Power-associative algebras over a finite-characteristic field

We will exhibit certain continued fraction expansions for power series over a "nite "eld, with all the partial quotients of degree one, which are non-quadratic algebraic elements over the "eld of rational functions.

We present new, efficient algorithms for some fundamental computations with finitedimensional (but not necessarily commutative) associative algebras over finite fields. For a semisimple algebra A we show how to compute a complete Wedderburn decomposition of A as a direct sum of simple algebras, an i

Tensor product decomposition of algebras is known to be non-unique in many cases. But we know that a ⊕-indecomposable, finite-dimensional -algebra A has an essentially unique tensor factorization Thus the semiring of isomorphism classes of finite-dimensional -algebras is a polynomial semiring . Mor

We consider the continued fraction expansion of certain algebraic formal power series when the base field is finite. We are concerned with the property of the sequence of partial quotients being bounded or unbounded. We formalize the approach introduced by Baum and Sweet (1976), which applies to the