Monodromy of the image of the mapping C2→ C3

Let :~ be a commutative ring with l, and let A be an m × n matrix over .8 with determinantal rank r >~ 1. If 1 is in ideal of,8 generated by the r × r minors of A, then every inner inverse of A is in the image of a linear mapping .~(;!)x(,;') ---, .~ ..... that is specified in terms of the classical

The q-invariant of Riemannian 3-manifolds is defined by means of the spectrum of a certain elliptic operator. In this paper, we give a geometric interpretation of the deviation from the multiplicativity of the q-invariant for finite coverings. We then apply it to mapping tori with finite monodromies

S. N. Chow and J. A. Yorke have proposed in abstract terms an algorithm for computing fixed points of C 2 maps that is globally convergent with probability one. A numerical implementation of that algorithm is presented here, where careful attention has been paid to computational efficiency, accuracy