18 results on '"HIRSCH, ROBIN"'
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2. EXPTIME-hardness of higher-dimensional Minkowski spacetime
- Author
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Hirsch, Robin and McLean, Brett
- Subjects
Mathematics - Logic ,Computer Science - Logic in Computer Science - Abstract
We prove the EXPTIME-hardness of the validity problem for the basic temporal logic on Minkowski spacetime with more than one space dimension. We prove this result for both the lightspeed-or-slower and the slower-than-light accessibility relations (and for both the irreflexive and the reflexive versions of these relations). As an auxiliary result, we prove the EXPTIME-hardness of validity on any frame for which there exists an embedding of the infinite complete binary tree satisfying certain conditions. The proof is by a reduction from the two-player corridor-tiling game., Comment: 15 pages
- Published
- 2022
3. A corrected strategy for proving no finite variable axiomatisation exists for RRA
- Author
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Egrot, Rob and Hirsch, Robin
- Subjects
Mathematics - Logic ,03G15 - Abstract
We show that if for all finite $c$ there is a pair of non-isomorphic finite digraphs satisfying some additional conditions, one of which is that they cannot be distinguished in a certain $c$-colour node colouring game, then there can be no axiomatisation of the class of representable relation algebras in any first-order theory of arbitrary quantifier-depth using only finitely many variables. This corrects the proposed strategy of Hirsch and Hodkinson, \emph{Relation algebras by games}, North-Holland (2002), Problem 1. However, even for $c=2$, no pair of non-isomorphic graphs indistinguishable in the game is currently known., Comment: This note is extracted from an earlier version of arXiv:2008.01329. A later version of this latter paper will omit this material
- Published
- 2021
4. Demonic Lattices and Semilattices in Relational Semigroups with Ordinary Composition
- Author
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Hirsch, Robin and Šemrl, Jaš
- Subjects
Computer Science - Logic in Computer Science ,Mathematics - Logic - Abstract
Relation algebra and its reducts provide us with a strong tool for reasoning about nondeterministic programs and their partial correctness. Demonic calculus, introduced to model the behaviour of a machine where the demon is in control of nondeterminism, has also provided us with an extension of that reasoning to total correctness. We formalise the framework for relational reasoning about total correctness in nondeterministic programs using semigroups with ordinary composition and demonic lattice operations. We show that the class of representable demonic join semigroups is not finitely axiomatisable and that the representation class of demonic meet semigroups does not have the finite representation property for its finite members. For lattice semigroups (with composition, demonic join and demonic meet) we show that the representation problem for finite algebras is undecidable, moreover the finite representation problem is also undecidable. It follows that the representation class is not finitely axiomatisable, furthermore the finite representation property fails.
- Published
- 2021
5. Temporal Logic of Minkowski Spacetime
- Author
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Hirsch, Robin and McLean, Brett
- Subjects
Mathematics - Logic ,03B44 - Abstract
We present the proof that the temporal logic of two-dimensional Minkowski spacetime is decidable, PSPACE-complete. The proof is based on a type of two-dimensional mosaic. Then we present the modification of the proof so as to work for slower-than-light signals. Finally, a subframe of the slower-than-light Minkowski frame is used to prove the new result that the temporal logic of real intervals with during as the accessibility relation is also PSPACE-complete.
- Published
- 2020
6. The algebra of non-deterministic programs: demonic operators, orders and axioms
- Author
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Hirsch, Robin, Mikulás, Szabolcs, and Stokes, Tim
- Subjects
Computer Science - Logic in Computer Science ,Computer Science - Computation and Language - Abstract
Demonic composition, demonic refinement and demonic union are alternatives to the usual "angelic" composition, angelic refinement (inclusion) and angelic (usual) union defined on binary relations. We first motivate both the angelic and demonic via an analysis of the behaviour of non-deterministic programs, with the angelic associated with partial correctness and demonic with total correctness, both cases emerging from a richer algebraic model of non-deterministic programs incorporating both aspects. Zareckii has shown that the isomorphism class of algebras of binary relations under angelic composition and inclusion is finitely axiomatised as the class of ordered semigroups. The proof can be used to establish that the same axiomatisation applies to binary relations under demonic composition and refinement, and a further modification of the proof can be used to incorporate a zero element representing the empty relation in the angelic case and the full relation in the demonic case. For the signature of angelic composition and union, it is known that no finite axiomatisation exists, and we show the analogous result for demonic composition and demonic union by showing that the same axiomatisation holds for both. We show that the isomorphism class of algebras of binary relations with the "mixed" signature of demonic composition and angelic inclusion has no finite axiomatisation. As a contrast, we show that the isomorphism class of partial algebras of binary relations with the partial operation of constellation product and inclusion (also a "mixed" signature) is finitely axiomatisable.
