Large Finite Sets

Various types of integrals with respect to signed fuzzy measures on finite sets with cardinality n can be presented as corresponding rules for partitioning the integrand. The partition can be expressed as an n-dimensional vector, whereas the signed fuzzy measure is also an n-dimensional vector. Thus

CONSTRUCTIVELY COMPLETE FINITE SETS $y MARK MANDELKERN in Las Cruces, New Mexico (U.S.A.)') l ) The author is indebted to FRED RICHMAN for several valuable suggestions. 7 Ztschr. f. math. Logik

An \((m, n)\)-separator of an infinite graph \(\Gamma\) is a smallest finite set of vertices whose deletion leaves at least \(m\) finite components and at least \(n\) infinite components. It is shown that a vertex of \(\Gamma\) of finite valence belongs to only finitely many \((0,2)\)-separators. Va

A large set of disjoint S(\*; t, k, v) designs, denoted by LS(\*; t, k, v), is a partition of k-subsets of a v-set into S(\*; t, k, v) designs. In this paper, we develop some recursive methods to construct large sets of t-designs. As an application, we construct infinite families of large sets of t-

ON THE mcuitsrvm-OF FINITE SISTS by ROSALD ITARRW in Newcastle upon Tync (England) $j 1 lritrodiiclion In this paprr n n nsgcct, is discussed of tlic relationship between rccursivity aiid intuitive dccitlalilit~~ hi the case of fiiiitc sets, which, altliougli rcfcrred to elsewhere in the literatuw (