Your search keyword '"Kazda, Alexandr"' showing total 6 results

1. The local-global property for G-invariant terms

Author

Kazda, Alexandr and Kompatscher, Michael

Subjects

FOS: Computer and information sciences, Computer Science - Computational Complexity, Rings and Algebras (math.RA), FOS: Mathematics, 03C05, 08A70, 20B05, Mathematics - Rings and Algebras, Computational Complexity (cs.CC)

Abstract

For some Maltsev conditions $\Sigma$ it is enough to check if a finite algebra $\mathbf A$ satisfies $\Sigma$ locally on subsets of bounded size, in order to decide, whether $\mathbf A$ satisfies $\Sigma$ (globally). This local-global property is the main known source of tractability results for deciding Maltsev conditions. In this paper we investigate the local-global property for the existence of a $G$-term, i.e. an $n$-ary term that is invariant under permuting its variables according to a permutation group $G \leq$ Sym($n$). Our results imply in particular that all cyclic loop conditions (in the sense of Bodirsky, Starke, and Vucaj) have the local-global property (and thus can be decided in polynomial time), while symmetric terms of arity $n>2$ fail to have it., Comment: 22 pages

Published

2021

2. Small Promise CSPs that reduce to large CSPs

Author

Kazda, Alexandr, Mayr, Peter, and Zhuk, Dmitriy

Subjects

FOS: Computer and information sciences, Computer Science - Logic in Computer Science, General Computer Science, G.2, Mathematics - Rings and Algebras, Computational Complexity (cs.CC), 08A70, 68R07, 05C25, Theoretical Computer Science, Logic in Computer Science (cs.LO), Computer Science - Computational Complexity, Rings and Algebras (math.RA), FOS: Mathematics, F.2.2

Abstract

For relational structures A, B of the same signature, the Promise Constraint Satisfaction Problem PCSP(A,B) asks whether a given input structure maps homomorphically to A or does not even map to B. We are promised that the input satisfies exactly one of these two cases. If there exists a structure C with homomorphisms $A\to C\to B$, then PCSP(A,B) reduces naturally to CSP(C). To the best of our knowledge all known tractable PCSPs reduce to tractable CSPs in this way. However Barto showed that some PCSPs over finite structures A, B require solving CSPs over infinite C. We show that even when such a reduction to finite C is possible, this structure may become arbitrarily large. For every integer $n>1$ and every prime p we give A, B of size n with a single relation of arity $n^p$ such that PCSP(A, B) reduces via a chain of homomorphisms $ A\to C\to B$ to a tractable CSP over some C of size p but not over any smaller structure. In a second family of examples, for every prime $p\geq 7$ we construct A, B of size $p-1$ with a single ternary relation such that PCSP(A, B) reduces via $A\to C\to B$ to a tractable CSP over some C of size p but not over any smaller structure. In contrast we show that if A, B are graphs and PCSP(A,B) reduces to tractable CSP(C) for some finite digraph C, then already A or B has a tractable CSP. This extends results and answers a question of Deng et al.

Published

2021

3. Deciding the existence of quasi weak near unanimity terms in finite algebras

Author

Kazda, Alexandr

Subjects

FOS: Computer and information sciences, Computer Science - Computational Complexity, Rings and Algebras (math.RA), FOS: Mathematics, Mathematics - Rings and Algebras, Computational Complexity (cs.CC), 08B05 (Primary) 68Q25 (Secondary)

Abstract

We show that for a fixed positive integer k one can efficiently decide if a finite algebra A admits a k-ary weak near unanimity operation by looking at the local behavior of the terms of A. We also observe that the problem of deciding if a given finite algebra has a quasi Taylor operation is solvable in polynomial time by looking, essentially, for local quasi Siggers operations., Comment: 17 pages, number n fixed to k in the proof of Lemma 11

Published

2020

4. $n$-permutability and linear Datalog implies symmetric Datalog

Author

Kazda, Alexandr

Subjects

FOS: Computer and information sciences, 010102 general mathematics, InformationSystems_DATABASEMANAGEMENT, 0102 computer and information sciences, Computational Complexity (cs.CC), Computer Science::Computational Complexity, Computer Science::Artificial Intelligence, 01 natural sciences, Computer Science - Computational Complexity, TheoryofComputation_MATHEMATICALLOGICANDFORMALLANGUAGES, 010201 computation theory & mathematics, TheoryofComputation_LOGICSANDMEANINGSOFPROGRAMS, Computer Science::Logic in Computer Science, 68Q17, 68R05, 03C05, Computer Science::Programming Languages, 0101 mathematics, Computer Science::Databases

Abstract

We show that if $\mathbb A$ is a core relational structure such that CSP($\mathbb A$) can be solved by a linear Datalog program, and $\mathbb A$ is $n$-permutable for some $n$, then CSP($\mathbb A$) can be solved by a symmetric Datalog program (and thus CSP($\mathbb A$) lies in deterministic logspace). At the moment, it is not known for which structures $\mathbb A$ will CSP($\mathbb A$) be solvable by a linear Datalog program. However, once somebody obtains a characterization of linear Datalog, our result immediately gives a characterization of symmetric Datalog., Logical Methods in Computer Science ; Volume 14, Issue 2 ; 1860-5974

Published

2018

5. Absorption and directed J��nsson terms

Author

Kazda, Alexandr, Kozik, Marcin, McKenzie, Ralph, and Moore, Matthew

Subjects

Rings and Algebras (math.RA), 08B05, 03C05, 08A62, FOS: Mathematics

Abstract

We prove that every congruence distributive variety has directed J��nsson terms, and every congruence modular variety has directed Gumm terms. The directed terms we construct witness every case of absorption witnessed by the original J��nsson or Gumm terms. This result is equivalent to a pair of claims about absorption for admissible preorders in CD and CM varieties, respectively. For finite algebras, these absorption theorems have already seen significant applications, but until now, it was not clear if the theorems hold for general algebras as well. Our method also yields a novel proof of a result by P. Lipparini about the existence a chain of terms (which we call Pixley terms) in varieties that are at the same time congruence distributive and $k$-permutable for some $k$., 17 pages

Published

2015

6. Properties of Moebius number systems

Author

Kazda, Alexandr

Subjects

40A05, 37B10, Mathematics - Number Theory, FOS: Mathematics, 11K99, Dynamical Systems (math.DS), Number Theory (math.NT), Mathematics - Dynamical Systems

Abstract

Moebius number systems represent points using sequences of Moebius transformations. Thorough the paper, we are mainly interested in representing the unit circle (which is equivalent to representing R\cup\{\infty\}). The main aim of the paper is to improve already known tools for proving that a given subshift--iterative system pair is in fact a Moebius number system. We also study the existence problem: How to describe iterative systems resp. subshifts for which there exists a subshift resp. iterative system such that the resulting pair forms a Moebius number system. While we were unable to provide a complete answer to this question, we present both positive and negative partial results. As Moebius number systems are also subshifts, we can ask when a given Moebius number system is sofic. We give this problem a short treatment at the end of our paper., Comment: 50 pages, 13 figures

Published

2009