\quad本文考虑如下问题:若钝角三角形三边长为互素的整数, 且其中一边的边长与这条边上的高的长度之比为3:10,求的这条边长度的可能值.\quad这实际上是一个求解 Diophantus 方程的问题. 考虑钝角三角形ABC,记a, b, c为它的三边长. 不妨设C为钝角,BC与BC边上的高的长度之比为3:10.那么a<b<c,a^2+b^2<c^2,BC边上的高可表示为\dfrac{10}{3}a.我们的目的是求出互素的正整数a,b,c的可能组合. 首先由三角形面积的 Heron 公式有\sqrt{s(s-a)(s-b)(s-c)} = \dfrac{5}{3}a^2,这里s=\dfrac{a+b+c}{2}.进一步整理便有(a+b+c)(b+c-a)(c+a-b)(a+b-c) = \left((c+b)^2-a^2\right)\left(a^2-(c-b)^2\right)=\dfrac{400}{9}a^4.作代换X=\dfrac{c+b}{a}, Y=\dfrac{c-b}{a},上式可化为如下的四次 Diophantus 方程9(X^2-1)(1-Y^2)=400.我们需要找到这个方程满足0<Y<1<X与XY>1的有理数解. 注意, 若(X_1,Y_1)是此方程的解,则(\pm X_1, \pm Y_1)与(\pm Y_1, \pm X_1)均是此方程的解. 因此问题转化为在这个方程的曲线上寻找有理点(X_1, Y_1).找到这样的有理点后, 由X=\max\{|X_1|,|Y_1|\}, \quad Y=\min\{|X_1|,|Y_1|\}便得到了满足0<Y<1<X的有理数解,此后再单独判断是否有XY>1即可. 为了求解这个方程,首先通过变量代换消去交叉项. 由方程解出Y^2 = \frac{9X^2-409}{9(X^2-1)},两边同乘9^2(X^2-1)^2便得到(9Y(X^2-1))^2 = 9(9X^2-409)(X^2-1)=(3X)^4-418(3X)^2+3681.现在作双有理代换X=\dfrac{u}{3}, \quad Y=\dfrac{v}{9(X^2-1)},可将上式化为v^2 =u^4-418u^2+3681.我们将问题转化成了寻找这条四次曲线上的有理点对(u,v).一般地,对于四次曲线v^2 =u^4+ku^2+l (k,l \in \mathbb{Z}),可通过双有理代换u=\dfrac{y}{6(x-6k)}, \quad v=\pm\dfrac{18u^2+3k-x}{18},将其化为 Weierstrass 形式:y^2=x^3-27(k^2+12l)x+54(k^3-36kl),它的判别式为\Delta=4\left(-27(k^2+12l)\right)^3+27\left(54(k^3-36kl)\right)^2=-8503056(k^2-4l)^2l.对于本文中的问题,k=-418, l=3681,可求出\Delta=-801273577881600000000 \ne 0,这说明可通过双有理代换u=\dfrac{y}{6x-15048}, \quad v=\pm\dfrac{18u^2-1254-x}{18}将四次曲线v^2 =u^4-418u^2+3681化为\mathbb{Q}上的椭圆曲线y^2=x^3-5910192x-952718976.接下来我们只需在这条椭圆曲线上寻找符合条件的有理点. 根据 Mordell-Weil 定理, 一般的椭圆曲线E(\mathbb{Q})是有限生成的 Abel 群. 具体地,存在r \in \mathbb{Z}_{\geq 0}使得E(\mathbb{Q}) \simeq \mathbb{Z}^r \oplus E(\mathbb{Q})_{\mathrm{tors}},这里r为E的秩,E(\mathbb{Q})_{\mathrm{tors}}为E的挠群,它们是椭圆曲线的基本不变量,可以利用 SageMath 进行求解. 本文中需要考虑的这条椭圆曲线的秩为1,其挠群同构于\mathbb{Z} / 4\mathbb{Z},因此这条曲线存在分解\mathbb{Z} \oplus \mathbb{Z} / 4\mathbb{Z}.进一步还可以计算出其挠群中的四个元素分别为(-1092, 64800),(-1092, - 64800),(2508, 0)以及无穷远点,其自由部分的生成元为(-372,34560),由它通过自加运算可以生成全部的无穷多个有理点. 完整代码及示意图如下:
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from sage.all import EllipticCurve # 定义椭圆曲线 E = EllipticCurve([0, 0, 0, -5910192, -952718976]) print("椭圆曲线 E =", E) # 计算基本不变量 print("E 的秩 =", E.rank()) print("自由部分的生成元:") for P in E.gens(): print(P) T = E.torsion_subgroup() print("E 的挠群部分为:", T) print("挠群部分的生成元:") for Q in T.gens(): print(Q) # 定义变换函数:输入椭圆曲线上一个非无穷远点,返回 (X, Y) def transform_point(point): if point.is_zero(): print(f"{n}P = {point} 为无穷远点") return None x, y = point.xy() # 计算 u = y/(6x - 15048) denom = 6*x - 15048 if denom == 0: print(f"{n}P = {point} 为挠点") return None u = y / denom # X = u/3 X_val = u / 3 # 计算 v = (18u^2 -1254 - x) / 18 v = (18*u*u - 1254 - x) / 18 # 若 X^2-1 为 0 则无法定义 Y if X_val**2 - 1 == 0: print(f"{n}P = {point} 为挠点") return None # 利用 v^2 = (9Y(X^2-1))^2 得 Y = v/(9*(X^2-1)) Y_val = v / (9 * (X_val**2 - 1)) # 留下 X > 1, 0 < Y < 1 的解 if abs(X_val) > abs(Y_val): X_val = abs(X_val) Y_val = abs(Y_val) else: X_val, Y_val = abs(Y_val), abs(X_val) return (X_val, Y_val) # 