We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the operands, we make the selection of quotient digits simple. This leads to a simple hardware implementation, and allows correct rounding of complex quotient. To reduce large prescaling tables required for radices greater than 4, we adapt the bipartite-table method to multiple-operan- d functions.On adapte l’algorithme de division itérative de baser à la division complexe. Par une mise à l’ échelle préliminaire des opérandes, on fait en sorte que le choix, à chaque itération, des chiffres de quotient soit élémentaire. Ceci conduit à des implantations matérielles simples, et permet de fournir des divisions avec arrondi correct. Pour permettre la réa...
The speed of SRT-type dividers is mainly determined by the complexity of the quotient-digit selectio...
The speed of high-radix digit-recurrence dividers and square-root units is mainly determined by the ...
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...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
International audienceWe present a design and implementation of a radix-4 complex division unit with...
We propose a radix-r digit-recurrence algorithm for complex square-root. The operand is prescaled to...
International audienceThis paper shows the details of an implementation of variable radix floating-p...
We describe a hardware-oriented design of a complex division algorithm proposed in.1 This algorithm ...
(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 digit-recurrence algorithm for division in real and complex number domains using a vari...
International audienceA recently proposed complex valued division algorithm designed for efficient h...
The speed of SRT-type dividers is mainly determined by the complexity of the quotient-digit selectio...
The speed of high-radix digit-recurrence dividers and square-root units is mainly determined by the ...
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...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
International audienceWe present a design and implementation of a radix-4 complex division unit with...
We propose a radix-r digit-recurrence algorithm for complex square-root. The operand is prescaled to...
International audienceThis paper shows the details of an implementation of variable radix floating-p...
We describe a hardware-oriented design of a complex division algorithm proposed in.1 This algorithm ...
(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 digit-recurrence algorithm for division in real and complex number domains using a vari...
International audienceA recently proposed complex valued division algorithm designed for efficient h...
The speed of SRT-type dividers is mainly determined by the complexity of the quotient-digit selectio...
The speed of high-radix digit-recurrence dividers and square-root units is mainly determined by the ...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...