Hannusch, Carolin and Pethő, Attila (2022) Rotation on the digital plane. PERIODICA MATHEMATICA HUNGARICA. ISSN 0031-5303
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Abstract
Let Aϕ denote the matrix of rotation with angle ϕ of the Euclidean plane, FLOOR the function, which rounds a real point to the nearest lattice point down on the left and ROUND the function for rounding off a vector to the nearest node of the lattice. We prove under the natural assumption ϕ 6= k π 2 that the functions F LOOR ◦ Aϕ and ROUND ◦ Aϕ are neither surjective nor injective. More precisely we prove lower and upper estimates for the size of the sets of lattice points, which are the image of two lattice points as well as of lattice points, which have no preimages. It turns out that the density of that sets are positive except when sin ϕ 6= ± cos ϕ + r, r ∈ Q.
| Item Type: | Article |
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| Subjects: | Q Science / természettudomány > QA Mathematics / matematika |
| SWORD Depositor: | MTMT SWORD |
| Depositing User: | MTMT SWORD |
| Date Deposited: | 25 Nov 2022 08:41 |
| Last Modified: | 25 Nov 2022 08:41 |
| URI: | http://real.mtak.hu/id/eprint/153923 |
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