Over-redundant digit sets are defined as those ranging from -s to +s, with s⩾B, B being the radix. This paper presents new techniques for the direct computation of division, that use an over-redundant digit set for representing the quotient, instead of simply redundant ones used previously. In particular, general criteria for synthesizing the digit selection rules and remainder updating are given for any radix and index of redundancy. A methodology combining the use of over-redundant digit sets with the prescaling of the divisor is also studied in order to achieve radix-B division units with trivial digit selection functions. It is also shown, for the specific case of radix-4 that using a prescaling slightly wider than in a radix-4 unit by ...
A new implementation for minimally redundant radix-4 SRT division with the recurrence in the signed-...
The speed of SRT-type dividers is mainly determined by the complexity of the quotient-digit selectio...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
We present a radix-8 divider that uses an over-redundant digit set for the quotient in order to obta...
This paper presents a derivation of four radix-2 division algorithms by digit recurrence. Each divis...
We propose a digit-recurrence algorithm for division in real and complex number domains using a vari...
Digit-recurrence binary dividers are sped up via two complementary methods: keeping the partial rema...
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...
High-radix division, developing several quotient bits per clock, is usually limited by the difficult...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...
In this paper, we propose a class of division algorithms with the aim of reducing the delay of the s...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
ISBN: 0818669055The digit-recurrence division relies on a sequence of addition/subtraction and shift...
A new implementation for minimally redundant radix-4 SRT division with the recurrence in the signed-...
A new implementation for minimally redundant radix-4 SRT division with the recurrence in the signed-...
The speed of SRT-type dividers is mainly determined by the complexity of the quotient-digit selectio...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...
We present a radix-8 divider that uses an over-redundant digit set for the quotient in order to obta...
This paper presents a derivation of four radix-2 division algorithms by digit recurrence. Each divis...
We propose a digit-recurrence algorithm for division in real and complex number domains using a vari...
Digit-recurrence binary dividers are sped up via two complementary methods: keeping the partial rema...
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...
High-radix division, developing several quotient bits per clock, is usually limited by the difficult...
A division algorithm in which the quotient-digit selection is performed by rounding the shifted resi...
In this paper, we propose a class of division algorithms with the aim of reducing the delay of the s...
We adapt the radix-r digit-recurrence division algorithm to complex division. By prescaling the oper...
ISBN: 0818669055The digit-recurrence division relies on a sequence of addition/subtraction and shift...
A new implementation for minimally redundant radix-4 SRT division with the recurrence in the signed-...
A new implementation for minimally redundant radix-4 SRT division with the recurrence in the signed-...
The speed of SRT-type dividers is mainly determined by the complexity of the quotient-digit selectio...
(eng) We adapt the radix-$r$ digit-recurrence division algorithm to complex division. By prescaling ...