1 research outputs found
Indexed dependence metadata and its applications in software performance optimisation
To achieve continued performance improvements, modern microprocessor design is tending to concentrate
an increasing proportion of hardware on computation units with less automatic management
of data movement and extraction of parallelism. As a result, architectures increasingly include multiple
computation cores and complicated, software-managed memory hierarchies. Compilers have
difficulty characterizing the behaviour of a kernel in a general enough manner to enable automatic
generation of efficient code in any but the most straightforward of cases.
We propose the concept of indexed dependence metadata to improve application development and
mapping onto such architectures. The metadata represent both the iteration space of a kernel and the
mapping of that iteration space from a given index to the set of data elements that iteration might
use: thus the dependence metadata is indexed by the kernel’s iteration space. This explicit mapping
allows the compiler or runtime to optimise the program more efficiently, and improves the program
structure for the developer. We argue that this form of explicit interface specification reduces the need
for premature, architecture-specific optimisation. It improves program portability, supports intercomponent
optimisation and enables generation of efficient data movement code.
We offer the following contributions: an introduction to the concept of indexed dependence metadata
as a generalisation of stream programming, a demonstration of its advantages in a component
programming system, the decoupled access/execute model for C++ programs, and how indexed dependence
metadata might be used to improve the programming model for GPU-based designs. Our
experimental results with prototype implementations show that indexed dependence metadata supports
automatic synthesis of double-buffered data movement for the Cell processor and enables aggressive
loop fusion optimisations in image processing, linear algebra and multigrid application case
studies