- Published
- 2020
7. Marxism, Logic and the Rate of Profit
- Author
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Hirsch, Robin
- Subjects
Quantitative Finance - General Finance ,Mathematics - Logic - Abstract
It is argued that Marxism, being based on contradictions, is an illogical method. More specifically, we present a rejection of Marx's thesis that the rate of profit has a long-term tendency to fall.
- Published
- 2020
8. Finite Representability of Semigroups with Demonic Refinement
- Author
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Hirsch, Robin and Šemrl, Jaš
- Subjects
Computer Science - Logic in Computer Science ,Mathematics - Logic - Abstract
Composition and demonic refinement $\sqsubseteq$ of binary relations are defined by \begin{align*} (x, y)\in (R;S)&\iff \exists z((x, z)\in R\wedge (z, y)\in S) R\sqsubseteq S&\iff (dom(S)\subseteq dom(R) \wedge R\restriction_{dom(S)}\subseteq S) \end{align*} where $dom(S)=\{x:\exists y (x, y)\in S\}$ and $R\restriction_{dom(S)}$ denotes the restriction of $R$ to pairs $(x, y)$ where $x\in dom(S)$. Demonic calculus was introduced to model the total correctness of non-deterministic programs and has been applied to program verification. We prove that the class $R(\sqsubseteq, ;)$ of abstract $(\leq, \circ)$ structures isomorphic to a set of binary relations ordered by demonic refinement with composition cannot be axiomatised by any finite set of first-order $(\leq, \circ)$ formulas. We provide a fairly simple, infinite, recursive axiomatisation that defines $R(\sqsubseteq, ;)$. We prove that a finite representable $(\leq, \circ)$ structure has a representation over a finite base. This appears to be the first example of a signature for binary relations with composition where the representation class is non-finitely axiomatisable, but where the finite representations for finite representable structures property holds.
- Published
- 2020
- Full Text
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9. First-order axiomatisations of representable relation algebras need formulas of unbounded quantifier depth
- Author
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Egrot, Rob and Hirsch, Robin
- Subjects
Mathematics - Logic ,03G15 - Abstract
Using a variation of the rainbow construction and various pebble and colouring games, we prove that RRA, the class of all representable relation algebras, cannot be axiomatised by any first-order relation algebra theory of bounded quantifier depth. We also prove that the class At(RRA) of atom structures of representable, atomic relation algebras cannot be defined by any set of sentences in the language of RA atom structures that uses only a finite number of variables., Comment: v3 makes significant revisions. Some material from v2 has been moved to arXiv:2109.01357
- Published
- 2020
10. Seurat games on Stockmeyer graphs
- Author
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Egrot, Rob and Hirsch, Robin
- Subjects
Mathematics - Combinatorics ,05C60 - Abstract
We define a family of vertex colouring games played over a pair of graphs or digraphs $(G,H)$ by players $\forall$ and $\exists$. These games arise from work on a longstanding open problem in algebraic logic. It is conjectured that there is a natural number $n$ such that $\forall$ always has a winning strategy in the game with $n$ colours whenever $G\not\cong H$. This is related to the reconstruction conjecture for graphs and the degree-associated reconstruction conjecture for digraphs. We show that the reconstruction conjecture implies our game conjecture with $n=3$ for graphs, and the same is true for the degree-associated reconstruction conjecture and our conjecture for digraphs. We show (for any $k<\omega$) that the 2-colour game can distinguish certain non-isomorphic pairs of graphs that cannot be distinguished by the $k$-dimensional Weisfeiler-Leman algorithm. We also show that the 2-colour game can distinguish the non-isomorphic pairs of graphs in the families defined by Stockmeyer as counterexamples to the original digraph reconstruction conjecture., Comment: v3 makes significant additions
- Published
- 2020
- Full Text
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11. The temporal logic of two-dimensional Minkowski spacetime with slower-than-light accessibility is decidable
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Hirsch, Robin and McLean, Brett
- Subjects
Mathematics - Logic ,Computer Science - Logic in Computer Science - Abstract
We work primarily with the Kripke frame consisting of two-dimensional Minkowski spacetime with the irreflexive accessibility relation 'can reach with a slower-than-light signal'. We show that in the basic temporal language, the set of validities over this frame is decidable. We then refine this to PSPACE-complete. In both cases the same result for the corresponding reflexive frame follows immediately. With a little more work we obtain PSPACE-completeness for the validities of the Halpern-Shoham logic of intervals on the real line with two different combinations of modalities., Comment: 20 pages
