[FOM] CFP: Algebraic Methods in General Rough Sets: Trends in Mathematics

A. Mani a.mani.cms at gmail.com
Sat Aug 5 14:27:18 EDT 2017


Dear All,

A new multi-author volume on algebraic methods in rough sets and allied
areas has been planned!

CFP: https://easychair.org/cfp/algrough2018
Submission link: https://easychair.org/conferences/?conf=algrough2018

CFP
ALG-ROUGH'2018: Algebraic Methods in General Rough Sets : Trends in
Mathematics Series

Book website (CFP will be added soon): http://www.roughsets.org
Submission link: https://easychair.org/conferences/?conf=algrough2018
Abstract registration deadline: September 30, 2017
Abstract Submission Deadline: September 30, 2017
Full Chapter Submission Deadline: December 30, 2017
Submission deadline: December 30, 2017

Topics: algebraic approaches to rough sets logics of approximate
reasoning formal approaches to vagueness constructive algebras of
rough sets


Widespread use of algebraic methods in rough sets goes back to the
very origins of the latter field. The focus of these methods was
algebraic semantics, associated logics and computation. At the turn of
the century as many as a dozen classes of algebraic systems could be
associated with semantics alone. In recent times, many new approaches
to general and hybrid rough sets such as the axiomatic approaches to
granularity, abstract rough sets, use of hypergraphs, newer dualities,
inverse problems, matroids, ideal based rough sets and approaches
based on antichains were developed. These have connections with
algebras and logics of knowledge, Formal Concept Analysis, quantum
logic, formal topology, mereology, spatial mereology and approximate
reasoning. The literature on all these is spread out and a
comprehensive account is missing.

It is known that many of the algorithms used in rough sets are
essentially algebraic in nature. Related expositions are not
particularly in line with the literature on constructive algebras.
Submissions that add to this aspect will also be welcomed.

The goal of the project is to bridge gaps, provide a detailed resource
on the topics mentioned, provide stronger research directions and
connect algebraic approaches to rough sets with those for other forms
of approximate reasoning. The book would be useful for researchers and
teachers in rough sets, algebra, lattice theory, non classical logic,
fuzzy sets, Possibility theory, FCA, computational learning theory and
other formal approaches to vagueness and approximate reasoning.

Prospective authors must submit 2 -3 page abstracts as soon as
possible to speed up decision making on the proposal(s). Full
manuscripts will be refereed by three referees. Improved versions will
be refereed again if deemed necessary.

Submission Guidelines

All Submissions must be original and not simultaneously submitted to
another journal or conference. Authors should try and target a larger
audience outside their sub-specialization. Submissions in the
following categories are particularly welcome:

Detailed Research Expositions
Research Surveys
Research Expositions including New Results (previously unpublished)

Initially long abstracts (2-3 pages in length) of proposed chapter
should be submitted through the easy chair system for approval by the
editorial team.

List of Topics

Topics of interest include (but are not necessarily limited to)

Algebraic Semantics of General Rough Sets
Algebraic Logics
Distributive Modal Logics
Lattices and Other Ordered Structures with Operators
Antichains associated with Semantics
Algebras associated with opposition
Hypergraphs and Rough Sets
Algebras of Granular Rough Sets
Algebras of Dominance Based Rough Sets
Connections with Formal Concept Analysis
Ideal Based Rough Sets
Algebraic Connections with Semantics of Fuzzy Logics.
Algebraic Connections with Semantics of Type-1, 2 Fuzzy Sets.
Connections with Effect Algebras
Connections with Algebras of Quantum Logic
Axiomatic Approaches to Granularity
Axiomatic Approaches to Rough Sets
Algebras of Hybrid Approaches
Problems of Algebraizability
Problems of Algebraic Logic
Inverse and Duality Problems
Connections with Paraconsistent Logics
Algebras of Rough Computation
Universal Algebraic Studies
Algebraic Systems and Correspondences
Dialectical Rough Sets
Matroids and related Applications

Editors

A Mani, University of Calcutta, Kolkata, India
Gianpiero Cattaneo,  University of Milano-Bicocca, Milano, Italy
Ivo Düntsch, Brock University, Ontario, Canada

Publication

The multi-author volume "Algebraic Methods in General Rough Sets" will
be published in the second quarter of 2018 in the 'Trends in
Mathematics' series of Springer International Publishing.

Contact

All questions about submissions should be emailed to A Mani and
optionally to Ivo Düntsch and Gianpiero Cattaneo

_________________________________________
​Thanks and Best

A Mani

Prof(Miss) A Mani
CU, ASL, AMS, ISRS, CLC, CMS, IEEE
HomePage: http://www.logicamani.in
Blog: http://logicamani.blogspot.in/
sip:girlprofessor at ekiga.net
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