On maximal asymptotic nonbases of zero density

1% wus-ensemble 48 de l'ensemble S de toutes les parties finies dc N est une U-base asymptotiyue d'ordre h si chaque ClCment de S, B un nombre tini d'exceprions p&s, est l'union de h, pa; nkessairemcnt distincts, ilQments de $38. On dkmontre qu'une partie @ de 9 qui n'est pas une Ill-base asymptotiq

In this note, we generalize the concepts of minimal bases and maximal nonbases for integers, and prove some existence theorems for the generalized minimal bases and maximal nonbases, which generalize some results of Stiihr, Deza and Erdds, and Nathanson.

Let {X i } be a sequence of i.i.d. random variables. Put M n = max 06k6n-j (X k+1 + • • • + X k+j )I kj , where j = j n 6 n, I kj denotes the indicator function of the event {X k+1 ¿ 0; : : : ; X k+j ¿ 0}. If X i is a gain in the ith repetition of a game of chance then M n is the maximal gain over r

We strengthen a theorem of Kuijlaars and Serra Capizzano on the distribution of zeros of a sequence of orthogonal polynomials {p n } ∞ n=1 for which the coefficients in the three term recurrence relation are clustered at finite points. The proof uses a matrix argument motivated by a theorem of Tyrty