A semigroup of paths on a sequence of uniformly elliptic complexes
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Publication:6148183
DOI10.1134/s0016266323020041zbMath1530.52010OpenAlexW4390419545MaRDI QIDQ6148183
Publication date: 11 January 2024
Published in: Functional Analysis and its Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1134/s0016266323020041
determinacynil-semigroupaperiodic tilingfinitely presented semigroupBurnside-type problemsubstitution complex
Cites Work
- New estimates of odd exponents of infinite Burnside groups.
- Imbeddability of recursively presented inverse semigroups into finitely presented ones
- Monomial algebras
- Non-amenable finitely presented torsion-by-cyclic groups.
- Algorithmic problems for amalgams of finite semigroups
- Finite Gröbner basis algebras with unsolvable nilpotency problem and zero divisors problem
- Construction of infinite finitely presented nilsemigroup
- Construction of semigroups with some exotic properties.
- Linear recurrence equations on a tree.
- Subexponential estimates in Shirshov's theorem on height
- The Burnside problem and related topics
- SOLUTION OF THE BURNSIDE PROBLEM FOR EXPONENT 6
- ON THE NOVIKOV-ADYAN THEOREM
- On the Burnside problem on periodic groups
- A.D. Alexandrov spaces with curvature bounded below
- THE FREE BURNSIDE GROUPS OF SUFFICIENTLY LARGE EXPONENTS
- Infinite Burnside groups of even exponent
- A construction of a finitely presented semigroup containing an infinite square-free ideal with zero multiplication
- Construction of Semigroups with Some Exotic Properties
- ALGORITHMIC PROBLEMS IN VARIETIES
- Finitely presented nilsemigroups: complexes with the property of uniform ellipticity
- Combinatorial Algebra: Syntax and Semantics
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