Finitely Generated Algebras Associated with Rational Vector Fields

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

Let A be a PI-algebra over a field F. We study the asymptotic behavior of the sequence of codimensions c n (A) of A. We show that if A is finitely generated over F then Inv(A)=lim n Ä n c n (A) always exists and is an integer. We also obtain the following characterization of simple algebras: A is fi

## dedicated to professor jack k. hale on the occasion of his 70th birthday We present three main results. The first two provide sufficient conditions in order that a planar polynomial vector field in C 2 has a rational first integral, and the third one studies the number of multiple points that a

It is known that Drinfeld modular curves can be used to construct asymptotically optimal towers of curves over finite fields. Using reductions of the Drinfeld modular curves X 0 ðnÞ, we try to find individual curves over finite fields with many rational points. The main idea is to divide by an Atkin

Let R[:]=R[: 1 , : 2 , ..., : n ] (where : 1 =1) be a real, unitary, finitely generated, commutative, and associative algebra. We consider functions We impose a total order on an algorithmically defined basis B for R[:]. The resulting algebra and ordered basis will be written as (R[:], <). We then