On almost primes solutions to forms of odd degrees in many variables
Abstract
Let F=\f1,…,fR\ be a family of forms of odd degrees at most d in s variables. We study the solutions to the system f1(x)=…=fR(x)=0 of the form xi=yipi with |yi|≤ YF and pi being a prime for all i∈ [s] inside the box [-N,N]s, for large N. We show that if the number of variables s is sufficiently large with respect to the parameters R and d, then there are at least CF Ns-D/(\,N)s such solutions for some constants CF>0 and D∈N, with D depending only on the initial parameters R and d.
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