quadratic congruence

quadratic congruence

[kwä¦drad·ik kən′grü·əns]
(mathematics)
A statement that two polynomials of second degree have the same remainder on division by a given integer.
References in periodicals archive ?
An idea to reduce every polynomial to either linear or quadratic congruence is proposed by (Eugen, 2006).
The following example illustrated Theorem 2 which solved a quadratic congruence.
Root-finding iterative technique is employed to find solutions of linear and quadratic congruences modulo with higher power of a prime p .
MA] is indeed the residual in a quadratic congruence of the union of a subgrassmannian G(1, L) (where L is a [P.