V. Note on M. Mascart's paper, “On magnetization”
نویسندگان
چکیده
منابع مشابه
Note on M-grotjpoids
In a recent paper of Tamura, Merkel, and Latimer [2], the following question was raised: Suppose 5 is a groupoid (cf. [l]) which satisfies: (1) There is at least one left identity in S. (2) If y or z is a left identity of 5, then x(yz) =■= (xy)z for all xES. (3) For all a, bES there exists x£5 such that ax = b. Then does S satisfy: (3') For any xES there is a unique left identity e (which may d...
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The proof of the above theorem, derived from ideas of A. Dolich, is more direct then the original proof of Theorem 0.1. Unfortunately, Theorem 0.2 fails in the case when φ(C, ā) is not closed and bounded. Our proof of Theorem 0.1 is similar to the proof of Y. Peterzil and A. Pillay, and is also more direct then the original proof of A. Dolich. We also derive an appropriate generalization of The...
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In Section 3.1 of [1] a methodology is presented to compute the salient points of a 3D mesh based on the computation of its protrusion function, see Equation (1) in [1]. Explicitly each point υ of the Mesh is examined as a potential salient point. Specifically a geodesic neighborhood is constructed for each point of the mesh and it is considered as a salient point if it is the local maximum of ...
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Recently Broyden 1] proved a property of orthogonal matrices from which he derived Farkas' lemma and some related results. It is shown that Broyden's result straightforwardly follows from well-known theorems of the alternative, like Motzkin's transposition theorem and Tucker's theorem, which are all logically equivalent to Farkas' lemma; we also answer the question of Broyden on how to eecientl...
متن کاملNote on a paper by N. Ujevic
A generalization of two sharp inequalities in a recent paper by N. Ujević is established. Applications in numerical integration are also given and the results of N. Ujević are revised and improved. c © 2006 Elsevier Ltd. All rights reserved.
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ژورنال
عنوان ژورنال: The London, Edinburgh, and Dublin Philosophical Magazine and Journal of Science
سال: 1886
ISSN: 1941-5982,1941-5990
DOI: 10.1080/14786448608627897