@inproceedings{18575,
author = {Sohler, Christian and Denny, Markus},
booktitle = {Proceedings of the 9th Canadian Conference on Computational Geometry},
pages = {39--43},
title = {{Encoding a Triangulation as a Permutation of its Point Set}},
year = {1997},
}
@article{18626,
abstract = {We present a simple analytic scheme for calculating the binding energy of excitons in semiconductors that takes full account of the existing anisotropy in the effective mass, as a complement to the qualitative treatment in most textbooks. Results obtained for excitons in gallium nitride form the basis for a discussion of the accuracy of this approach.},
author = {Schindlmayr, Arno},
issn = {1361-6404},
journal = {European Journal of Physics},
number = {5},
pages = {374--376},
publisher = {IOP Publishing and The European Physical Society},
title = {{Excitons with anisotropic effective mass}},
doi = {10.1088/0143-0807/18/5/011},
volume = {18},
year = {1997},
}
@techreport{18955,
abstract = {In this paper we present a (randomized) algorithm for maintaining the biconnected components of a dynamic planar graph of $n$ vertices under deletions of edges. The biconnected components can be maintained under any sequence of edge deletions in a total of $O(n log n)$ time, with high probability. This gives $O(log n)$ amortized time per edge deletion, which improves previous (deterministic) results due to Giammarresi and Italiano, where $O(n log^2 n)$ amortized time is needed. Our work describes a simplification of the data structures from [GiIt96] and uses dynamic perfect hashing to reduce the running time. As in the paper by Giammarresi and Italiano, we only need $O(n)$ space. Finally we describe some simply additional operations on the decremental data structure. By aid of them this the data structure is applicable for finding efficiently a $Delta$-spanning tree in a biconnected planar graph with a maximum degree $2Delta-2$ do to Czumaj and Strothmann.},
author = {Strothmann, Willy-Bernhard and Lukovszki, Tamás},
title = {{Decremental Biconnectivity on Planar Graphs}},
year = {1997},
}
@article{19410,
author = {Eke, Norbert Otto},
journal = {Deutsche Vierteljahrsschrift für Literaturwissenschaft und Geistesgeschichte},
number = {H. 4},
pages = {701--723},
title = {{Planziel Vernichtung. Zwei Versuche über das Unfaßbare des Völkermords: Franz Werfels Die vierzig Tage des Musa Dagh (1933) und Edgar Hilsenraths Das Märchen vom letzten Gedanken (1989)}},
volume = {71},
year = {1997},
}
@phdthesis{19636,
author = {Dittrich, Wolfgang},
isbn = {3-931466-26-4},
title = {{Communication and I/O Efficient Parallel Data Structures}},
year = {1997},
}
@phdthesis{19631,
author = {Bäumker, Armin},
isbn = {3-931466-27-2},
title = {{Communication Efficient Parallel Searching}},
year = {1997},
}
@inproceedings{19869,
abstract = {Given a connected graph $G$, let a $dT$-spanning tree of $G$ be a spanning tree of $G$ of maximum degree bounded by $dT$. It is well known that for each $dT ge 2$ the problem of deciding whether a connected graph has a $dT$-spanning tree is NP-complete. In this paper we investigate this problem when additionally connectivity and maximum degree of the graph are given. A complete characterization of this problem for 2- and 3-connected graphs, for planar graphs, and for $dT=2$ is provided. Our first result is that given a biconnected graph of maximum degree $2dT-2$, we can find its $dT$-spanning tree in time $O(m+n^3/2)$. For graphs of higher connectivity we design a polynomial-time algorithm that finds a $dT$-spanning tree in any $k$-connected graph of maximum degree $k(dT-2)+2$. On the other hand, we prove that deciding whether a $k$-connected graph of maximum degree $k(dT-2)+3$ has a $dT$-spanning tree is NP-complete, provided $k le 3$. For arbitrary $k ge 3$ we show that verifying whether a $k$-connected graph of maximum degree $k(dT-1)$ has a $dT$-spanning tree is NP-complete. In particular, we prove that the Hamiltonian path (cycle) problem is NP-complete for $k$-connected $k$-regular graphs, if $k>2$. This extends the well known result for $k=3$ and fully characterizes the case $dT=2$. For planar graphs it is NP-complete to decide whether a $k$-connected planar graph of maximum degree $dG$ has a $dT$-spanning tree for $k=1$ and $dG > dT ge 2$, for $k=2$ and $dG > 2(dT-1) ge 2$, and for $k=3$ and $dG > dT = 2$. On the other hand, we show how to find in polynomial (linear or almost linear) time a $dT$-spanning tree for all other parameters of $k$, $dG$, and $dT$.},
author = {Czumaj, Artur and Strothmann, Willy-B.},
booktitle = {Proceedings of the Fifth Annual European Symposium on Algorithms (ESA'97)},
isbn = {9783540633976},
issn = {0302-9743},
title = {{Bounded degree spanning trees}},
doi = {10.1007/3-540-63397-9_9},
year = {1997},
}
@inproceedings{20739,
author = {Hahn, O. and Meschut, Gerson},
booktitle = {Tagungsband zur Swiss Bonding ´97},
location = {Rapperswil (CH)},
title = {{Bonding of Aluminium Profile joints}},
year = {1997},
}
@article{10609,
author = {Platzner, Marco and Rinner, Bernhard and Weiss, Reinhold},
journal = {e & i Elektrotechnik und Informationstechnik},
pages = {13--18},
publisher = {Springer},
title = {{A Computer Architecture to Support Qualitative Simulation in Industrial Applications}},
volume = {114},
year = {1997},
}
@article{10724,
author = {Platzner, Marco and Rinner, Bernhard and Weiss, Reinhold},
journal = {Simulation Practice and Theory},
number = {7-8},
pages = {623--638},
publisher = {Elsevier},
title = {{Parallel qualitative simulation}},
doi = {10.1016/s0928-4869(97)00008-6},
volume = {5},
year = {1997},
}