Incremental computing

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Incremental computing, also known as incremental computation, is a software feature which, whenever a piece of data changes, attempts to save time by only recomputing those outputs which depend on the changed data.[1][2][3] When incremental computing is successful, it can be significantly faster than computing new outputs naively. For example, a spreadsheet software package might use incremental computation in its recalculation feature, to update only those cells containing formulas which depend (directly or indirectly) on the changed cells.

When incremental computing is implemented by a tool that can implement it for a variety of different pieces of code automatically, that tool is an example of a program analysis tool for optimization.

Incremental computing provides a means of computing a new input/output pair (I2,O2), based on an old input output pair (I1,O1). The key technique is represented by a function ΔP, which relates changes in the input to changes to the output.
Incremental computing derives a new input/output pair from one or more old input/output relationships. To do so, ΔP must relate a change in the input to a change in the output. The consumer of the result may be interested in the full updated output, or the delta output, or both.

Static versus dynamic[edit]

Incremental computing techniques can be broadly separated into two types of approaches:

Static approaches attempt to derive an incremental program from a conventional program P using, e.g., either manual design and refactoring, or automatic program transformations. These program transformations occur before any inputs or input changes are provided.

Dynamic approaches record information about executing program P on a particular input (I1) and use this information when the input changes (to I2) in order to update the output (from O1 to O2). The figure shows the relationship between program P, the change calculation function ΔP, which constitutes the core of the incremental program, and a pair of inputs and outputs, I1, O1 and I2, O2.

Specialized versus general-purpose approaches[edit]

Some approaches to incremental computing are specialized, while others are general purpose. Specialized approaches require the programmer to explicitly specify the algorithms and data structures that will be used to preserve unchanged sub-calculations. General-purpose approaches, on the other hand, use language, compiler, or algorithmic techniques to give incremental behavior to otherwise non-incremental programs.[4]

Static methods[edit]

Program derivatives[edit]

Given a computation and a potential change , we can insert code before the change (the pre-derivative) and after the change (the post-derivative) to update the value of faster than rerunning . Paige has written down a list of rules for formal differentiation of programs in SUBSETL.[5]

View maintenance[edit]

In database systems such as DBToaster, views are defined with relational algebra. Incremental view maintenance statically analyzes relational algebra to create update rules that quickly maintain the view in the presence of small updates, such as insertion of a row.[6]

Dynamic methods[edit]

Incremental computation can be achieved by building a dependency graph of all the data elements that may need to be recalculated, and their dependencies. The elements that need to be updated when a single element changes are given by the transitive closure of the dependency relation of the graph. In other words, if there is a path from the changed element to another element, the latter may be updated (depending on whether the change eventually reaches the element). The dependency graph may need to be updated as dependencies change, or as elements are added to, or removed from, the system. It is used internally by the implementation, and does not typically need to be displayed to the user.

Capturing dependencies across all possible values can be avoided by identifying subset of important values (e.g., aggregation results) across which dependencies can be tracked, and incrementally recomputing other dependent variables, hence balancing the amount of dependency information to be tracked with the amount of recomputation to be performed upon input change.[7]

Partial evaluation can be seen as a method for automating the simplest possible case of incremental computing, in which an attempt is made to divide program data into two categories: that which can vary based on the program's input, and that which cannot (and the smallest unit of change is simply "all the data that can vary"). Partial evaluation can be combined with other incremental computing techniques.

With cycles in the dependency graph, a single pass through the graph may not be sufficient to reach a fixed point. In some cases, complete reevaluation of a system is semantically equivalent to incremental evaluation, and may be more efficient in practice if not in theory.[8]

Existing systems[edit]

Compiler and language support[edit]

  • Automatic Incrementalization (also called "Self-Adjusting Computation", and "Adaptive Functional Programming"),[9] Delta ML, Haskell Adaptive
  • Cornell Synthesizer Generator[10]
  • IceDust - a custom domain-specific language.

