• DocumentCode
    1634003
  • Title

    Delay asymptotics for heavy-tailed MapReduce jobs

  • Author

    Jian Tan ; Shicong Meng ; Xiaoqiao Meng ; Li Zhang

  • Author_Institution
    IBM T. J. Watson Res., Yorktown Heights, NY, USA
  • fYear
    2012
  • Firstpage
    1637
  • Lastpage
    1639
  • Abstract
    A MapReduce job consists of two phases that are processed in a map queue and a redeuce queue, respectively. The map queue is characterized by the processor sharing discpline, and the reduce queue by a multi-server station. A reduce task is composed of two sequential steps: the copy/shuffle step and the reduce function step. A synchronization barrier between the map and reduce phases complicates the process: the copy/shuffle step can overlap with the map phase, but its finish point and the start of the reduce function step have to be strictly after the completion of the map phase of the same job. This dependency can result in an interesting criticality phenomenon for the job delay distribution in MapReduce scheduling. We refine the logarithmic asymptotics that has been established for heavy-tailed MapReduce jobs by studying the exact asymptotics. The analysis reveals that the MapReduce framework combines the features of both processor sharing and first in first out disciplines.
  • Keywords
    data handling; delays; processor scheduling; queueing theory; MapReduce framework; MapReduce scheduling; copy-shuffle step; delay asymptotics; first in-first out discipline; heavy-tailed MapReduce job; job delay distribution; logarithmic asymptotics; map phase completion; map queue; multiserver station; processor sharing; reduce function step; reduce queue; reduce task; synchronization barrier; Bismuth; Cloud computing; Delays; Processor scheduling; Random variables; Servers; Synchronization;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Communication, Control, and Computing (Allerton), 2012 50th Annual Allerton Conference on
  • Conference_Location
    Monticello, IL
  • Print_ISBN
    978-1-4673-4537-8
  • Type

    conf

  • DOI
    10.1109/Allerton.2012.6483417
  • Filename
    6483417