`等幂和数组成果大集`　陈漱文

`等幂和数组`

a₁^k + a₂^k + ... + a_m^k = b₁^k + b₂^k + ... + b_m^k

( k = k₁ , k₂ , ... , k_n )

我们将满足a₁^k + a₂^k + ... + a_m^k = b₁^k + b₂^k + ... + b_m^k ( k = k₁ , k₂ , ..., k_n )

的两组数记为:
[ a₁ , a₂ , ... , a_m ] = [ b₁ ,b₂ , ... , b_m ] ( k = k₁ , k₂ , ... , k_n )

我们把满足下列式子的多个数组称为j环k次m数等幂和数组

in these pages, we will only consider integral, non-trivial, primitive solutions of the above system.
- 第一个解答的人是: 首先发现者
- 最小的结果: proved 发现者 computer search, max {a_i, b_i } is smallest.
- 最小的结果: among all presently known solutions, max {a_i, b_i } is smallest.

　

`等幂和数组`

m=n+1 情形的非负整数的解答

a₁^k + a₂^k + ... + a_n₊₁^k = b₁^k + b₂^k + ... + b_n₊₁^k ( k = k₁ , k₂ , ... , k_n )

当 m=n+1, 非负整数的解答已经发现 39 + 39 + 12 + 11 + 4 = 105 情形.
See Results 和 discussion on the k < 0 情形 .
When all k > 0 和 m=n+1, 非负整数的解答有三十九种情形:
When h > 0 和 m=n, no non-negative solution is found, but to the following 14 types, there are solutions in integer.
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