On forms in prime variables
Abstract
Let F1,…,FR be homogeneous polynomials of degree d 2 with integer coefficients in n variables, and let F=(F1,…,FR). Suppose that F1,…,FR is a non-singular system and n 4d+2d2R5. We prove that there are infinitely many solutions to F(x)=0 in prime coordinates if (i) F(x)=0 has a non-singular solution over the p-adic units p for all prime numbers p, and (ii) F(x)=0 has a non-singular solution in the open cube (0,1)n.
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