- Published
- 2018
12. Disjoint-union partial algebras
- Author
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Hirsch, Robin and McLean, Brett
- Subjects
Mathematics - Rings and Algebras ,Computer Science - Logic in Computer Science ,Mathematics - Logic - Abstract
Disjoint union is a partial binary operation returning the union of two sets if they are disjoint and undefined otherwise. A disjoint-union partial algebra of sets is a collection of sets closed under disjoint unions, whenever they are defined. We provide a recursive first-order axiomatisation of the class of partial algebras isomorphic to a disjoint-union partial algebra of sets but prove that no finite axiomatisation exists. We do the same for other signatures including one or both of disjoint union and subset complement, another partial binary operation we define. Domain-disjoint union is a partial binary operation on partial functions, returning the union if the arguments have disjoint domains and undefined otherwise. For each signature including one or both of domain-disjoint union and subset complement and optionally including composition, we consider the class of partial algebras isomorphic to a collection of partial functions closed under the operations. Again the classes prove to be axiomatisable, but not finitely axiomatisable, in first-order logic. We define the notion of pairwise combinability. For each of the previously considered signatures, we examine the class isomorphic to a partial algebra of sets/partial functions under an isomorphism mapping arbitrary suprema of pairwise combinable sets to the corresponding disjoint unions. We prove that for each case the class is not closed under elementary equivalence. However, when intersection is added to any of the signatures considered, the isomorphism class of the partial algebras of sets is finitely axiomatisable and in each case we give such an axiomatisation., Comment: 30 pages
- Published
- 2016
- Full Text
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13. Algebraic foundations for qualitative calculi and networks
- Author
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Hirsch, Robin, Jackson, Marcel, and Kowalski, Tomasz
- Subjects
Computer Science - Artificial Intelligence ,68T30 - Abstract
A qualitative representation $\phi$ is like an ordinary representation of a relation algebra, but instead of requiring $(a; b)^\phi = a^\phi | b^\phi$, as we do for ordinary representations, we only require that $c^\phi\supseteq a^\phi | b^\phi \iff c\geq a ; b$, for each $c$ in the algebra. A constraint network is qualitatively satisfiable if its nodes can be mapped to elements of a qualitative representation, preserving the constraints. If a constraint network is satisfiable then it is clearly qualitatively satisfiable, but the converse can fail. However, for a wide range of relation algebras including the point algebra, the Allen Interval Algebra, RCC8 and many others, a network is satisfiable if and only if it is qualitatively satisfiable. Unlike ordinary composition, the weak composition arising from qualitative representations need not be associative, so we can generalise by considering network satisfaction problems over non-associative algebras. We prove that computationally, qualitative representations have many advantages over ordinary representations: whereas many finite relation algebras have only infinite representations, every finite qualitatively representable algebra has a finite qualitative representation; the representability problem for (the atom structures of) finite non-associative algebras is NP-complete; the network satisfaction problem over a finite qualitatively representable algebra is always in NP; the validity of equations over qualitative representations is co-NP-complete. On the other hand we prove that there is no finite axiomatisation of the class of qualitatively representable algebras., Comment: 22 pages
- Published
- 2016
- Full Text
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14. The Temporal Logic of two dimensional Minkowski spacetime is decidable
- Author
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Hirsch, Robin and Reynolds, Mark
- Subjects
Mathematics - Logic ,03B44 - Abstract
