Graph theoretical characterization of the dendritic fields

In this paper, we derive discrete variational principles of potential field problems by applying the difference form of Tellegen's theorem to the Graph-Theoretic Field Model (GTFM) of a field. The continuous model variational principle is then obtained from its discrete counterpart by the applicatio

## Background Recently, some remarkable connections between commutative algebra and combinatorics have been discovered. Among the main topics in this area are the concepts of Cohen-Macaulay and Gorenstein complexes. Recall some basic definitions. Let V = {x1, x2, . . . , x,} be a finite set and A

Quasi-power functionals have been traditionally derived through the Method of Weighted Residuals (MWR) and used as the starting formulation for the finite element method. In this paper, we derive similar but more complete functionals for potential fields through a novel approach. We first form discr

We examine a characterization of fixed modes in a frequency-domain framework based on the graphical representation of systems with multiple poles. We present a graph-theoretic characterization of the characteristic polynomials of closed-loop systems under arbitrary structural constraints. Based on t