Given integers $a,b,c,d\in[2^n,2^m]$ with $m>n>1$, how many primes $p$ are there in $[n^\alpha,n^\beta]$ for some $1<\alpha<\beta$ such that $$0<a\bmod p<n^{\alpha/k}$$ $$0<b\bmod p<n^{\alpha/k}$$ $$0<c\bmod p<n^{\alpha/2}$$ $$0<d\bmod p<n^{\alpha/2}$$ holds where $k>2$ is fixed? Assume $n,m,\alpha,\beta,k$ are fixed. ----- Heuristically we have $$\frac{|\{p:a\bmod p<n^{\alpha/k}\}|}{|\{p:p\in[n^\alpha,n^\beta]\}|}\approx\frac{|\{p:b\bmod p<n^{\alpha/k}\}|}{|\{p:p\in[n^\alpha,n^\beta]\}|}\approx\frac{n^{\alpha/k}}{(n^{\beta}-n^\alpha)/\log(n^{\beta}-n^\alpha)}$$ $$\frac{|\{p:c\bmod p<n^{\alpha/2}\}|}{|\{p:p\in[n^\alpha,n^\beta]\}|}\approx\frac{|\{p:d\bmod p<n^{\alpha/2}\}|}{|\{p:p\in[n^\alpha,n^\beta]\}|}\approx\frac{n^{\alpha/2}}{(n^{\beta}-n^\alpha)/\log(n^{\beta}-n^\alpha)}$$ So $$\mathsf{Prob}(a\bmod p<n^{\alpha/k},b\bmod p<n^{\alpha/k},c\bmod p<n^{\alpha/2},d\bmod p<n^{\alpha/2})\underbrace{\approx}_{\mathsf{assuming}\mbox{ }\mathsf{independence}\mbox{ }\mathsf{of}\mbox{ }a,b,c,d}\frac{n^{2\alpha(1/k+1/2)}}{((n^{\beta}-n^\alpha)/\log(n^{\beta}-n^\alpha))^4}$$ So I think we should have approximately $$\frac{n^{2\alpha(1/k+1/2)}}{((n^{\beta}-n^\alpha)/\log(n^{\beta}-n^\alpha))^3}\ll1$$ such prime numbers if $2\alpha(1/k+1/2)<3\beta$ which is if $\beta/\alpha>(1/k+1/2)/1.5$. Since $\beta/\alpha>1>(1/k+1/2)/1.5$ holds at every $k>1$ we have just $o(1)$ prime numbers. Am I correct?