Mathematical Software (TOMS)


Search TOMS
enter search term and/or author name

Social Media


Editorial Charter

The purpose of the ACM Transactions on Mathematical Software (TOMS) is to communicate important research results addressing the development, evaluation and use of mathematical software. In addition, TOMS publishes machine-readable computer software which is incorporated into the Collected Algorithms of the ACM; such software may be written in any programming language that is in widespread use, but the author must be able to make the case as to why the language chosen was the most appropriate given the goals of wide usability and applicability of research published in TOMS. In both research papers and software, TOMS seeks contributions of lasting value in which technical quality, relevance to significant computations, interest, and novelty are all high, and where presentation is effective.

This scope of TOMS involves a number of dimensions, each of which overlap TOMS to some degree


Design, development and implementation of algorithms
Design of user and system interfaces
Analysis, testing and evaluation of algorithms and computer programs
Documentation, dissemination, and maintenance of computer programs


Machine arithmetic
Parallel and vector processing
Error handling
Software tools


Numeric computation
Symbolic computation
Computational science
Problem solving environments
Knowledge-based approaches
Object-oriented computing


Mathematical function evaluation
Linear algebra
Nonlinear equations
Interpolation and approximation; data handling
Statistical analysis
Differential and integral equations
Computational geometry
Discrete and symbolic mathematical algorithms
Pattern recognition
Sorting, searching, and classifying

None of these topics completely overlaps the scope of TOMS, however. To be considered for TOMS, manuscripts must address such topics in the context of the production, evaluation and use of well-engineered mathematical software which supports significant computer applications. Purely theoretical papers from traditional areas (e.g., numerical analysis or software engineering) that are not presented in the context of mathematical software are rarely acceptable. At the other extreme, papers that are essentially user manuals or tutorials for a computer program are also normally unacceptable as also are papers which entirely application/subject specific.

In general, TOMS manuscripts are expected to contain (a) motivation for the problem considered, (b) an indication of the relationship of the work to the current state-of-the-art, (c) a technical analysis of the proposed solution, (d) evidence of effectiveness and practicality, and (e) evidence of superiority compared to the best alternative approaches.

In many cases, effectiveness can be demonstrated through careful analysis. However, data obtained from well designed experiments may be needed to justify claims of practical superiority. For papers whose principal contribution is the implementation of novel computational methods, an extensive experimental evaluation of computer implementations, including comparisons with the best available software for the problem, is typically required. For a paper whose principal contribution is in software or interface design, evidence of its superiority may include empirical data demonstrating an improvement in readability, usability or robustness. Examples could include simplification and reduction of function parameters, reduction of code size, capability of handling more general situations, improved error handling, and the use of objects or constructs that are naturally suited for the application area. Such assertions should be supported by quantitative evidence whenever possible.

Survey papers are acceptable, provided they have a fairly narrow focus, summarize and organize recent research in a way that is itself novel, and contribute to the advancement of research in the field. Authors intending to submit such papers are encouraged to discuss their ideas with the Editor-in-Chief first.

Potential authors should consult the Information for Authors and the ACM Algorithms Policy. Both authors and readers are encouraged to peruse the TOMS World Wide Web (WWW) pages for related information, including lists of past and future articles and links to published algorithms. These pages can also be reached through the ACM WWW pages at or directly at

Affiliates within ACM


    Distributes software published in TOMS.

    Special Interest Group on Algorithms and Computation Theory.

    Special Interest Group on Symbolic Algebraic Manipulation.
All ACM Journals | See Full Journal Index