Finite-Differencing and other regular and direct approaches to solving partial differential equations (PDEs) are methods that fit well on data-parallel computer systems. These problems continue to arise in many application areas of computational science and engineering but still offer some programming challenges as they are not readily incor-porated into a general standard software library that could cover all possible PDEs. Achieving high performance on numerical solutions to PDEs generally requires exposure of the field data structures and application of knowledge of how best to map them to the memory and processing architecture of a particular parallel computer system. Stencil methods for solving PDEs are however readily implemented as s...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
The growth of data to be processed in the Oil & Gas industry matches the requirements imposed by evo...
Abstract. Numerical solutions of nonlinear partial differential equations frequently rely on iterati...
AbstractFinite-Differencing and other regular and direct approaches to solving partial differential ...
Finite-Di↵erencing and other regular and direct approaches to solving partial di↵erential equations ...
We present a new software framework for the implementation of applications that use stencil computat...
We show how compiler technology can generate fast and efficient yet human-readable data-parallel sim...
Stencil computations are a class of algorithms operating on multi-dimensional arrays, which update a...
Abstract—Finite-difference methods can be useful for solv-ing certain partial differential equations...
This paper discusses the implementation of one-factor and three-factor PDE models on GPUs. Both expl...
As parallel and heterogeneous computing becomes more and more a necessity for implementing high perf...
This paper examines the potential of parallel computation methods for partial differential equations...
As the cost of data movement increasingly dominates performance, developers of finite-volume and fin...
Abstract—Current CPU and GPU architectures heavily use data and instruction parallelism at different...
This paper will show a comparison between the Kepler, Maxwell and Pascal GPU architectures using CUD...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
The growth of data to be processed in the Oil & Gas industry matches the requirements imposed by evo...
Abstract. Numerical solutions of nonlinear partial differential equations frequently rely on iterati...
AbstractFinite-Differencing and other regular and direct approaches to solving partial differential ...
Finite-Di↵erencing and other regular and direct approaches to solving partial di↵erential equations ...
We present a new software framework for the implementation of applications that use stencil computat...
We show how compiler technology can generate fast and efficient yet human-readable data-parallel sim...
Stencil computations are a class of algorithms operating on multi-dimensional arrays, which update a...
Abstract—Finite-difference methods can be useful for solv-ing certain partial differential equations...
This paper discusses the implementation of one-factor and three-factor PDE models on GPUs. Both expl...
As parallel and heterogeneous computing becomes more and more a necessity for implementing high perf...
This paper examines the potential of parallel computation methods for partial differential equations...
As the cost of data movement increasingly dominates performance, developers of finite-volume and fin...
Abstract—Current CPU and GPU architectures heavily use data and instruction parallelism at different...
This paper will show a comparison between the Kepler, Maxwell and Pascal GPU architectures using CUD...
I hereby declare that I am the sole author of this thesis. This is a true copy of the thesis, includ...
The growth of data to be processed in the Oil & Gas industry matches the requirements imposed by evo...
Abstract. Numerical solutions of nonlinear partial differential equations frequently rely on iterati...