Abstract—The design and implementation of the Thomas algorithm optimised for hardware acceleration on an FPGA is presented. The hardware based algorithm combined with custom data flow and low level parallelism available in an FPGA reduces the overall complexity from 8N down to 5N arithmetic operations, and combined with a data streaming interface reduces memory overheads to only 2 N-length vectors per N-tridiagonal system to be solved. The Thomas Core developed allows for multiple tridiagonal systems to be solved in parallel, giving potential use for solving multiple implicit finite difference schemes or acceler-ating higher dimensional alternating-direction-implicit schemes used in financial derivatives pricing. This paper also discusses t...
We have studied how the solution of partial differential equations by means of finite element method...
Time domain or frequency domain Finite Difference (FD) methods are one of the most popular numerical...
Ordinary Differential Equations (ODEs) are widely used in many high-performance computing applicatio...
This paper discusses the implementation of one-factor and three-factor PDE models on GPUs. Both expl...
Abstract—Explicit finite difference method is widely used in finance for pricing many kinds of optio...
This thesis proposes a new application for Field Programmable Gate Array in the acceleration of the ...
In this paper, we present the outcomes of a project on the exploration of the use of Field Programma...
The solution of tridiagonal system of equations using graphic processing units (GPU) is assessed. Th...
This thesis proposes novel methodologies for design, optimisation and generalisation of reconfigurab...
Summarization: Financial engineering is a very active research field as a result of the growth of th...
The continued development of improved algorithms and architecture for numerical simulations is at th...
Tridiagonal diagonally dominant linear systems arise in many scientific and engineering applications...
The Three Dimensional Fast Fourier Transform (3D-FFT) is commonly used to solve the partial differen...
This paper discusses the implementation of one-factor and three-factor PDE models on GPUs. Both expl...
In this paper, we present the outcomes of a project on the exploration of the use of Field Programma...
We have studied how the solution of partial differential equations by means of finite element method...
Time domain or frequency domain Finite Difference (FD) methods are one of the most popular numerical...
Ordinary Differential Equations (ODEs) are widely used in many high-performance computing applicatio...
This paper discusses the implementation of one-factor and three-factor PDE models on GPUs. Both expl...
Abstract—Explicit finite difference method is widely used in finance for pricing many kinds of optio...
This thesis proposes a new application for Field Programmable Gate Array in the acceleration of the ...
In this paper, we present the outcomes of a project on the exploration of the use of Field Programma...
The solution of tridiagonal system of equations using graphic processing units (GPU) is assessed. Th...
This thesis proposes novel methodologies for design, optimisation and generalisation of reconfigurab...
Summarization: Financial engineering is a very active research field as a result of the growth of th...
The continued development of improved algorithms and architecture for numerical simulations is at th...
Tridiagonal diagonally dominant linear systems arise in many scientific and engineering applications...
The Three Dimensional Fast Fourier Transform (3D-FFT) is commonly used to solve the partial differen...
This paper discusses the implementation of one-factor and three-factor PDE models on GPUs. Both expl...
In this paper, we present the outcomes of a project on the exploration of the use of Field Programma...
We have studied how the solution of partial differential equations by means of finite element method...
Time domain or frequency domain Finite Difference (FD) methods are one of the most popular numerical...
Ordinary Differential Equations (ODEs) are widely used in many high-performance computing applicatio...