We discuss a simple model that applies to a random array of arbitrarily shaped grains, contained between rigid vertical walls, that predicts arching. That is, the pressure (or weight) of the column of grains saturates as its height increases. The average behavior of the model is solved through a discrete and a continuum analysis. We find a qualitative agreement, with Janssen's phenomenological result for arching. The saturating pressure grows with N-2, where N is the horizontal size of the system. Adjusting our numerical results to Janssen's model we find a relaxation depth that also grows with N-2. The results of the average behavior allow us to measure fluctuations
the relative fluctuation of the pressure goes to zero as N-1/2 The continuum analysis shows that the weight inside the column satisfies a diffusion equation with a source term and particular boundary conditions which leads to a complete solution. The first-order approximation is similar to Janssen's result.