摘要
Catalan’s Conjecture 的敘述是,唯一連續的完全次方數正整數數對是8 和9 這一組。換言之,Catalan’s equation,即「x的平方減y的三次方等於一」,的唯一正整數解是(3,2,2,3)。 這個定理在1844 年作為猜想被提出,並且在2002 年被證明。這篇論文沿用了在 J. Daems 所寫的「Cyclotomic Proof of Catalan’s Conjecture」中所使用的各種方法,去重新描述這個定理的部分證明。 整個定理的證明依據Catalan’s equation 中的兩個指數的各種情況,共分成四部分。這篇論文主要是著重於有利用到cyclotomic field 相關的理論去進行證明的部分。
關鍵字
卡塔蘭猜想並列摘要
Catalan’s Conjecture says that the only pair of consecutive powers of positive integers is 8 and 9. Namely, the Clatalan’s equation x^2-y^3=1 has (x, y, p, q) = (3, 2, 2, 3) as its only positive integer solution. This is a theorem in number theory that was proposed by Eug
並列關鍵字
無資料參考文獻
[1] Z. I. Borevich and I. R. Shafarevich, Number Theory. Academic Press, London, 1964.
[2] J. Daems, A Cyclotomic Proof of Catalan's Conjecture. manuscript Sept. 29, 2003,
[3] Preda Mihăilescu, Primary Cyclotomic Units and a Proof of Catalan's Conjecture, J. reine angrew. Math. 572 (2004), 167-195.
http://www.math.leidenuniv.nl/ jdaems/scriptie/Catalan.pdf.
[4] Yuri F. Bilu. Catalan's Conjecture(after Mihăilescu). S'eminaire Bourbaki, 909, 2002-2003.
延伸閱讀
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- 傅佩榮(1972)。從誤會看卡謬思想。現代學苑,9(11),15-21。https://doi.org/10.7065/MRAS.197211.0015
- SHIUAN, L. P. (2020). A Catalan Identity revisited [master's thesis, National Chengchi University]. Airiti Library. https://doi.org/10.6814/NCCU202000719