R. Z. Buzyakova, A. Chigogidze (2011)
Fundamenta Mathematicae
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Our main result states that every fixed-point free continuous self-map of ℝⁿ is colorable. This result can be reformulated as follows: A continuous map f: ℝⁿ → ℝⁿ is fixed-point free iff f̃: βℝⁿ → βℝⁿ is fixed-point free. We also obtain a generalization of this fact and present some examples
Hentzel, I.R., Peresi, L.A. (2006)
Experimental Mathematics
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A. J. Kfoury (1988)
Banach Center Publications
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Caro, Yair (1990)
International Journal of Mathematics and Mathematical Sciences
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Jean Berstel (1985)
Publications du Département de mathématiques (Lyon)
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Xavier Ros-Oton, Joaquim Serra (2019)
Matematica, Cultura e Società. Rivista dell'Unione Matematica Italiana
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Free boundary problems are those described by PDEs that exhibit a priori unknown (free) interfacesor boundaries. The most classical example is the melting of ice to water (the Stefan problem). In this case, the freeboundary is the liquid-solid interface between ice and water. A central mathematical challenge in this context is to understand the regularity and singularities of free boundaries. In this paper we provide a gentle introduction to this topic by presenting some classical results...
Suk, Andrew (2008)
The Electronic Journal of Combinatorics [electronic only]
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A. Kumar, P. K. Pathak (1976)
Colloquium Mathematicae
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Tomasz Schoen (2001)
Acta Arithmetica
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Melanie Hinz, Wojciech Młotkowski (2007)
Banach Center Publications
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B. Tilson (1972)
Semigroup forum
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Yoann Dabrowski, Kenneth J. Dykema, Kunal Mukherjee (2014)
Studia Mathematica
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We show that the space of tracial quantum symmetric states of an arbitrary unital C*-algebra is a Choquet simplex and is a face of the tracial state space of the universal unital C*-algebra free product of A with itself infinitely many times. We also show that the extreme points of this simplex are dense, making it the Poulsen simplex when A is separable and nontrivial. In the course of the proof we characterize the centers of certain tracial amalgamated free product C*-algebras. ...
Đuro Kurepa (1987)
Publications de l'Institut Mathématique
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Jan Mycielski (1958)
Fundamenta Mathematicae
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F. Levin, G. Rosenberger, B. Baumslag (1993)
Mathematische Zeitschrift
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Ruimei Gao, Xiupeng Cui, Zhe Li (2017)
Open Mathematics
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In this paper, we define the supersolvable order of hyperplanes in a supersolvable arrangement, and obtain a class of inductively free arrangements according to this order. Our main results improve the conclusion that every supersolvable arrangement is inductively free. In addition, we assert that the inductively free arrangement with the required induction table is supersolvable.
Calkin, Neil J., Finch, Steven R. (1996)
Experimental Mathematics
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Karl Dilcher, Lutz G. Lucht (2006)
Acta Arithmetica
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