1. Interval-type theorems concerning means
- Author
-
Paweł Pasteczka
- Subjects
Interval (mathematics) ,Type (model theory) ,01 natural sciences ,Combinatorics ,sandwich theorems ,0103 physical sciences ,Classical Analysis and ODEs (math.CA) ,FOS: Mathematics ,squeeze theorem ,0101 mathematics ,Mathematics ,Real number ,26E60, 26D15 ,lcsh:Mathematics ,010102 general mathematics ,Hardy means ,Order (ring theory) ,General Medicine ,distance between means ,lcsh:QA1-939 ,Functional Analysis (math.FA) ,Mathematics - Functional Analysis ,Mathematics - Classical Analysis and ODEs ,Natural transformation ,Metric (mathematics) ,means ,010307 mathematical physics - Abstract
Each family $\mathcal{M}$ of means has a natural, partial order (point-wise order), that is $M \le N$ iff $M(x) \le N(x)$ for all admissible $x$. In this setting we can introduce the notion of interval-type set (a subset $\mathcal{I} \subset \mathcal{M}$ such that whenever $M \le P \le N$ for some $M,\,N \in \mathcal{I}$ and $P \in \mathcal{M}$ then $P \in \mathcal{I}$). For example, in the case of power means there exists a natural isomorphism between interval-type sets and intervals contained in real numbers. Nevertheless there appear a number of interesting objects for a families which cannot be linearly ordered. In the present paper we consider this property for Gini means and Hardy means. Moreover some results concerning $L^\infty$ metric among (abstract) means will be obtained., Comment: 8 pages
- Published
- 2018