Generating relations of the sub-algebras in the Duffin-Kemmer algebra

This paper introduces a reflective extension of the relational algebra. Reflection is achieved by storing and manipulating relational algebra programs as relations and by adding a LISP-like evaluation operation to the algebra. We first show that this extension, which we call the reflective algebra,

Let F be a field of characteristic p ) 0, L a generalized restricted Lie algebra Ž . over F, and P L the primitive p-envelope of L. A close relation between Ž . L-representations and P L -representations is established. In particular, the irreducible -reduced modules of L for any g L\* coincide with

bra generated by a given Bose Mesner algebra M and the associated dual Bose Mesner algebra M U . This algebra is now known as the Terwilliger algebra and is usually denoted by T. Terwilliger showed that each vanishing intersection number and Krein parameter of M gives rise to a relation on certain g

In this note, we prove a theorem on a new presentation for the algebra of the endomorphisms of the permutation representation (Yokonuma-Hecke algebra) of a simple Chevalley group with respect to a maximal unipotent subgroup. This presentation is given using certain nonstandard generators.

We give a decomposition of the actions of generalized Levi factors of a simple algebraic group on the Lie algebra of the algebraic group. ᮊ 1997 Academic Press J ␣ subgroup corresponding to ␣. Then L and L are closed connected reductive subgroups of G, L is the Levi factor of a parabolic subgroup, ˜