Logic and Machines: Decision Problems and Complexity
Proceedings of the Symposium "Rekursive Kombinatorik" held from May 23-28, 1983 at the Institut für Mathematische Logik und Grundlagenforschung der Universität Münster/Westfalen
Published on 1. May 1984
Book
Paperback/Softback
VI, 460 pages
978-3-540-13331-5 (ISBN)
Description
P-mitotic sets.- Equivalence relations, invariants, and normal forms, II.- Recurrence relations for the number of labeled structures on a finite set.- Recursively enumerable extensions of R1 by finite functions.- On the complement of one complexity class in another.- The length-problem.- On r.e. inseparability of CPO index sets.- Arithmetical degrees of index sets for complexity classes.- Rudimentary relations and Turing machines with linear alternation.- A critical-pair/completion algorithm for finitely generated ideals in rings.- Extensible algorithms.- Some reordering properties for inequality proof trees.- Modular decomposition of automata.- Modular machines, undecidability and incompleteness.- Universal Turing machines (UTM) and Jones-Matiyasevich-masking.- Complexity of loop-problems in normed networks.- On the solvability of the extended ?? ? ??? - Ackermann class with identity.- Reductions for the satisfiability with a simple interpretation of the predicate variable.- The computational complexity of the unconstrained limited domino problem (with implications for logical decision problems).- Implicit definability of finite binary trees by sets of equations.- Spektralproblem and completeness of logical decision problems.- Reduction to NP-complete problems by interpretations.- Universal quantifiers and time complexity of random access machines.- Second order spectra.- On the argument complexity of multiply transitive Boolean functions.- The VLSI complexity of Boolean functions.- Fast parallel algorithms for finding all prime implicants for discrete functions.- Bounds for Hodes - Specker theorem.- Proving lower bounds on the monotone complexity of Boolean functions.
More details
Series
Edition
Softcover reprint of the original 1st ed. 1984
Language
English
Place of publication
Berlin
Germany
Publishing group
Springer Berlin
Target group
Professional and scholarly
Research
Illustrations
VI, 460 p.
Dimensions
Height: 235 mm
Width: 155 mm
Thickness: 26 mm
Weight
709 gr
ISBN-13
978-3-540-13331-5 (9783540133315)
DOI
10.1007/3-540-13331-3
Schweitzer Classification
Content
P-mitotic sets.- Equivalence relations, invariants, and normal forms, II.- Recurrence relations for the number of labeled structures on a finite set.- Recursively enumerable extensions of R1 by finite functions.- On the complement of one complexity class in another.- The length-problem.- On r.e. inseparability of CPO index sets.- Arithmetical degrees of index sets for complexity classes.- Rudimentary relations and Turing machines with linear alternation.- A critical-pair/completion algorithm for finitely generated ideals in rings.- Extensible algorithms.- Some reordering properties for inequality proof trees.- Modular decomposition of automata.- Modular machines, undecidability and incompleteness.- Universal Turing machines (UTM) and Jones-Matiyasevich-masking.- Complexity of loop-problems in normed networks.- On the solvability of the extended ?? ? ??? - Ackermann class with identity.- Reductions for the satisfiability with a simple interpretation of the predicate variable.- The computational complexity of the unconstrained limited domino problem (with implications for logical decision problems).- Implicit definability of finite binary trees by sets of equations.- Spektralproblem and completeness of logical decision problems.- Reduction to NP-complete problems by interpretations.- Universal quantifiers and time complexity of random access machines.- Second order spectra.- On the argument complexity of multiply transitive Boolean functions.- The VLSI complexity of Boolean functions.- Fast parallel algorithms for finding all prime implicants for discrete functions.- Bounds for Hodes - Specker theorem.- Proving lower bounds on the monotone complexity of Boolean functions.