Displaying similar documents to “On biconnected sets with dispersion points”

May the Sea-Battle Tommorow Not Happen?

Bożena Pięta (2020)

Bulletin of the Section of Logic

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This note provides a review of the book 'On the Sea-Battle Tomorrow That May Not Happen' by Tomasz Jarmużek.

On local proof restrictions for strong theories

Don Jensen

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CONTENTSIntroduction.................................................................................................................... 5Chapter 1. Preliminaries............................................................................................. 7Chapter 2. Formal arithmetization............................................................................. 12Chapter 3. Proof restriction functions....................................................................... 18Chapter...

Some results concerning the ends of minimal cuts of simple graphs

Xiaofeng Jia (2000)

Discussiones Mathematicae Graph Theory

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Let S be a cut of a simple connected graph G. If S has no proper subset that is a cut, we say S is a minimal cut of G. To a minimal cut S, a connected component of G-S is called a fragment. And a fragment with no proper subset that is a fragment is called an end. In the paper ends are characterized and it is proved that to a connected graph G = (V,E), the number of its ends Σ ≤ |V(G)|.

Minimal topologies

C. T. Scarborough, R. M. Stephenson, Jr. (1968)

Colloquium Mathematicae

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Bibliography of the Works of Professor Edward A. Friedman

Editors (2015)

Serdica Journal of Computing

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Refereed Journal Articles Refereed Conference Proceedings Book Chapters Invited Articles/Reviews Research Reports Published Teaching Cases Other publications Presentation at a Panel Discussion

Locally connected exceptional minimal sets of surface homeomorphisms

Andrzej Biś, Hiromichi Nakayama, Pawel Walczak (2004)

Annales de l’institut Fourier

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We deal with locally connected exceptional minimal sets of surface homeomorphisms. If the surface is different from the torus, such a minimal set is either finite or a finite disjoint union of simple closed curves. On the torus, such a set can admit also a structure similar to that of the Sierpiński curve.