On the Solvability of a Boundary Value Problem for Model Equations of Linearly Viscous Materials

## Communicated by W. Spro¨ßig In this paper, we study a system of biharmonic equations coupled by the boundary conditions. These boundary conditions contain some combinations of the values, div, curl, and grad. Applications in mathematical physics are possible and the investigations will be done

This problem was studied earlier by Gupta, Ntouyas, and Tsamatos when ␣ F 1 and when ␣ ) 1 with ␣ -1. In the general case this problem was studied by Gupta as a multi-point boundary value problem. In this paper sharper existence conditions are obtained for the solvability of the above boundary value

## ˙Ѩt Ž . tions on the scalar function f s will be given below. We rely here on the w x Ž w x Ž . . Berger approach to large deflection 1 , in 1 f s is a linear function .

In this paper we show that the set of solutions of the Nicoletti or Floquet boundary value problems for hyperbolic differential equations is nonempty compact and convex. We apply the Browder᎐Godhe᎐Kirk fixed point theorem.

## Abstract In this paper we establish some results regarding the existence of solution on __L__~1~ spaces to a nonlinear boundary value problem originally proposed by Lebowitz and Rubinow (__J. Math. Biol.__ 1974; **1**:17–36) to model an age‐structured proliferating cell population. Our approach,

We consider a mixed boundary-value problem for the Poisson equation in a thick junction X e which is the union of a domain X 0 and a large number of e-periodically situated thin cylinders. The non-uniform Signorini conditions are given on the lateral surfaces of the cylinders. The asymptotic analysi