Skeletons of stable maps II: superabundant geometries

Superabundant Numbers and the Riemann Hypothesis

For a lively exposition of this theorem and its connection to the Riemann Hypothesis see [5]. In this note, we propose a method that will establish explicit upper bounds for σ(n)/en log log n. Our main observation is that the least number violating the inequality (2) should be a superabundant number. A positive integer n is said to be superabundant if σ(m)/m < σ(n)/n for all m < n. The first 20...

Relative Compactness and Product Stable Quotient Maps

Knowledge-Based Interpretation of Road Maps Based on Symmetrical Skeletons

f' scanner raw.dataS ' 5 The objective of our research reported here is to show the various processing steps on all levels of a computer vision system required to interpret and describe road maps. First, the foundation for the recognition process is laid by computing two sets of distance skeletons. They are termed endoand exo-skeleton and are symmetrical with respect to the boundary between for...

Stable Exponentially Harmonic Maps Between Finsler Manifolds

Projective Representations II. Generalized chain geometries

In this paper, projective representations of generalized chain geometries are investigated, using the concepts and results of [5]. In particular, we study under which conditions such a projective representation maps the chains of a generalized chain geometry Σ(F,R) to reguli; this mainly depends on how the field F is embedded in the ring R. Moreover, we determine all bijective morphisms of a ce...