On some indeterminate moment problems for measures on a geometric progression

In the paper, the solution of a non-linear structural mechanical problem is seen as a set of points along a curve in the displacement space, resulting from a continuous variation of a load parameter. The state of the structure at a specified point on the path is described by a tangent vector describ

Let p be a probability measure on 2 x 2 stochastic matrices with finite support such that the sequence pn 3 the nth convolution power of p, weakly converges to a probability measure X whose support consists of 2 x 2 stochastic matrices with identical rows. The probability measure A can, therefore, b

The papers deals with a finite moment problem for rational matrix-valued functions. We present a necessary and sufficient condition for the solvability of the problem. In the nondegenerate case we construct a particular solution which has interesting extremal properties.

We conjecture that every oriented graph G on n vertices with + (G), -(G) ≥ 5n / 12 contains the square of a Hamilton cycle. We also give a conjectural bound on the minimum semidegree which ensures a perfect packing of transitive triangles in an oriented graph. A link between Ramsey numbers and perfe