Symmetric distance formula in kantor spaces and the radius of the circumscribed sphere of affinely independent set of points

Szabó, Péter G. N.; Budapest University of Technology and Economics

TÁMOP - 4.2.2.B-10/1–2010-0009

Hungarian Scientific Research Fund (grant No. OTKA 108947)

Budapest University of Technology and Economics (BME)

2014-04-01

kantor, mass point, circumscribed sphere, indefinit inner product

Mass points are very useful objects not only in physics but also in geometry. There are several ways to approach the mathematics of mass points. In this paper we give an independent interpretation. We define kantor space and kantors as the elements of it. We prove that this is a vector space and give a short overview of the types of bases and the connections between them. One of our important tools is the symmetric distance formula for kantors, which expresses the distance of two points in terms of their kantric coordinates. We introduce the kantric scalar product, which allows us to prove easily the existence of an orthogonal point and give a formula of the radius of the circumscribed sphere of affinely independent set of points, which is our main result.

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info:eu-repo/semantics/article

info:eu-repo/semantics/publishedVersion

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https://pp.bme.hu/eecs/article/view/2094

10.3311/PPee.2094

Periodica Polytechnica Electrical Engineering and Computer Science; Vol. 57, No. 4 (2013); 115-120

https://pp.bme.hu/eecs/article/view/2094/6316

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