A Pincherle Theorem for Matrix Continued Fractions

Generalizations of S leszyn ski Pringheim's convergence criteria for ordinary continued fractions are proved for noncommutative continued fractions in Banach spaces. Some of them are exact generalizations of the scalar results.

Let F F be the family of continued fractions K a r1 , where a s yg , a s g x , ps2, 3, . . . , with 0 F g F 1, g fixed, and x F 1, p s py 1 p p p p p 2, 3, . . . . In this work, we derive upper bounds on the errors in the convergents of Ž . K a r1 that are uniform for F F, and optimal in the sense

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

## Abstract For block‐partitioned matrices of the __GI/M/__1 type, it has been shown by M. F. Neuts that the stationary probability vector, when it exists, has a matrix‐geometric form. We present here a new proof, which we believe to be the simplest available today.