On area and side lengths of triangles in normed planes

Tom 115 / 2009

Gennadiy Averkov, Horst Martini Colloquium Mathematicum 115 (2009), 101-112 MSC: Primary 52A21, 52A10; Secondary 52B99. DOI: 10.4064/cm115-1-9


Let $\mathcal M^d$ be a $d$-dimensional normed space with norm $\|\,\cdot\, \|$ and let $B$ be the unit ball in $\mathcal M^d.$ Let us fix a Lebesgue measure $V_B$ in $\mathcal M^d$ with $V_B(B)=1.$ This measure will play the role of the volume in $\mathcal M^d$. We consider an arbitrary simplex $T$ in $\mathcal M^d$ with prescribed edge lengths. For the case $d=2$, sharp upper and lower bounds of $V_B(T)$ are determined. For $d\ge 3$ it is noticed that the tight lower bound of $V_B(T)$ is zero.


  • Gennadiy AverkovFaculty of Mathematics
    University of Magdeburg
    39106 Magdeburg, Germany
  • Horst MartiniFaculty of Mathematics
    University of Technology
    09107 Chemnitz, Germany

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