Localization and averaged Green's functions

We study discrete Green's functions and their relationship with discrete Laplace equations. Several methods for deriving Green's functions are discussed. Green's functions can be used to deal with diffusion-type problems on graphs, such as chipfiring, load balancing, and discrete Markov chains.

## Abstract In a series of conference and journal papers [1–3], Mei has laid the foundation of the theory of Maxwellian circuits, which asserts that any wire structure, such as a thin wire antenna or a microstrip device, can be represented by an equivalent circuit, the solution of which is identica

For randomly disordered crystalline multicomponent alloys the equivalence of Green function averagings over atom coordinates and over the assembly of all possible configurations in the thermodynamical limit is proved. The proof is valid for crystalline lattices of arbitrary dimension.

This paper presents a method of calculating the radiation field of a group of charges by using the "radiation Green's function." The latter represents a concept similar to that of the Green's function in the potential theory, only its application is directed to the time variables problems of the rad

A new formulation of pair theory in terms of integral equations involving an arbitrary choice of the two-particle reduced Green's function is presented.