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ALGEBRAIC AND GEOMETRIC PROPERTIES OF LATTICE WALKS WITH STEPS OF EQUAL LENGTH

Part of: Forms and linear algebraic groups Elementary number theory Discrete geometry Abelian groups

Published online by Cambridge University Press:  02 November 2016

KRZYSZTOF KOŁODZIEJCZYK  and
RAFAŁ SAŁAPATA
KRZYSZTOF KOŁODZIEJCZYK*
Affiliation:
Faculty of Pure and Applied Mathematics, Wrocław University of Science and Technology, Wybrzeże Wyspiańskiego 27, 50-370 Wrocław, Poland email krzysztof.kolodziejczyk@pwr.edu.pl
RAFAŁ SAŁAPATA
Affiliation:
Faculty of Pure and Applied Mathematics, Wrocław University of Science and Technology, Wybrzeże Wyspiańskiego 27, 50-370 Wrocław, Poland email rafal.salapata@pwr.edu.pl
*
krzysztof.kolodziejczyk@pwr.edu.pl
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Abstract

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A lattice walk with all steps having the same length $d$ is called a $d$-walk. Denote by ${\mathcal{T}}_{d}$ the terminal set, that is, the set of all lattice points that can be reached from the origin by means of a $d$-walk. We examine some geometric and algebraic properties of the terminal set. After observing that $({\mathcal{T}}_{d},+)$ is a normal subgroup of the group $(\mathbb{Z}^{N},+)$, we ask questions about the quotient group $\mathbb{Z}^{N}/{\mathcal{T}}_{d}$ and give the number of elements of $\mathbb{Z}^{2}/{\mathcal{T}}_{d}$ in terms of $d$. To establish this result, we use several consequences of Fermat’s theorem about representations of prime numbers of the form $4k+1$ as the sum of two squares. One of the consequences is the fact, observed by Sierpiński, that every natural power of such a prime number has exactly one relatively prime representation. We provide explicit formulas for the relatively prime integers in this representation.

Keywords

lattice d-walkterminal setsublatticequotient groupprime numbersum of squares

MSC classification

Primary: 52C05: Lattices and convex bodies in $2$ dimensions
Secondary: 11A41: Primes 11E25: Sums of squares and representations by other particular quadratic forms 20K27: Subgroups
Type
Research Article
Information
Bulletin of the Australian Mathematical Society , Volume 95 , Issue 2 , April 2017 , pp. 338 - 346
Copyright
© 2016 Australian Mathematical Publishing Association Inc. 

Footnotes

The second author has been partially supported by NCN grant No. 2014/15/B/ST1/00166.

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