What question did this study set out to answer?

To explore the solution sets of mixed additive and multiplicative congruences modulo the squares of odd primes.

February 12, 2026Open Access

On the solution set of additive and multiplicative congruences modulo squares of primes

Key Points

To explore the solution sets of mixed additive and multiplicative congruences modulo the squares of odd primes.
Defined solution sets S_+ and S_- consisting of integers satisfying certain congruences modulo p^2.
Established congruences related to the sum and product within the defined residue systems.
Classified prime numbers based on their quadratic residues and non-residues to derive solution counts.
Identified distinct solution sets S_+ and S_- based on additive and multiplicative relationships.
Derived specific congruences involving sums and products of residues in both solution sets.
Achieved counts of solution sets linked to classifications of primes and their quadratic properties.

Abstract

Let p be an odd prime. We consider the solution sets S_+ (p²) = \ n Z₏ℂ^* n a + b ab p² \ and S_- (p²) = \ n Z₏ℂ^* n a - b ab p² \, where Z₏ℂ^* denote a reduced residue system modulo p². We also establish congruences about sum and product of the residues or quadratic residues in S_+ (p²) or in S_- (p²) modulo p². Finally, we obtain the number of solution sets based on the classification of prime numbers, where a and b are quadratic residues or quadratic non-residues, respectively.

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On the solution set of additive and multiplicative congruences modulo squares of primes

Key Points

Abstract

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