Oţet, Alexandru Congruence relations modulo \(p\) in \(C[X]\). (Romanian) Zbl 0693.10004 Gaz. Mat., Bucur. 93, No. 3, 99-100 (1988). Let \(p\in\mathbb C[X]\), \(p\neq 0\). For \(f,g\in\mathbb C[X]\), \(f\equiv g\pmod p\) if \(p\mid (f-g)\). Some simple properties of this notion of congruence is applied to the divisibility of certain particular polynomials. Reviewer: József Sándor (Cluj-Napoca) MSC: 11A07 Congruences; primitive roots; residue systems 12D05 Polynomials in real and complex fields: factorization Keywords:ring of complex polynomials; divisibility of polynomials; congruence PDFBibTeX XMLCite \textit{A. Oţet}, Gaz. Mat., Bucur. 93, No. 3, 99--100 (1988; Zbl 0693.10004)