94,053 research outputs found

    McKay correspondence for Landau-Ginzburg models

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    In this paper we prove an analogue of the McKay correspondence for Landau-Ginzburg models. Our proof is based on the ideas introduced by T. Bridgeland, A. King and M. Reid, which reformulate and generalize the McKay correspondence in the language of derived categories, along with the techniques introduced by J.-C. Chen

    Mckay, J F, NX107113

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    This record was harvested from a previous catalogue system and will be withdrawn in 2025. Information in this record may be superseded or incomplete. Visit this record in UMA's new catalogue at: https://archives.library.unimelb.edu.au/nodes/view/403617Surname: MCKAY. Given Name(s) or Initials: J F. Military Service Number or Last Known Location: NX107113. Missing, Wounded and Prisoner of War Enquiry Card Index Number: 46987.225096 Item: [2016.0049.35909] "Mckay, J F, NX107113

    Mckay, F B, VX15582

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    This record was harvested from a previous catalogue system and will be withdrawn in 2025. Information in this record may be superseded or incomplete. Visit this record in UMA's new catalogue at: https://archives.library.unimelb.edu.au/nodes/view/403630Surname: MCKAY. Given Name(s) or Initials: F B. Military Service Number or Last Known Location: VX15582. Missing, Wounded and Prisoner of War Enquiry Card Index Number: 9182.225123 Item: [2016.0049.35922] "Mckay, F B, VX15582

    Mckay, R F, 411159

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    This record was harvested from a previous catalogue system and will be withdrawn in 2025. Information in this record may be superseded or incomplete. Visit this record in UMA's new catalogue at: https://archives.library.unimelb.edu.au/nodes/view/403608Surname: MCKAY. Given Name(s) or Initials: R F. Military Service Number or Last Known Location: 411159. Missing, Wounded and Prisoner of War Enquiry Card Index Number: 52859.225080 Item: [2016.0049.35901] "Mckay, R F, 411159

    Mckay, A T F, 11729

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    This record was harvested from a previous catalogue system and will be withdrawn in 2025. Information in this record may be superseded or incomplete. Visit this record in UMA's new catalogue at: https://archives.library.unimelb.edu.au/nodes/view/403604Surname: MCKAY. Given Name(s) or Initials: A T F. Military Service Number or Last Known Location: 11729. Missing, Wounded and Prisoner of War Enquiry Card Index Number: 41886.225071 Item: [2016.0049.35897] "Mckay, A T F, 11729

    Topics in orbifold geometry and Gorenstein homogeneous spaces

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    I study two problems from different domains. The first problem is related to orbifold geometry and the second to Gorenstein homogeneous spaces. Though two different topics, they share a common theme: the Gorenstein property. The first half of the thesis is related to the McKay correspondence. In particular we study a relation between the McKay correspondence in dimensions two and three. The primary purpose is to prove a theorem that generalises a conjecture given by Barth, proved by Boissiere and Sarti. The second half of the thesis is mainly about Gorenstein homogeneous spaces. We prove a theorem that gives a necessary and sufficient condition for the canonical divisor to vanish on a quasi-homogeneous affine algebraic variety

    1955 Winning Entries in the Newfoundland Government Sponsored Competition for the Encouragement of Arts and Letters, Etc.

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    Arts and Letters Competition 1955First Constitutional Suspension / L. E. F. English -- Black Rock Sunker / Cassie Brown -- Grandpa and the Writer / Muriel McKay -- In Memorium Kathleen Ferrier / Leonore Pratt -- Ballad / L. E. F. EnglishTitle from cover

    Marriage record of McKay, Mitchell F. and Givens, Janie

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    Marriage license for Mitchell F. McKay and Janie Givens. I.G. Anderson was the officiant

    Invariant holomorphic foliations on kobayashi hyperbolic homogeneous manifolds

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    Let M be a Kobayashi hyperbolic homogeneous manifold. Let F be a holomorphic foliation on M invariant under a transitive group G of bi-holomorphisms. We prove that the leaves of F are the fibers of a holomorphic G-equivariant submersion pi : M -> N onto a G-homogeneous complex manifold N. We also show that if Q is an automorphism family of a hyperbolic convex (possibly unbounded) domain D in C-n, then the fixed point set of Q is either empty or a connected complex submanifold of D

    Ranger McKay and CCC Men

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    Ranger McKay talking to the CCC boys from Packer Meadows Camp F-23, Selway National Forest, Idaho. Photo taken in September.F-2
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