On a theorem in the geometry of numbers in a space of Laurent series

Niederhausen, H., Factorials and Stirling numbers in the algebra of formal Laurent series, Discrete Mathematics 90 (1991) 53-62. In the algebra of formal Laurent series, the falling factoral powers x(") are generalized to {x}'") for all integers n. The Stirling coefficients map the standard basis o

In one of his papers [2], A. Neumaier constructed a rank 4 incidence geometry on which the alternating group of degree 8 acts flag-transitively. This geometry is quite important since its point residue is the famous A 7 -geometry which is known to be the only flag-transitive locally classical C 3 -g

We show that if \(G\) is a graph embedded on the torus \(S\) and each nonnullhomotopic closed curve on \(S\) intersects \(G\) at least \(r\) times, then \(G\) contains at least \(\left\lfloor\frac{3}{4} r\right\rfloor\) pairwise disjoint nonnullhomotopic circuits. The factor \(\frac{3}{4}\) is best

Kaplansky density theorem is extremely useful in dealing with \* -algebras of operators. This theorem says that if is a C \* -algebra of B(H) with a strong closure , then the unit ball 1 of is strongly dense in the unit ball 1 of . Many deep results for the operator algebra are deduced with this tec

B. deMathan (1970, Bull. Soc. Math. France Supl. Mem. 21) proved that Khintchine's Theorem has an analogue in the field of formal Laurent series. First, we show that in case of only one inequality this result can also be obtained by continued fraction theory. Then, we are interested in the number o