Frameworks and libraries[edit]

  • Adapton[11] - with implementations in several languages
  • One-way Dataflow Constraints (Reactive Computation in C++)
  • Differential Dataflow
  • Jane Street Incremental
  • Incremental Datalog (LogicBlox)
  • Incremental Prolog (XSB)[12]
  • Domain-Specific Approaches:
    • Incremental Type Checking

Applications[edit]

  • Databases (view maintenance)
  • Build systems
  • Spreadsheets[13]
  • Development Environments
  • Financial Computations
  • Attribute Grammar Evaluation
  • Graph Computations and Queries
  • GUIs (e.g., React and DOM diffing)
  • Scientific applications

See also[edit]

References[edit]

  1. ^ Carlsson, Magnus (2002). "Monads for incremental computing". Proceedings of the seventh ACM SIGPLAN international conference on Functional programming. New York: ACM. pp. 26–35. doi:10.1145/581478.581482. ISBN 1-58113-487-8.
  2. ^ Umut A. Acar (2005). Self-Adjusting Computation (PDF) (Ph.D. thesis).
  3. ^ Camil Demetrescu; Irene Finocchi; Andrea Ribichini (2011). "Reactive Imperative Programming with Dataflow Constraints". Proceedings of the 26th ACM International Conference on Object-Oriented Programming Systems Languages and Applications (OOPSLA 2011). ACM. pp. 407–426. arXiv:1104.2293. doi:10.1145/2048066.2048100. ISBN 978-1-4503-0940-0.
  4. ^ Yan Chen; Joshua Dunfield; Matthew A. Hammer; Umut A. Acar. Implicit self-adjusting computation for purely functional programs. ICFP '11. pp. 129–141. Archived from the original on 2016-10-30. Retrieved 2018-03-12.
  5. ^ Paige, Robert (1981). Formal Differentiation: A Program Synthesis Technique. UMI Research Press. ISBN 978-0-8357-1213-2.
  6. ^ Ahmad, Yanif; Kennedy, Oliver; Koch, Christoph; Nikolic, Milos (2012-06-01). "DBToaster: Higher-order Delta Processing for Dynamic, Frequently Fresh Views". Proc. VLDB Endow. 5 (10): 968–979. arXiv:1207.0137. doi:10.14778/2336664.2336670. ISSN 2150-8097.
  7. ^ Mugilan Mariappan; Keval Vora (2019). "GraphBolt: Dependency-Driven Synchronous Processing of Streaming Graphs". In European Conference on Computer Systems (EuroSys'19). pp. 25:1–25:16. doi:10.1145/3302424.3303974.
  8. ^ Kimberley Burchett; Gregory H. Cooper; Shriram Krishnamurthi (2007). "Lowering: A static optimization technique for transparent functional reactivity". In ACM SIGPLAN Symposium on Partial Evaluation and Semantics-Based Program Manipulation. pp. 71–80. CiteSeerX 10.1.1.90.5866. ISBN 978-1-59593-620-2.
  9. ^ Hammer, Matthew A.; Acar, Umut A.; Chen, Yan (2009). "CEAL". Proceedings of the 2009 ACM SIGPLAN conference on Programming language design and implementation - PLDI '09. p. 25. doi:10.1145/1542476.1542480. ISBN 9781605583921. S2CID 11058228.
  10. ^ Reps, Thomas; Teitelbaum, Tim (1984). "The synthesizer generator". Proceedings of the first ACM SIGSOFT/SIGPLAN software engineering symposium on Practical software development environments - SDE 1. pp. 42–48. doi:10.1145/800020.808247. ISBN 978-0897911313.
  11. ^ "Adapton: Programming Language Abstractions for Incremental Computation". adapton.org. Retrieved 2016-10-07.
  12. ^ Saha, Diptikalyan; Ramakrishnan, C. R. (2005). "Incremental Evaluation of Tabled Prolog: Beyond Pure Logic Programs". Practical Aspects of Declarative Languages. Lecture Notes in Computer Science. Vol. 3819. pp. 215–229. CiteSeerX 10.1.1.111.7484. doi:10.1007/11603023_15. ISBN 978-3-540-30947-5. ISSN 0302-9743.
  13. ^ Hammer, Matthew; Phang, Khoo; Hicks, Michael; Foster, Jeffrey (2014). ADAPTON: Composable, Demand-Driven Incremental Computation (PDF). PLDI.