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Generalized closed sets and T?/?-spaces /Dunham, William Wade January 1974 (has links)
No description available.
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On the unimodality of the independent set numbers of a class of matroids /Mahoney, Carolyn Ray Boone January 1982 (has links)
No description available.
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On the fixed point property for Grassmann manifolds /O'Neill, Larkin Shaumus January 1974 (has links)
No description available.
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On the collection of topologies on a set which make a map from the set onto a topological space an identification /Gearhart, Thomas Kent January 1979 (has links)
No description available.
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Characterizations of properties of spaces of finitely additive set functions in terms of mappings and integralsBell, Wayne C. 12 1900 (has links)
Settings and notions are as in previous abstracts of W. D. L. Appling. This paper contains an investigation of the relationship between a class of non-linear functions defined on PAB and certain subspaces of PAB in particular Appling's linear C-sets, Solomon leader's finitely additive Lp spaces, and one of the projective limit spaces studied by Davis, Murray, and Weber.
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On counting points in hypercubes, additive sequences and [lambda](p) sets /Hajela, Dhananjay January 1983 (has links)
No description available.
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Topological transversality of condensing set-valued mapsKaczynski, Tomasz. January 1986 (has links)
No description available.
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P. A. Smith theory for coarse homology /Savin, Lucian. Hambleton, I. January 1900 (has links)
Thesis (Ph.D.)--McMaster University, 2005. / Advisor: Ian Hambleton. Includes bibliographical references (leaves 74-75). Also available via World Wide Web.
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Topological transversality of condensing set-valued mapsKaczynski, Tomasz. January 1986 (has links)
No description available.
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Multiple-valued functions in the sense of F. J. AlmgrenGoblet, Jordan 19 June 2008 (has links)
A multiple-valued function is a "function" that assumes two or more distinct values in its range for at least one point in its domain. While these "functions" are not functions in the normal sense of being single-valued, the usage is so common that there is no way to dislodge it. This thesis is devoted to a particular class of multiple-valued functions: Q-valued functions.
A Q-valued function is essentially a rule assigning Q unordered and not necessarily distinct points of R^n to each element of R^m. This object is one of the key ingredients of Almgren's 1700 pages proof that the singular set of an m-dimensional mass minimizing integral current in R^n has dimension at most m-2.
We start by developing a decomposition theory and show for instance when a continuous Q-valued function can or cannot be seen as Q "glued" continuous classical functions. Then, the decomposition theory is used to prove intrinsically a Rademacher type theorem for Lipschitz Q-valued functions. A couple of Lipschitz extension theorems are also obtained for partially defined Lipschitz Q-valued functions.
The second part is devoted to a Peano type result for a particular class of nonconvex-valued differential inclusions. To the best of the author's knowledge this is the first theorem, in the nonconvex case, where the existence of a continuously differentiable solution is proved under a mere continuity assumption on the corresponding multifunction. An application to a particular class of nonlinear differential equations is included.
The third part is devoted to the calculus of variations in the multiple-valued framework. We define two different notions of Dirichlet nearly minimizing Q-valued functions, generalizing Dirichlet energy minimizers studied by Almgren. Hölder regularity is obtained for these nearly minimizers and we give some examples showing that the branching phenomena can be much worse in this context.
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