On The Role of The Polynomial (X → Y) → Y in Some Implicative Algebras

Let \(F(x, y), G(x, y) \in \mathbf{Z}[x, y]\) be polynomials of degree \(n\) and \(m\), respectively. Assume, that \(F\) is homogeneous and \(n-m \geq 3\). We give a fast algorithm for the resolution of the inequality \(|F(x, y)| \leq|G(x, y)|\) in \(x, y \in \mathbf{Z}, \max (|x|,|y|)<C\). We illus

## Abstract A 33‐year‐old man had azoospermia and tubular atrophy as in the Klinefelter syndrome but short stature. He had a 46,X,t(X/Y) (Xqter→p22.3::Yp11→Yqter) translocation and was H‐Y antigen‐positive. This excludes one of the genes controlling H‐Y antigen from the terminal portion of the shor

This paper continues the investigation of the arithmetic of the curves C A : y 2 =x a +A and their Jacobians J A , where a is an odd prime and A is an integer not divisible by a, which was begun in an earlier paper. In the first part, we sketch how to extend the formula for the dimension of a certai

The splice quotients, defined by W. D. Neumann and J. Wahl, are an interesting class of normal surface singularities with rational homology sphere links. In general, it is difficult to determine whether or not a singularity is analytically isomorphic to a splice quotient, although there are certain