整数x 、y 与z 满足x ³ + y ³ + z ³ = n n ∈ [0, 100] 三立方数和问题 (英語:sums of three cubes )是指丢番图方程
x
3
+
y
3
+
z
3
=
n
{\displaystyle x^{3}+y^{3}+z^{3}=n}
立方数 模9同余0、1或-1,三立方数和模9不可能同余4或5,因而这是整数解存在的一个必要条件 。然而,对于该条件是否同时为充分条件 目前仍未有定论。
n
=
0
{\displaystyle n=0}
费马大定理 找到反例。此时三个立方数中必有两个同号,经移项,就会出现两正整数立方和等于另一正整数立方的情况。由于欧拉 早已证明幂次为3的费马大定理[ 1]
n
=
0
{\displaystyle n=0}
a
3
+
(
−
a
)
3
+
0
3
=
0.
{\displaystyle a^{3}+(-a)^{3}+0^{3}=0.}
n
=
1
,
2
{\displaystyle n=1,2}
(
9
b
4
)
3
+
(
3
b
−
9
b
4
)
3
+
(
1
−
9
b
3
)
3
=
1
{\displaystyle (9b^{4})^{3}+(3b-9b^{4})^{3}+(1-9b^{3})^{3}=1}
以及,
(
1
+
6
c
3
)
3
+
(
1
−
6
c
3
)
3
+
(
−
6
c
2
)
3
=
2.
{\displaystyle (1+6c^{3})^{3}+(1-6c^{3})^{3}+(-6c^{2})^{3}=2.}
上述表示经缩放可得,任意立方数或立方数的二倍都有三立方和[ 2] [ 3]
n
=
1
{\displaystyle n=1}
[ 4]
n
=
2
{\displaystyle n=2}
[ 4] [ 5]
1214928
3
+
3480205
3
+
(
−
3528875
)
3
=
2
,
{\displaystyle 1214928^{3}+3480205^{3}+(-3528875)^{3}=2,}
37404275617
3
+
(
−
25282289375
)
3
+
(
−
33071554596
)
3
=
2
,
{\displaystyle 37404275617^{3}+(-25282289375)^{3}+(-33071554596)^{3}=2,}
3737830626090
3
+
1490220318001
3
+
(
−
3815176160999
)
3
=
2.
{\displaystyle 3737830626090^{3}+1490220318001^{3}+(-3815176160999)^{3}=2.}
然而,已经证明只在1和2处存在能被四次多项式参数化的解析表示[ 6]
n
=
3
{\displaystyle n=3}
路易斯·J·莫德尔
1
3
+
1
3
+
1
3
=
4
3
+
4
3
+
(
−
5
)
3
=
3
{\displaystyle 1^{3}+1^{3}+1^{3}=4^{3}+4^{3}+(-5)^{3}=3}
“我”也不知道为什么这三个数都满足模9同余[ 7]
n
=
3
{\displaystyle n=3}
[ 8] [ 9] [ 10]
569936821221962380720
3
+
(
−
569936821113563493509
)
3
+
(
−
472715493453327032
)
3
=
3
{\displaystyle 569936821221962380720^{3}+(-569936821113563493509)^{3}+(-472715493453327032)^{3}=3}
1955年起,莫德尔(Mordell )等许多学者都尝试过使用计算机寻找该问题的解。[ 11] [ 12] [ 5] [ 13] [ 14] [ 15] [ 16] [ 17] [ 18]
n
{\displaystyle n}
Elsenhans )与雅内尔(Jahnel )于2009年使用诺姆·埃尔奇斯 提出的基于格规约 的方法[ 15]
max
(
|
x
|
,
|
y
|
,
|
z
|
)
<
10
14
{\displaystyle \max(|x|,|y|,|z|)<10^{14}}
Huisman )使用同样的方法将搜索上界提升至
max
(
|
x
|
,
|
y
|
,
|
z
|
)
<
10
15
{\displaystyle \max(|x|,|y|,|z|)<10^{15}}
n
<
100
{\displaystyle n<100}
n
{\displaystyle n}
[ 18]
2019年,安德鲁·布克
n
=
33
{\displaystyle n=33}
[ 19]
33
=
8866128975287528
3
+
(
−
8778405442862239
)
3
+
(
−
2736111468807040
)
3
{\displaystyle 33=8866128975287528^{3}+(-8778405442862239)^{3}+(-2736111468807040)^{3}}
此时,他在
min
(
|
x
|
,
|
y
|
,
|
z
|
)
<
10
16
{\displaystyle \min(|x|,|y|,|z|)<10^{16}}
n
=
42
{\displaystyle n=42}
[ 19]
随后在2019年9月,布克和安德鲁·萨瑟兰 [ 註 1]
42
=
(
−
80538738812075974
)
3
+
80435758145817515
3
+
12602123297335631
3
{\displaystyle 42=(-80538738812075974)^{3}+80435758145817515^{3}+12602123297335631^{3}}
这个解的获得在Charity Engine全球网络(Charity Engine's global grid )上耗费了130万机时。
至此1到100之間的所有整數都確認了是否有非零整數解[ 20] (2019-09 ) [update]
n
=
114
{\displaystyle n=114}
[ 8]
(
|
x
|
,
|
y
|
,
|
z
|
)
{\displaystyle (|x|,|y|,|z|)}
100000000000 。
在2021年1月初,又解決了579[ 21]
579
=
143075750505019222645
3
+
(
−
143070303858622169975
)
3
+
(
−
6941531883806363291
)
3
{\displaystyle 579=143075750505019222645^{3}+(-143070303858622169975)^{3}+(-6941531883806363291)^{3}}
至此,仅剩的未解決的在1000 以內的整数是114 、390 、627、633、732、921和975,一共有7個。
^ Machis, Yu. Yu., On Euler's hypothetical proof, Mathematical Notes , 2007, 82 (3): 352–356, MR 2364600 doi:10.1134/S0001434607090088 ^ Verebrusov, A. S., Объ уравненiи x 3 + y 3 + z 3 = 2u 3
x
3
+
y
3
+
z
3
=
2
u
3
{\displaystyle x^{3}+y^{3}+z^{3}=2u^{3}}
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x
3
+
y
3
+
z
3
=
k
{\displaystyle x^{3}+y^{3}+z^{3}=k}
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x
2
+
y
2
+
z
2
+
2
x
y
z
=
n
{\displaystyle x^{2}+y^{2}+z^{2}+2xyz=n}
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x
3
+
y
3
+
z
3
=
k
{\displaystyle x^{3}+y^{3}+z^{3}=k}
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x
3
+
y
3
=
z
3
−
d
{\displaystyle x^{3}+y^{3}=z^{3}-d}
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|
x
3
−
y
2
|
{\displaystyle |x^{3}-y^{2}|}
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