http://swrc.ontoware.org/ontology#TechnicalReport
Ls in L and Sphinxes in Sphinx
en
Graduate School of Science and Engineering, Saitama University
Graduate School of Informatics and Engineering, The University of Electro-Communications
School of Information Science, Japan Advanced Institute of Science and Technology
Takashi Horiyama
Yoshio Okamoto
Ryuhei Uehara
We prove that L-shaped trominoes can tile the L-shaped tromino scaled by any positive integer, and Sphinx-shaped hexiamond can tile the Sphinx-shaped hexiamond scaled by any positive integer. We also give an upper bound and a lower bound for the number of such tilings.
We prove that L-shaped trominoes can tile the L-shaped tromino scaled by any positive integer, and Sphinx-shaped hexiamond can tile the Sphinx-shaped hexiamond scaled by any positive integer. We also give an upper bound and a lower bound for the number of such tilings.
AN1009593X
研究報告アルゴリズム（AL）
2015-AL-154
9
1-3
2015-09-21
2188-8566