| hermann on Wed, 31 Jan 2024 14:56:48 +0100 |
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| Re: Any chance to compute system of Diophantine exquations in 26 variables in GP? |
On 2024-01-29 11:54, Bill Allombert wrote:
The problem is that the value of q for example is so large it will not fit inthe memory of your computer... Cheers, Bill
At the end of "Universal Diophantine Equation", James P. Jones, The Journal of Symbolic Logic, Vol. 47, No. 3 (Sep., 1982), pp. 549-571... such that conditions (D1)-(D37) hold. There are 53 variables here. We eliminate 17 by simple substitution, viz. A, b, C, D_0, M_1, Q, V, W, N_1, N_2, N_3, S_1, S_2, S_3, T1, T2, T3. Then introducing 22 new variables, to define λB, b^2, 2AB - B^2 - 1, AC_1, c^2, c^4, <, Q^2, Q^3, Q^4, c^4 Q^3, N^2, MU, PK, □, YK, <, AC, C^2, AE, F^2 and GH, allows all of our conditions to be expressed as a system of diophantine equations
of degree 2 and hence by a single diophantine equation of degree 4. ...Unfortunately only instructions on how to create system of Diophantine equations in 58 variables, but with maximal degree 2 is given — but that sounds interesting.
Can this set of Diophantine equations can be found somewhere written out?
Regards, Hermann.