Deng Mou-jie scite author profile

Deng Mou-jie

4Publications

44Citation Statements Received

29Citation Statements Given

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Heilongjiang Vocational College of Art

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On the conjecture of Jesmanowicz concerning Pythagorean triples

Mou-jie

Cohen²

1998

Bull. Austral. Math. Soc.

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Let a, b, c be relatively prime positive integers such that a 2 + b 2 = c 2 .Jesmanowicz conjectured in 1956 that for any given positive integer n the only solution of (an) x + (bn) v = (en)* in positive integers is x -y = z = 2. Building on the work of earlier writers for the case when n = 1 and c = b + 1, we prove the conjecture when n > l , c = b + l and certain further divisibility conditions are satisfied. This leads to the proof of the full conjecture for the five triples

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A note on a conjecture of Jeśmanowicz

Mou-jie¹,

Cohen²

2000

Colloq. Math.

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Let a, b, c be relatively prime positive integers such that a 2 + b 2 = c 2. Jeśmanowicz conjectured in 1956 that for any given positive integer n the only solution of (an) x + (bn) y = (cn) z in positive integers is x = y = z = 2. If n = 1, then, equivalently, the equation (u 2 −v 2) x +(2uv) y = (u 2 +v 2) z , for integers u > v > 0, has only the solution x = y = z = 2. We prove that this is the case when one of u, v has no prime factor of the form 4l + 1 and certain congruence and inequality conditions on u, v are satisfied.

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A note on the Diophantine equation $x^{2} + q^{m} = c^{2n}$

Mou-jie¹

2015

Proc. Japan Acad. Ser. A Math. Sci.

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Let q be an odd prime. Let c > 1 and t be positive integers such that q t þ 1 ¼ 2c 2 . Using elementary method and a result due to Ljunggren concerning the Diophantine equation x n À1 xÀ1 ¼ y 2 , we show that the Diophantine equation x 2 þ q m ¼ c 2n has the only positive integer solution ðx; m; nÞ ¼ ðc 2 À 1; t; 2Þ. As applications of this result some new results on the Diophantine equation x 2 þ q m ¼ c n and the Diophantine equation x 2 þ ð2c À 1Þ m ¼ c n are obtained. In particular, we prove that Terai's conjecture is true for c ¼ 12; 24. Combining this result with Terai's results we conclude that Terai's conjecture is true for 2 c 30.

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A Note on Jeśmanowicz’ Conjecture Concerning Primitive Pythagorean Triples

Chen¹,

Mou-jie²

2015

JPANTA

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Deng Mou-jie

On the conjecture of Jesmanowicz concerning Pythagorean triples

A note on a conjecture of Jeśmanowicz

A note on the Diophantine equation $x^{2} + q^{m} = c^{2n}$

A Note on Jeśmanowicz’ Conjecture Concerning Primitive Pythagorean Triples

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