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Professor Hilary Priestley
Personal Web Page
eMail:
Hilary [dot] Priestley [-at-] maths [dot] ox [dot] ac [dot] uk
Contact Form
Phone Number(s):
Reception/Secretary: +44 1865 273525
Direct: +44 1865 273536
Office:
SGF9
Preferred Address:
Mathematical Institute
Departmental Address:
Mathematical Institute
24-29 St Giles'
Oxford
OX1 3LB
England
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Recent Publications (from MathSciNet):
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MR2854696 Davey, B. A.; Gouveia, M. J.; Haviar, M.; Priestley, H. A. Multisorted dualisability: change of base.
Algebra Universalis 66 (2011), no. 4, 331–336, 08C20 (08C15)
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MR2852041 Davey, B. A.; Gouveia, M. J.; Haviar, M.; Priestley, H. A. Natural extensions and profinite completions of algebras.
Algebra Universalis 66 (2011), no. 3, 205–241, 08B25 (06D50 08C15 08C20)
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MR2812482 Davey, B. A.; Priestley, H. A. A topological approach to canonical extensions in finitely generated
varieties of lattice-based algebras.
Topology Appl. 158 (2011), no. 13, 1724–1731. (Reviewer: Hans Weber), 06B23 (06B30 54H12)
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MR2417726 (2009c:06005) Gehrke, Mai; Priestley, Hilary A. Canonical extensions and completions of posets and lattices.
Rep. Math. Logic No. 43 (2008), 133–152. (Reviewer: N. K. Thakare), 06B23 (06B05)
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MR2386529 (2009e:08003) Errata: "Endodualisable and endoprimal finite double Stone algebras''
[Algebra Universalis 42 (1999), no. 1-2, 107--130; MR1736344] by M. Haviar and H. A. Priestley.
Algebra Universalis 58 (2008), no. 2, 203–228, 08A35 (06D15 08A40)
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MR2322668 (2008f:06023) Gehrke, M.; Priestley, H. A. Duality for double quasioperator algebras via their canonical
extensions.
Studia Logica 86 (2007), no. 1, 31–68. (Reviewer: R. Piziak), 06D50 (06B23 06D35 18A99)
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MR2320761 (2008g:06008) Davey, B. A.; Haviar, M.; Priestley, H. A. Boolean topological distributive lattices and canonical
extensions.
Appl. Categ. Structures 15 (2007), no. 3, 225–241. (Reviewer: T. S. Blyth), 06D05 (06B30 06D50)
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MR2292133 (2007j:06007) Gehrke, M.; Priestley, H. A. Canonical extensions of double quasioperator algebras: an algebraic
perspective on duality for certain algebras with binary operations.
J. Pure Appl. Algebra 209 (2007), no. 1, 269–290, 06A15 (06B23 06D35 18A99)
More publications
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