Minimization of non-linear separable convex functionals

## Abstract A method for the definition of cellular non‐linear networks able to find approximate minima of rather a large class of continuous functionals is illustrated through three examples. The method, based on the spatial discretization of continuous functionals and on the theory of potential f

A total dominating function (TDF) of a graph G = (V, E) is a function f : V → [0, 1] such that for each v ∈ V , the sum of f values over the open neighbourhood of v is at least one. Zero-one valued TDFs are precisely the characteristic functions of total dominating sets of G. We study the convexity

In this paper the previous hierarchical optimisation algorithm of Hassan and Singh for non-linear interconnected dynamical systems with separable cost functions is extended to the case of non-linear and non-separable cost functions. This ensures that any decomposition could be used and makes the new

## Abstract As a basic example, we consider the porous medium equation (__m__ > 1) equation image where Ω ⊂ ℝ^__N__^ is a bounded domain with the smooth boundary ∂Ω, and initial data $u\_0 \thinspace \varepsilon L^{\infty} \cap L^{1}$. It is well‐known from the 1970s that the PME admits separable