つくばリポジトリ JIP 25 741

In Section 4 we define what it means for an edge to be tight with respect to a real number distinct from the valency of the graph, establish some basic properties and, in Section 5,

In this section we provide, as consequence of Theorem 1, a method to construct all those Kleinian groups containing a Schottky group as a normal subgroup of finite order (called in

In this work, we have applied Feng’s first-integral method to the two-component generalization of the reduced Ostrovsky equation, and found some new traveling wave solutions,

Thus, we use the results both to prove existence and uniqueness of exponentially asymptotically stable periodic orbits and to determine a part of their basin of attraction.. Let

, 6, then L(7) 6= 0; the origin is a fine focus of maximum order seven, at most seven small amplitude limit cycles can be bifurcated from the origin.. Sufficient

Next, we prove bounds for the dimensions of p-adic MLV-spaces in Section 3, assuming results in Section 4, and make a conjecture about a special element in the motivic Galois group

In Section 2, we discuss existence and uniqueness of a solution to problem (1.1). Section 3 deals with its discretization by the standard finite element method where, under a

The new, quantitative version 3.3 (i) of the Combi- natorial Nullstellensatz is, for example, used in Section 5, where we apply it to the matrix polynomial – a generalization of