[FOM] Continuity, Computability, Constructivity 2017; postproceedings; call for submissions
Dieter Spreen
spreen at math.uni-siegen.de
Wed Aug 9 22:04:49 EDT 2017
Continuity, Computability, Constructivity:
From Logic to Algorithms 2017
Postproceedings
Call for Submissions
After the successful start of the new EU-MSCA-RISE project "Computing with Infinite Data" (CID) and the excellent Workshop CCC 2017 in Nancy (France) in June this year, we are planning to publish a collection of papers dedicated to the meeting and to the project as a Special Issue in the open-access journal
LOGICAL METHODS IN COMPUTER SCIENCE.
The issue should reflect progress made in Computable Analysis and related areas, and is not restricted to work in the CID project or presented at the Workshop.
Submissions are welcome from all scientists on topics in the entire spectrum from logic to algorithms including, but not limited to:
Exact real number computation,
Correctness of algorithms on infinite data,
Computable analysis,
Complexity of real numbers, real-valued functions, etc.
Effective descriptive set theory,
Constructive topological foundations,
Scott's domain theory,
Constructive analysis,
Category-theoretic approaches to computation on infinite data,
Weihrauch degrees,
Randomness and computable measure theory,
Other related areas.
EDITORS:
Ulrich Berger (Swansea, UK)
Pieter Collins (Maastricht, NL)
Mathieu Hoyrup (Nancy, FR)
Victor Selivanov (Novosibirsk, RUS)
Dieter Spreen (Siegen, DE)
Martin Ziegler (KAIST, KR)
DEADLINE FOR SUBMISSION:
1 February 2018
If you intend to submit a paper for the special issue, please inform us by sending email to:
spreen at math.uni-siegen.de <mailto:spreen at math.uni-siegen.de>
by
1 Januar 2018
You will then receive concrete submission instructions and a Special-Issue-Code allowing you to submit your paper.
Please prepare your manuscript using the LMCS class file lmcs.cls which can be downloaded from
http://www.lmcs-online.org/Information/style.php <http://www.lmcs-online.org/Information/style.php>.
Submissions will be reviewed according to the usual high standards of LMCS.
Best regards,
Ulrich Berger
Pieter Collins
Mathieu Hoyrup
Victor Selivanov
Dieter Spreen
Martin Ziegler
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