Add to ORKGWe have studied how the solution of partial differential equations by means of finite element methods could be accelerated using Field Programmable Gate Arrays (FPGAs). First, we discuss in general the capabilities of current FPGA technology for floating-point implementations of number crunching. Based on practical results for basic floating-point operators performance limits are outlined. Then the perspectives for the implementation of LU decomposition with a state-of-the-art FPGA chip are addressed. It is estimated that, compared with a modern CPU, a speedup by a factor of 10-20 can be expected using a single off-the-shelf FPGA
A finite element code is developed in which all computational expensive steps are performed on a gra...
Executing a complex physical system model in real-time or faster has numerous applications in cyber-...
Many image processing systems have real-time performance constraints. Systems implemented on general...
This thesis proposes a new application for Field Programmable Gate Array in the acceleration of the ...
The Finite Element Method (FEM) is a computationally intensive scientific and engineering analysis t...
Traditionally, computationally intense algebraic functions such as LU factorization are solved using...
The Finite Element Method (FEM) is a computationally intensive scientific and engineering analysis t...
Majority of numerical integration algorithms are written in software and require a long time to init...
The book is composed of two parts. The first part introduces the concepts of the design of digital s...
This work shows how one parallel technology Field Programmable Gate Array (FPGA) can be applied to d...
Power flow computation is ubiquitous in the operation and planning of power systems.\ud Traditional ...
In this paper, it is shown that FFT algorithms using floating point numbers can be implemented on an...
Fast execution of physical system models has various uses, such as simulating physical phenomena or ...
It has been shown that FPGAs could outperform high-end microprocessors on floating-point computation...
Abstract—Many scientific applications such as electromag-natics require their operations carried out...
A finite element code is developed in which all computational expensive steps are performed on a gra...
Executing a complex physical system model in real-time or faster has numerous applications in cyber-...
Many image processing systems have real-time performance constraints. Systems implemented on general...
This thesis proposes a new application for Field Programmable Gate Array in the acceleration of the ...
The Finite Element Method (FEM) is a computationally intensive scientific and engineering analysis t...
Traditionally, computationally intense algebraic functions such as LU factorization are solved using...
The Finite Element Method (FEM) is a computationally intensive scientific and engineering analysis t...
Majority of numerical integration algorithms are written in software and require a long time to init...
The book is composed of two parts. The first part introduces the concepts of the design of digital s...
This work shows how one parallel technology Field Programmable Gate Array (FPGA) can be applied to d...
Power flow computation is ubiquitous in the operation and planning of power systems.\ud Traditional ...
In this paper, it is shown that FFT algorithms using floating point numbers can be implemented on an...
Fast execution of physical system models has various uses, such as simulating physical phenomena or ...
It has been shown that FPGAs could outperform high-end microprocessors on floating-point computation...
Abstract—Many scientific applications such as electromag-natics require their operations carried out...
A finite element code is developed in which all computational expensive steps are performed on a gra...
Executing a complex physical system model in real-time or faster has numerous applications in cyber-...
Many image processing systems have real-time performance constraints. Systems implemented on general...