Diophantine Equation nth Powers

The 2-1 equation

$\begin{displaymath} A^n+B^n=C^n \end{displaymath}$

(1)

is a special case of Fermat's Last Theorem and so has no solutions for $n\geq 3$ . Lander et al. (1967) give a table showing the smallest

for which a solution to

$\begin{displaymath} {x_1}^k+{x_2}^k+\ldots+{x_m}^k={y_1}^k+{y_2}^k+\ldots+{y_n}^k, \end{displaymath}$

with $1\leq m\leq n$ is known.

Take the results from the Ramanujan 6-10-8 Identity that for , with

$F_{2m}(a,b,c,d)=(a+b+c)^{2m}+(b+c+d)^{2m}$

$-(c+d+a)^{2m}-(d+a+b)^{2m}+(a-d)^{2m}-(b-c)^{2m}\quad$ (2)

and

$f_{2m}(x,y)=(1+x+y)^{2m}+(x+y+xy)^{2m}$

$-(y+xy+1)^{2m}-(xy+1+x)^{2m}+(1-xy)^{2m}-(x-y)^{2m},\quad$ (3)

then

$\begin{displaymath} F_{2m}(a,b,c,d)=a^{2m}f_{2m}(x,y). \end{displaymath}$

(4)

Using

$\displaystyle f_2(x,y)$	$\textstyle =$	$\displaystyle 0$	(5)
$\displaystyle f_4(x,y)$	$\textstyle =$	$\displaystyle 0$	(6)

now gives

$\begin{displaymath} (a+b+c)^n+(b+c+d)^n+(a-d)^n = (c+d+a)^n+(d+a+b)^n+(b-c)^n \end{displaymath}$

(7)

for

or 4.

References

Berndt, B. C. Ramanujan's Notebooks, Part IV. New York: Springer-Verlag, p. 101, 1994.

Berndt, B. C. and Bhargava, S. ``Ramanujan--For Lowbrows.'' Amer. Math. Monthly 100, 644-656, 1993.

Gloden, A. Mehrgradige Gleichungen. Groningen, Netherlands: P. Noordhoff, 1944.

Lander, L. J.; Parkin, T. R.; and Selfridge, J. L. ``A Survey of Equal Sums of Like Powers.'' Math. Comput. 21, 446-459, 1967.

Reznick, B. ``Sums of Even Powers of Real Linear Forms.'' Mem. Amer. Math. Soc. No. 463, 96. Providence, RI: Amer. Math. Soc., 1992.

$F_{2m}(a,b,c,d)=(a+b+c)^{2m}+(b+c+d)^{2m}$
$-(c+d+a)^{2m}-(d+a+b)^{2m}+(a-d)^{2m}-(b-c)^{2m}\quad$	(2)

$f_{2m}(x,y)=(1+x+y)^{2m}+(x+y+xy)^{2m}$
$-(y+xy+1)^{2m}-(xy+1+x)^{2m}+(1-xy)^{2m}-(x-y)^{2m},\quad$	(3)