A note on the boundary value problem arising in free convection in porous media

## Abstract This paper revisits the fundamental problem of free convection heat and mass transfer over a heated vertical surface embedded in a porous medium using analytical techniques. An integral procedure is applied to the boundary layer similar equation for the combined heat and mass transfer f

## Abstract The existence of a weak solution of a two‐dimensional non‐stationary free‐boundary problem related to flame propagation is established. The main feature of the problem is that the nonlinear coupling of the two parabolic equations occur on the free boundary and has exponential growth.

Instability of a certain flow between heated vertical planes arises when a convective parameter y exceeds a critical value yC obtainedfrom the solution of a third-order eigenvalue problem. This problem involves a logarithmic singularity at the origin and an accurate determination of yC is achieved b

## 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,