Modular Cryptography is the strategic alignment of encryption systems with recursive modular mathematics. It replaces brute-force logic with lattice elegance—embedding keys into prime residue cycles, toroidal fields, and quaternionic curves.
This domain draws from the A-Town lattice model, where data flows through double-toroidal zones mapped by fractal residue keys. It is built on the modular arithmetic spine of the Totient Harmonic Scaling Function and fortified by quaternionic geodesic wrapping, as explored in Spinor Encryption Protocols.
Modular cryptography ensures security not through secrets, but through structure—recursive, geometric, and multidimensional. This tag curates those works where cryptographic resilience grows from mathematical harmony.
