In this work, we present an approach to alleviate the potential benefit of adder graph algorithms by solving the transposed form of the problem and then transposing the solution. The key contribution is a systematic way to obtain the transposed realization with a minimum number of cascaded adders subject to the input realization. In this way, wide and low constant matrix multiplication problems, with sum of products as a special case, which are normally exceptionally time consuming to solve using adder graph algorithms, can be solved by first transposing the matrix and then transposing the solution. Examples show that while the relation between the adder depth of the solution to the transposed problem and the original problem is not straigh...
Let M be an s ×t matrix and let M T be the transpose of M . Let x and y be t - and s -dimensional...
International audienceThe last two decades have seen tremendous effort on the development of high-le...
AbstractWe present a method for the multiplication of an arbitrary vector by a symmetric centrosymme...
In this work, we present an approach to alleviate the potential benefit of adder graph algorithms by...
In this work, an approach for transposing solutions to the multiple constant multiplication (MCM) pr...
This thesis presents a novel algorithm for Transposing Rectangular matrices In-place and in Parallel...
A variable can be multiplied by a given set of fixed-point constants using a multiplier block that c...
This paper presents implementations of in‐place algorithms for transposing rectangular matrices. One...
In the context of multiple constant multiplications (MCM) design, we propose a novel common-subexpre...
The efficient design of multiplierless implementations of constant matrix multipliers is challenged ...
International audienceMany algorithms from digital signal processing, including digital filters or d...
We consider the problem of matrix transpose on mesh-connected processor networks. On the theoretical...
In the context of multiple constant multiplications (MCM) design, we propose a novel common subexpre...
Multiple Constant Multiplication (MCM) is a ubiquitous problem for numerous computation-intensive ap...
International audienceWe present a non-commutative algorithm for the multiplication of a 2x2-block-m...
Let M be an s ×t matrix and let M T be the transpose of M . Let x and y be t - and s -dimensional...
International audienceThe last two decades have seen tremendous effort on the development of high-le...
AbstractWe present a method for the multiplication of an arbitrary vector by a symmetric centrosymme...
In this work, we present an approach to alleviate the potential benefit of adder graph algorithms by...
In this work, an approach for transposing solutions to the multiple constant multiplication (MCM) pr...
This thesis presents a novel algorithm for Transposing Rectangular matrices In-place and in Parallel...
A variable can be multiplied by a given set of fixed-point constants using a multiplier block that c...
This paper presents implementations of in‐place algorithms for transposing rectangular matrices. One...
In the context of multiple constant multiplications (MCM) design, we propose a novel common-subexpre...
The efficient design of multiplierless implementations of constant matrix multipliers is challenged ...
International audienceMany algorithms from digital signal processing, including digital filters or d...
We consider the problem of matrix transpose on mesh-connected processor networks. On the theoretical...
In the context of multiple constant multiplications (MCM) design, we propose a novel common subexpre...
Multiple Constant Multiplication (MCM) is a ubiquitous problem for numerous computation-intensive ap...
International audienceWe present a non-commutative algorithm for the multiplication of a 2x2-block-m...
Let M be an s ×t matrix and let M T be the transpose of M . Let x and y be t - and s -dimensional...
International audienceThe last two decades have seen tremendous effort on the development of high-le...
AbstractWe present a method for the multiplication of an arbitrary vector by a symmetric centrosymme...