A scheme for performing higher radix square root based on prescaling of the radicand is presented to reduce the complexity of the result-digit selection. The scheme requires several steps, namely multiplication for prescaling the radicand, square root, multiplication for prescaling for the division, and division. Online algorithms are used to reduce the overall time and pipelining to reuse the different modules. An estimate of the execution time for a radix-256 unit for double-precision square root and a comparison with other implementations indicate that the proposed approach is an alternative to consider when designing a square-root uni
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
International audienceWe present a design and implementation of a radix-4 complex division unit with...
The paper analyses an SRT radix-B division algorithm where the determination of the quotient digits ...
An algorithm for square root with prescaling and selection by rounding is developed and combined wit...
An extension of the very-high radix division with prescaling and selection by rounding is presented....
An algorithm for square root with prescaling is developed and combined with a similar scheme for div...
(eng) We propose a radix-$r$ digit-recurrence algorithm for complex square-root. The operand is pres...
Abstract. We propose a radix-r digit-recurrence algorithm for complex square-root. The operand is pr...
We propose a radix-r digit-recurrence algorithm for complex square-root. The operand is prescaled to...
A general discussion on nonrestoring square root algorithms is presented, showing bounds and constra...
The speed of high-radix digit-recurrence dividers and square-root units is mainly determined by the ...
Abstract—Division and square root, based on the digit-recurrence algorithm, can be implemented in a ...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
International audienceWe present a design and implementation of a radix-4 complex division unit with...
The paper analyses an SRT radix-B division algorithm where the determination of the quotient digits ...
An algorithm for square root with prescaling and selection by rounding is developed and combined wit...
An extension of the very-high radix division with prescaling and selection by rounding is presented....
An algorithm for square root with prescaling is developed and combined with a similar scheme for div...
(eng) We propose a radix-$r$ digit-recurrence algorithm for complex square-root. The operand is pres...
Abstract. We propose a radix-r digit-recurrence algorithm for complex square-root. The operand is pr...
We propose a radix-r digit-recurrence algorithm for complex square-root. The operand is prescaled to...
A general discussion on nonrestoring square root algorithms is presented, showing bounds and constra...
The speed of high-radix digit-recurrence dividers and square-root units is mainly determined by the ...
Abstract—Division and square root, based on the digit-recurrence algorithm, can be implemented in a ...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
International audienceWe present a design and implementation of a radix-4 complex division unit with...
The paper analyses an SRT radix-B division algorithm where the determination of the quotient digits ...