A characterization of the Radon transform's range by a system of PDEs

BjGmer, A. and J. Karlander, Invertibility of the base Radon transform of a matroid, Discrete Mathematics 108 (1992) 139-147. Let M be a matroid of rank r on n elements and let F be a field. Assume that either char F = 0 or char F > r. It is shown that the point-base incidence matrix of M has rank

## Abstract Physical optics (PO) is a well‐known asymptotic technique for evaluating the fields scattered from an object. Evaluation of a surface integral forms the crux of this technique. In this paper, the PO integral is formulated for plane‐wave incidence and far‐field observation. Then, this in

When \(k<n / 2\), the incidence matrix of rank- \(k\) versus rank- \((k+1)\) partitions in the partition lattice has maximum rank. 1993 Academic Press, Inc.

Let K represent either the real or the complex numbers. Let P k , k=1, 2, ..., r be constant coefficient (with coefficients from K) polynomials in n variables and let r] be the set of all polynomial solutions (of degree M) to this system of partial differential equations. We solve the problem of fi