Ghale, Vinodkumar; Das, Shamik; Chakraborty, Debopam A Heron triangle and a Diophantine equation. (English) Zbl 07692667 Period. Math. Hung. 86, No. 2, 503-537 (2023). MSC: 11D25 11G05 51M04 PDFBibTeX XMLCite \textit{V. Ghale} et al., Period. Math. Hung. 86, No. 2, 503--537 (2023; Zbl 07692667) Full Text: DOI
Aouissi, S.; Mayer, D. C.; Ismaili, M. C.; Talbi, M.; Azizi, A. 3-rank of ambiguous class groups of cubic Kummer extensions. (English) Zbl 1474.11186 Period. Math. Hung. 81, No. 2, 250-274 (2020). MSC: 11R11 11R16 11R20 11R27 11R29 11R37 PDFBibTeX XMLCite \textit{S. Aouissi} et al., Period. Math. Hung. 81, No. 2, 250--274 (2020; Zbl 1474.11186) Full Text: DOI arXiv
Zhang, Yong; Shen, Zhongyan Arithmetic properties of polynomials. (English) Zbl 1474.11088 Period. Math. Hung. 81, No. 1, 134-148 (2020). MSC: 11D25 11D72 11G05 PDFBibTeX XMLCite \textit{Y. Zhang} and \textit{Z. Shen}, Period. Math. Hung. 81, No. 1, 134--148 (2020; Zbl 1474.11088) Full Text: DOI arXiv
Bremner, Andrew; Choudhry, Ajai The Fermat cubic and quartic curves over cyclic fields. (English) Zbl 1474.14041 Period. Math. Hung. 80, No. 2, 147-157 (2020). MSC: 14G25 11D25 11G05 PDFBibTeX XMLCite \textit{A. Bremner} and \textit{A. Choudhry}, Period. Math. Hung. 80, No. 2, 147--157 (2020; Zbl 1474.14041) Full Text: DOI
Zhang, Yong; Chen, Deyi A Diophantine equation with the harmonic mean. (English) Zbl 1449.11070 Period. Math. Hung. 46, No. 1, 138-144 (2020). Reviewer: Thomas A. Schmidt (Corvallis) MSC: 11D72 11D25 11D41 11G05 PDFBibTeX XMLCite \textit{Y. Zhang} and \textit{D. Chen}, Period. Math. Hung. 46, No. 1, 138--144 (2020; Zbl 1449.11070) Full Text: DOI
Zhang, Yong; Shamsi Zargar, Arman On the Diophantine equations \(z^2=f(x)^2\pm f(y)^2\) involving quartic polynomials. (English) Zbl 1438.11090 Period. Math. Hung. 79, No. 1, 25-31 (2019). Reviewer: Thomas Schmidt (Corvallis) MSC: 11D72 11D25 11D41 11G05 PDFBibTeX XMLCite \textit{Y. Zhang} and \textit{A. Shamsi Zargar}, Period. Math. Hung. 79, No. 1, 25--31 (2019; Zbl 1438.11090) Full Text: DOI
Arnóczki, Timea Elements with prime and small indices in bicyclic biquadratic number fields. (English) Zbl 1424.11153 Period. Math. Hung. 77, No. 1, 83-93 (2018). Reviewer: István Gaál (Debrecen) MSC: 11R16 11D57 PDFBibTeX XMLCite \textit{T. Arnóczki}, Period. Math. Hung. 77, No. 1, 83--93 (2018; Zbl 1424.11153) Full Text: DOI
Zhang, Yong; Shen, Zhongyan On the Diophantine system \(f(z)= f(x) f(y)= f(u) f(v)\). (English) Zbl 1387.11024 Period. Math. Hung. 75, No. 2, 295-301 (2017). Reviewer: Thomas Schmidt (Corvallis) MSC: 11D25 11D72 11G05 PDFBibTeX XMLCite \textit{Y. Zhang} and \textit{Z. Shen}, Period. Math. Hung. 75, No. 2, 295--301 (2017; Zbl 1387.11024) Full Text: DOI
Zhang, Yong; Cai, Tianxin A note on the Diophantine equation \(f(x) f(y) = f(z^2)\). (English) Zbl 1374.11050 Period. Math. Hung. 70, No. 2, 209-215 (2015). Reviewer: András Bazsó (Debrecen) MSC: 11D25 11D72 11G05 PDFBibTeX XMLCite \textit{Y. Zhang} and \textit{T. Cai}, Period. Math. Hung. 70, No. 2, 209--215 (2015; Zbl 1374.11050) Full Text: DOI
Ziegler, Volker On unit power integral bases of \(\mathbb Z[\root 4 \of {m}]\). (English) Zbl 1265.11098 Period. Math. Hung. 63, No. 1, 101-112 (2011). Reviewer: Péter Olajos (Miskolc) MSC: 11R16 11R04 11D25 11R27 11D59 PDFBibTeX XMLCite \textit{V. Ziegler}, Period. Math. Hung. 63, No. 1, 101--112 (2011; Zbl 1265.11098) Full Text: DOI
Lee, J.-B.; Vélez, William Yslas Integral solutions in arithmetic progression for \(y^2 = x^3 + k\). (English) Zbl 0757.11009 Period. Math. Hung. 25, No. 1, 31-49 (1992). MSC: 11D25 11G05 PDFBibTeX XMLCite \textit{J. B. Lee} and \textit{W. Y. Vélez}, Period. Math. Hung. 25, No. 1, 31--49 (1992; Zbl 0757.11009) Full Text: DOI