**Data Science Los Angeles » R**, and kindly contributed to R-bloggers)

With so much hype about “big data” and the industry pushing for “big data” analytical tools for everyone, the question arises how many people have big data (for analytics) and how many of them really need these tools (which are more complex and often more immature compared to the traditional tools for analytics).

During the process of data analysis we typically start with some larger “raw” datasets, we transform/clean/prepare them for modeling (typically with SQL-like transformations), and then we use these refined and usually smaller datasets for modeling/machine learning.

In terms of computational resources needed I like to think in terms of the pyramid of analytical tasks. I’m mostly interested in tools for non-linear machine learning, the distribution of dataset sizes practitioners have to deal with in this area, and how all this is changing in time.

#### Size of datasets in KDnuggets surveys

KDnuggets has conducted surveys of “the largest dataset you analyzed/data mined” (yearly since 2006). It surveys the largest dataset for a given practitioner (instead of the typical one), it measures size in bytes (rather than my preference for number of records), and it surveys raw data sizes (I would be more interested in the size of the refined datasets used for modeling). Nevertheless, it provides data points interesting to study. (One could also question the representativeness of the sample, changing respondents over the years etc.)

The annual polls are available on various URLs and I compiled the data into a csv file. The cumulative distribution of dataset sizes for a few select years is plotted below:

The dataset sizes vary over many orders of magnitude with most users in the 10 Megabytes to 10 Terabytes range (a huge range), but furthermore with some users in the many Petabytes range.

It seems the cumulative distribution function in the `0.1-0.9`

range (on the vertical axis) follows a linear dependency vs `log(size)`

:

Fitting a linear regression `lm(log10(size_GB) ~ cum_freq + year, ...)`

for that range, one gets coefficients `year: 0.075`

and `cum_freq: 6.0`

. We can use this “model” as a smoother in the discussion below.

The above results imply an annual rate of increase of datasets of `10^0.075 ~ 1.2`

that is 20%.

The median dataset size increases from 6 GB (2006) to 30 GB (2015). That’s all tiny, even more for raw datasets, and it implies that over 50% of analytics professionals work with datasets that (even in raw form) can fit in the memory of a single machine, therefore it can be definitely dealt with using simple analytical tools.

On the other hand, the dataset sizes are distributed over many orders of magnitude, e.g. the larger quantiles based on smoothing for 2015 are:

quantile | value |
---|---|

50% | 30 GB |

60% | 120 GB |

70% | 0.5 TB |

80% | 2 TB |

90% | 8 TB |

The Terabyte range is the home turf of data warehouses, MPP/analytical databases and the like, but many organizations are using “big data” tools (Hadoop/Spark) for those sizes.

About 5% of uses are in the Petabytes range and likely use Hadoop/Spark. While the hype around big data, “exponential growth” of sensors and Internet-of-Things (IoT) etc. suggests a more rapid growth rate than 20% yearly, the simple linear fit used above does not extend over the 90% percentile and it’s hard to tell any trends for these large sizes from this survey data.

##### Size of datasets in other studies

A Microsoft research study has found that the median size of input jobs submitted to an analytic production Hadoop cluster at Microsoft in 2011 was 14 GB, and it infers from other studies that the median data size of input jobs in a Yahoo production cluster was 12 GB, while 90% of the inputs in an analytical production cluster at Facebook were of size less than 100 GB.

#### Size of datasets for modeling

Unfortunately it is unclear from all this discussion above what’s the distribution of dataset sizes used for modeling/machine learning (my primary area of interest). Some informal surveys I have done at various meetups and conference talks suggest that for at least 90% of non-linear supervised learning use cases the data fits well in the RAM of a single machine and can be processed by high-performant tools like xgboost or H2O or in many cases (I estimate 60%) even by using R packages or Python sklearn (see this github repo for a benchmark of the most commonly used open source tools for non-linear supervised learning). Many of the “big data” tools in this domain (non-linear supervised learning) are clunky, slow, memory-inefficient and buggy (affecting predictive accuracy).

#### Size of RAM of a single machine

The size of EC2 instances with largest RAM:

year | type | RAM (GB) |
---|---|---|

2007 | m1.xlarge | 15 |

2009 | m2.4xlarge | 68 |

2012 | hs1.8xlarge | 117 |

2014 | r3.8xlarge | 244 |

2016* | x1 | 2 TB |

With different assumptions one can get yearly RAM increase rates of 50%, 60% or 70%:

from_year | from_GB | to_year | to_GB | rate |
---|---|---|---|---|

2007 | 15 | 2014 | 244 | 50% |

2007 | 15 | 2016 | 2000 | 70% |

2009 | 68 | 2016 | 2000 | 60% |

Either way, the rate of increase of RAM of a single machine has been much higher than the rate of increase of the typical dataset used for analytics (20%). This has huge implications in terms of in-memory (distributed) processing (e.g. SQL) and single-machine processing (e.g. non-linear machine learning or even plain old R/Python). **Big RAM is eating big data.** For example, the fact that many datasets (already refined for modeling) now fit in the RAM of a single high-end server and one can train machine learning models on them without distributed computing has been noted by many top large scale machine learning experts.

Of course, maybe data (useful for analytics) is increasing faster, and the slower 20% per yr increase based on the KDnuggets poll just shows our inability (or the inability of our tools) to deal with ever larger data or maybe there is some strong bias and non-representativeness in the KDnuggets survey etc. Maybe *your* data increases faster. Maybe you *think* data is bigger and increasing faster. But facts should trump opinions, so I’d love to see more data and analysis either supporting or contradicting the above results.

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