Efficient sparse matrix-delayed vector multiplication for discretized neural field model

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Publikace nespadá pod Filozofickou fakultu, ale pod Ústav výpočetní techniky. Oficiální stránka publikace je na webu muni.cz.
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FOUSEK Jan

Rok publikování 2018
Druh Článek v odborném periodiku
Časopis / Zdroj The Journal of Supercomputing
Fakulta / Pracoviště MU

Ústav výpočetní techniky

Citace
www https://doi.org/10.1007/s11227-017-2194-4
Doi http://dx.doi.org/10.1007/s11227-017-2194-4
Klíčová slova Neural field;Sparse matrix;SpMV;Delay differential equations;Data locality
Popis Computational models of the human brain provide an important tool for studying the principles behind brain function and disease. To achieve whole-brain simulation, models are formulated at the level of neuronal populations as systems of delayed differential equations. In this paper, we show that the integration of large systems of sparsely connected neural masses is similar to well-studied sparse matrix-vector multiplication; however, due to delayed contributions, it differs in the data access pattern to the vectors. To improve data locality, we propose a combination of node reordering and tiled schedules derived from the connectivity matrix of the particular system, which allows performing multiple integration steps within a tile. We present two schedules: with a serial processing of the tiles and one allowing for parallel processing of the tiles. We evaluate the presented schedules showing speedup up to 2x on single-socket CPU, and 1.25x on Xeon Phi accelerator.
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