考察 nP, n 从 1 到 8(可根据需要扩大范围) valid_points = [] P = E(-372, 34560) # 生成元 (-372, 34560) for n in range(1, 8): Pn = n * P if Pn.is_zero(): print(f"{n}P = {Pn} 为无穷远点") continue trans = transform_point(Pn) if trans is None: continue X_val, Y_val = trans # 检查约束条件 XY > 1 if X_val * Y_val > 1: valid_points.append((n, Pn, X_val, Y_val)) # 输出满足条件的点及其对应的 X, Y if valid_points: print("\n满足约束条件的有理点及其变换后的 (X, Y):") for n, Pn, X_val, Y_val in valid_points: print(f"{n}P = {Pn} -> X = {X_val}, Y = {Y_val}") else: print("\n没有找到满足约束条件的有理点。") |
\quad经计算, 前七个有理点为:\begin{aligned} & P=(-372,34560), \\ & 2P=\left(\dfrac{28257}{4},\dfrac{4452975}{8}\right), \\ & 3P=\left(-\dfrac{770514132}{436921},\dfrac{18232500384000}{288804781}\right), \\ & 4P=\left(\dfrac{197840637553}{77369616},\dfrac{17408865486415625}{680543142336}\right), \\ & 5P=\left(-\dfrac{10229587945765554612}{4701773724609361},-\dfrac{12924696291376974306172704000}{322398184075900811511641}\right),\\ & 6P=\left(\dfrac{3315857515978138943646417}{778265695724123543524},-\dfrac{4913082978666096182700219050478483225}{21711600145951982612977114447768}\right),\\ & 7P=\left(-\dfrac{980310927987768717199615170184212}{1365254122130421423237129886921},-\dfrac{86213265029332223182933554501882177755794614946560}{1595218746624712341752806736238641171325979781}\right),\end{aligned}其中P,3P,4P,5P,6P,7P对应于曲线9(X^2-1)(1-Y^2)=400上的点(X,Y)满足XY>1, 分别为\begin{aligned}&(X, Y) = \left(9, \dfrac{2}{3}\right), \\ &(X, Y) = \left(\dfrac{955341}{81499}, \dfrac{262142}{319263}\right), \\ &(X, Y) = \left(\dfrac{11299872121}{390278520}, \dfrac{10989319079}{11293130329}\right), \\ &(X, Y) = \left(\dfrac{10818894959910981}{1415347510692259}, \dfrac{1710716537700542}{3597581681140263}\right), \\ &(X, Y) = \left(\dfrac{93484504350405221240653}{13032444705716745260028}, \dfrac{6390174904465811823103}{18514327358706141569665}\right),\\ &(X, Y) = \left(\dfrac{12943448758278309403238895165969}{709092463025904829132403703241}, \dfrac{4034454167364911033269090973762}{4334844983868375725354843829243}\right),\end{aligned}对应的三角形边长的第一组值为a=6, \quad b=25, \quad c=29,第二组值为\begin{aligned}& a = 52039230474, \\ & b = 283640722825, \\ & c = 326369344541, \end{aligned}第三组值为\begin{aligned}& a = 8814932381938466160, \\ & b = 123322033377526774729, \\ & c = 131899823749446540889, \end{aligned}第四组值为\begin{aligned}& a = 10183656553827886989599214648234, \\ & b = 36500599924821923135078595423625, \\ & c = 41343116711091007465123514432381, \end{aligned}第五组值为\begin{aligned}& a = 482573895131753093455040731485630241003701240, \\ & b = 1647523115407481222922163366417259231656764361, \\ & c = 1814082317612100178364265041163661384602418129, \end{aligned}第六组值为\begin{aligned}& a = 6147611812893430459047690640742368681943631952471980499353126, \\ & b = 53247042881278175108210271527885380230155873953848266415268825, \\ & c = 58968644966281996768619784995061807221900024946019897545994109.\end{aligned}更多的取值组合可由上述方法依次求出.