Transcendence of \(p\)-adic values of generalized hypergeometric series with transcendental polyadic parameters (Q6095196)

Let \(m\) be a positive integer, \(\alpha_1,\dots ,\alpha_m\) be polyadic Liouville numbers and \(\zeta\) be a special positive integer. Set \(f_i(z)=\sum_{n=0}^\infty \prod_{j=1}^m (\alpha_j+i)_nz^n\), \(i=0,1\). Let \(M\) be a positive integer, Let \(M\) and \(r\) be positive integers and \(a_1,\dots ,a_r\) be arbitrary chosen \(r\) distinct elements of residue system modulo \(M\). Set \(\mathbb A =\cup_{R=1}^r \{ a_R+Mk; k\in\mathbb Z\}\). Then there exist infinitely many primes \(p\) from \(\mathbb A\) such that at least one from numbers \(f_i(\zeta)\), \(i=0,1\) is transcendental in the field \(\mathbb Q_p\). The similar theorem holds when \(\zeta\) is polyadic Liouville number.