2,716 research outputs found

    An interview with Millicent Baxter

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    Author and mother of James K. Baxter talks of her life and family.A Radio New Zealand Sound Archive recording dubbed by the Stout Research Centre Literary Archive

    Michael Rodriguez interviews writer Charles Baxter

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    Charles Baxter talks about his book "The Feast of Love", the relationship between the landscape of Michigan and the setting of his novels, metaphysics in his novels, his career as both a writer and a college teacher, how a male author writes female characters, and voyeurism in his book. Baxter is interviewed by Michigan State University Librarian Michael Rodriguez. Part of the MSU Libraries' Michigan Writers Series

    The New Indian Merger Control: Key Procedural Issues

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    India should be at the top of the list of priority jurisdictions for every transaction involving any company with significant activities in India. Simon Baxter & Nikolaos Peristerakis (Skadden, Arps)

    The New Indian Merger Control: Key Procedural Issues, II

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    India should be at the top of the list of priority jurisdictions for every transaction involving any company with significant activities in India. Simon Baxter & Nikolaos Peristerakis (Skadden, Arps)

    Iain Baxter : Landscape Works

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    Catalogue to accompany Baxter’s exhibition of approximately 40 multidisciplinary landscape works (1965-1999) in painting, photography, printmaking, video and sculpture. Tupper’s foreword draws attention to the artist’s connections with Alberta and its landscape. The author also refers to the role of landscape in Baxter’s art as a “container for the social and the self.” The artist’s statement describes the various uses of landscape in his studies and work since the late 1950s. In her biographical essay, curator Townsend analyses Baxter’s artistic contribution over four decades, giving special attention to landscape and the impact of the N. E. Thing Company (founded with Ingrid Baxter in 1966) on the genre’s renewal. Bibliography 1p. 4 bibl. ref

    Dynamical Yang-Baxter maps

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    In this work, we propose and investigate dynamical Yang- Baxter maps, some of which produce solutions to the quantum dynamical Yang-Baxter equation. Suppose that L is a loop and a group. If their unit elements coincide, then L gives birth to a bijective dynamical Yang-Baxter map from L×L to L×L whose dynamical parameter belongs to L. The above group L is abelian if and only if the corresponding dynamical Yang-Baxter map satisfies the unitary condition.IDS Number: 990C

    Mixed Tenure, Special Interest/Ethno-Cultural and Campus of Care Projects - 23RD ANNUAL JOHN K. FRIESEN CONFERENCE "Housing Alternatives for an Aging Population" May 28-29, 2014

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    Chair: Dan Levitt, Executive Director, Tabor Village and Adjunct Professor, SFU Department of GerontologyLori Baxter, President, Board of Trustees, Performing Arts Lodge Vancouver;Teena Love, General Manager, Amenida Seniors CommunityRon Pike, Executive Director, Elim Village27mi

    Details on the author\u27s visit earlier this month to Baxter State Park, who found

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    Details on the author\u27s visit earlier this month to Baxter State Park, who found a park much changed from the one visited during the summer. The author notes that the smell of a snowmobile lingers for 20 minutes after it passes

    Rota–Baxter Operators on Quadratic Algebras

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    We prove that all Rota–Baxter operators on a quadratic division algebra are trivial. For nonzero weight, we state that all Rota–Baxter operators on the simple odd-dimensional Jordan algebra of bilinear form are projections on a subalgebra along another one. For weight zero, we find a connection between the Rota–Baxter operators and the solutions to the alternative Yang–Baxter equation on the Cayley–Dickson algebra. We also investigate the Rota–Baxter operators on the matrix algebras of order two, the Grassmann algebra of plane, and the Kaplansky superalgebra.© The Author(s) 201

    Baxter Q-operator and functional relations

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    AbstractWe obtain the Baxter Q-operators in the Uq(slˆ2) invariant integrable models as a special limits of the quantum transfer matrices corresponding to different spins in the auxiliary space. We derive the Baxter equation from the well-known fusion relations for the transfer matrices. Our method is valid for an arbitrary integrable model corresponding to the quantum group Uq(slˆ2), for example for the XXZ-spin chain
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