A Characterization Theorem for a Certain Class of Graded Lie Superalgebras

We describe the isomorphism classes of infinite-dimensional N-graded Lie algebras of maximal class over fields of odd characteristic generated by their first homogeneous component.

In this paper, we study Z × Z-graded Lie algebras A = i j∈Z A i j with dim A i j ≤ 1 satisfying (I) dim A ±1 0 = dim A 0 ±1 = 1, and A is generated by A ±1 0 A 0 ±1 ; (II) i∈Z A 0 j sl 2 ; (III) A -1 0 A 1 0 = 0, and adA ±1 0 act faithfully on j∈Z A j 1 . We show that A is necessarily isomorphic

## Abstract We consider the following generalization of the notion of a structure recursive relative to a set __X.__ A relational structure __A__ is said to be a Γ(__X__)‐structure if for each relation symbol __R__, the interpretation of __R__ in __A__ is ∑ relative to __X__, where β = Γ(__R__). We

## Abstract Compact metric spaces χ of such a kind, that 𝔹~__f__~ =𝔹(__X__), are characterized, 𝔹(__X__) is the σ‐field of BOREL sets and 𝔹~__f__~(__X__) is the field generated by all open subset of __X__. Our main result is Theorem 5: If χ is a compact metric space, then the following conditions a

## Abstract A new lower bound on the size of ϵ‐almost strongly universal~2~ classes of hash functions has recently been obtained by Stinson [8]. In this article we present a characterization of ϵ − ASU~2~ classes of hash functions meeting the Stinson bound in terms of combinatorial designs. © 1994