A Unified {2n-1, 2n, 2n+1} RNS Scaler with Dual Scaling Constants

Scaling is often used to prevent overflow in digital signal processing (DSP). Unfortunately, scaling in residue number system (RNS) consumes significant hardware area and delay. The problem is worsened when more than one scaling factors are needed. Applications in which the computation results fall into two distinct dynamic ranges could benefit from having two scaling factors for better trade-off between precision and hardware savings. This paper presents a new unified architecture for scaling an integer in the three-moduli set {2(n)-1, 2(n), 2(n)+1} RNS by two different scaling factors, 2(n)(2(n)+1) and 2(n). The unified architecture has hardware complexity approximating the most compact adder-based RNS scaler for a single scaling constant of 2(n). Our analysis shows that the proposed dual scaler design is not only several orders of magnitude smaller but also significantly faster than the fastest LUT-based RNS scalers for the same scaling constants.