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Congenital triangular alopecia
British Journal of Dermatology, 1976Three new cases of congenital triangular alopecia are reported and the differential diagnosis of this rare developmental defect is discussed.
R, Kubba, A, Rook
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The Mathematical Gazette, 1972
Shiu has shown [1] that there are infinitely many triangular numbers that are also square. He remarked that while his theorem did give a list of such numbers, it did not give all of them. It seemed that there might be a reiterative method, working in integers, that gave more of these triangular square numbers, and which included all the known smaller ...
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Shiu has shown [1] that there are infinitely many triangular numbers that are also square. He remarked that while his theorem did give a list of such numbers, it did not give all of them. It seemed that there might be a reiterative method, working in integers, that gave more of these triangular square numbers, and which included all the known smaller ...
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Triangular fibrocartilage tears
The Journal of Hand Surgery, 1994From a series of 56 patients with triangular fibrocartilage injury, 33 patients with peripheral rim tears not associated with instability of the distal radioulnar joint were identified by arthrography or arthroscopy. Open repair of the peripheral tear produced 11 excellent, 15 good, 6 fair, and 1 poor result (grading based on a Mayo modified Green-O ...
W P, Cooney, R L, Linscheid, J H, Dobyns
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Canadian Mathematical Bulletin, 1985
AbstractWe modify the construction of the mod 2 Dyer-Lashof (co)-algebra to obtain a (co)-algebra W which is (also) unstable over the Steenrod algebra A*. W has canonical sub-coalgebras W[k] such that the hom-dual W[k:]* is isomorphic as an A-algebra to the ring of upper triangular invariants in ℤ/2ℤ [x1, . . . , xk].
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AbstractWe modify the construction of the mod 2 Dyer-Lashof (co)-algebra to obtain a (co)-algebra W which is (also) unstable over the Steenrod algebra A*. W has canonical sub-coalgebras W[k] such that the hom-dual W[k:]* is isomorphic as an A-algebra to the ring of upper triangular invariants in ℤ/2ℤ [x1, . . . , xk].
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Triangular transchamber suture
Journal of Cataract and Refractive Surgery, 2001A 64-year-old woman with a fibrous membrane at the lens plane after traumatic loss of all the iris and massive intraocular hemorrhage had posterior chamber intraocular lens (PCIOL) implantation anterior to the fibrous membrane with a triangular transchamber suture to prevent possible PCIOL-corneal touch and enhance the stability of the PCIOL.
M S, Seo, H J, Nah, K J, Yang, Y G, Park
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The Journal of Otolaryngology, 2007
The aim of this technique is shortening and tightening the soft palate to increase the retropalatal upper airway patency. Postoperative scarring may also stabilize the soft palate and thus prevent vibration and snoring sound generation at this site.
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The aim of this technique is shortening and tightening the soft palate to increase the retropalatal upper airway patency. Postoperative scarring may also stabilize the soft palate and thus prevent vibration and snoring sound generation at this site.
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Continuous triangular subnorms
Fuzzy Sets and Systems, 2004zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Triangular order of triangular phase-type distributions∗
Communications in Statistics. Stochastic Models, 1993Summary: The order of a phase-type distribution is the least number of states needed to represent it. This quantity is not well understood. In this paper we introduce a simpler quantity in the context of triangular (acyclic) phase-type distributions, called triangular order. This is the least number of states needed for a triangular representation.
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Bicombing triangular buildings
Siberian Mathematical Journal, 1999The article under review is devoted to the problem of describing finitely generated biautomatic groups. Let \(\Sigma_0\) be a simplicial complex corresponding to a filling of the Euclidean plane by equilateral triangles. A simplicial complex \(\Delta\) is called a triangular building if it can be represented as the union of a family of subcomplexes ...
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