Marcinkiewicz Integrals With Rough Kernels onLp(1 ≤ p ≤ 2)

We investigate the periodic character and the global stability of solutions of the Ž . Ž . equation y s p q y r qy q y with positive parameters and positive initial conditions.

pp. 573᎐586 have shown that Ž . < < Equ A , the lattice of all equivalences of a finite set A with A G 7, has a four-element generating set such that exactly two of the generators are compara-Ž . ble. In other words, these lattices are 1 q 1 q 2 -generated. We extend this result for many infinite s

Assume that d ≥ 4. Then there exists a d-dimensional dual hyperoval in PG(d + n, 2) for d + 1 ≤ n ≤ 3d -7.

Let R be an integral domain and ␣ an anti-integral element of degree d over R. w x w Ž . y1 x w x w y1 x It is shown that the equality R ␣ y a l R ␣ y a s R ␣ l R ␣ holds for any a g R with ␣ y a / 0.

In this paper we establish the existence of a configuration in PG(2n + 1, 2), n ≥ 2, a particular case of which is described in detail in [3]. The general configuration consists of two sets of 2 n + 1 spaces of dimension n related by a bijection so that two related n-spaces meet in an (n -1)-space,