial derivatives of the function which maps the auxiliary plane into the physical plane are rational functions for all known exact solutions of the problem of fingering in a Hele-Shaw cell. Using methods of complex analysis a general form of the solution is constructed which possesses this pr

A question of the existence of fiolutions of boundary-value problems for differential equations with parameter was considered by many authors, see [1]-[3] and [5]-[9]. The analogous problems for differential equations with a deviated argument was discussed in [8] and [3]. The purpose of this paper

## Abstract This paper is concerned with the question of necessary and sufficient conditions to find a vector field __V__∈ Γ(__TM__) solving the equation div __V__ = Φ under inhomogeneous boundary conditions __V__|~∂M~ = Z|~∂M~ with __Z__∈ Γ (__TM__) An existence and regularity result is given for

## Communicated by G. F. Roach We consider the Cauchy problem for the damped Boussinesq equation governing long wave propagation in a viscous fluid of small depth. For the cases of one, two, and three space dimensions local in time existence and uniqueness of a solution is proved. We show that for