We consider Minkowski spacetime, the set of all point-events of spacetime under the relation of causal accessibility. That is, ${\sf x}$ can access ${\sf y}$ if an electromagnetic or (slower than light) mechanical signal could be sent from ${\sf x}$ to ${\sf y}$. We use Prior's tense language of ${\bf F}$ and ${\bf P}$ representing causal accessibility and its converse relation. We consider two versions, one where the accessibility relation is reflexive and one where it is irreflexive. In either case it has been an open problem, for decades, whether the logic is decidable or axiomatisable. We make a small step forward by proving, for the case where the accessibility relation is irreflexive, that the set of valid formulas over two-dimensional Minkowski spacetime is decidable, decidability for the reflexive case follows from this. The complexity of either problem is PSPACE-complete. A consequence is that the temporal logic of intervals with real endpoints under either the containment relation or the strict containment relation is PSPACE-complete, the same is true if the interval accessibility relation is "each endpoint is not earlier", or its irreflexive restriction. We provide a temporal formula that distinguishes between three-dimensional and two-dimensional Minkowski spacetime and another temporal formula that distinguishes the two-dimensional case where the underlying field is the real numbers from the case where instead we use the rational numbers., Comment: 30 pages
- Published
- 2015
15. Meet-completions and ordered domain algebras
- Author
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Egrot, Rob and Hirsch, Robin
- Subjects
Mathematics - Rings and Algebras - Abstract
Using the well-known equivalence between meet-completions of posets and standard closure operators we show a general method for constructing meet-completions for isotone poset expansions. With this method we find a meet-completion for ordered domain algebras which simultaneously serves as the base of a representation for such algebras, thereby proving that ordered domain algebras have the finite representation property. We show that many of the equations defining ordered domain algebras are preserved in this completion but associativity, (D2) and (D6) can fail.
- Published
- 2015
16. The algebra of functions with antidomain and range
- Author
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Hirsch, Robin, Jackson, Marcel, and Mikulás, Szabolcs
- Subjects
Mathematics - Logic ,Computer Science - Logic in Computer Science ,20M20, 03G15, 08A02 - Abstract
We give complete, finite quasiequational axiomatisations for algebras of unary partial functions under the operations of composition, domain, antidomain, range and intersection. This completes the extensive programme of classifying algebras of unary partial functions under combinations of these operations. We look at the complexity of the equational theories and provide a nondeterministic polynomial upper bound. Finally we look at the problem of finite representability and show that finite algebras can be represented as a collection of unary functions over a finite base set provided that intersection is not in the signature.
- Published
- 2014
17. There is no finite-variable equational axiomatization of representable relation algebras over weakly representable relation algebras
- Author
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Alm, Jeremy F., Hirsch, Robin, and Maddux, Roger D.
- Subjects
Mathematics - Logic ,Mathematics - Rings and Algebras ,03G15 - Abstract
We prove that any equational basis that defines RRA over wRRA must contain infinitely many variables. The proof uses a construction of arbitrarily large finite weakly representable but not representable relation algebras whose "small" subalgebras are representable., Comment: To appear in Review of Symbolic Logic
- Published
- 2013
- Full Text
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18. Completely Representable Lattices
- Author
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Egrot, Robert and Hirsch, Robin
- Subjects
Mathematics - Rings and Algebras ,06D05 (Primary) 03G10 (Secondary) - Abstract
It is known that a lattice is representable as a ring of sets iff the lattice is distributive. CRL is the class of bounded distributive lattices (DLs) which have representations preserving arbitrary joins and meets. jCRL is the class of DLs which have representations preserving arbitrary joins, mCRL is the class of DLs which have representations preserving arbitrary meets, and biCRL is defined to be the intersection of jCRL and mCRL. We prove CRL is a strict subset of biCRL which is a strict subset of both jCRL and mCRL. Let L be a DL. Then L is in mCRL iff L has a distinguishing set of complete, prime filters. Similarly, L is in jCRL iff L has a distinguishing set of completely prime filters, and L is in CRL iff L has a distinguishing set of complete, completely prime filters. Each of the classes above is shown to be pseudo-elementary and hence closed under ultraproducts. The class CRL is not closed under elementary equivalence, hence it is not elementary., Comment: This revised version corrects a small error in the statement of proposition 2.16 that appeared in the published version
- Published
- 2012
- Full Text
- View/download PDF
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