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Viro Method for the Construction of Real Complete Intersections
The Viro method is a powerful construction method of real nonsingular algebraic hypersurfaces with prescribed topology. It is based on polyhedral subdivisions of Newton polytopes.
Bihan, F.
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2021
A Cadenza is typically a more expressive, ornamental passage towards the end of a musical work, usually by a soloist – here it serves to contrast Spinoza and Gramsci’s readings of Machiavelli’s The Prince in terms of the symbolic and collective nature of power.
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A Cadenza is typically a more expressive, ornamental passage towards the end of a musical work, usually by a soloist – here it serves to contrast Spinoza and Gramsci’s readings of Machiavelli’s The Prince in terms of the symbolic and collective nature of power.
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Historiallinen Aikakauskirja, 1999
Arvosteltu teos: Viro: Historia, kansa, kulttuuri. Toimittanut Seppo Zetterberg. SKS toimituksia 610. Jyväskylä 1995. 402 s.
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Arvosteltu teos: Viro: Historia, kansa, kulttuuri. Toimittanut Seppo Zetterberg. SKS toimituksia 610. Jyväskylä 1995. 402 s.
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ON THE COMPUTATION OF THE TURAEV-VIRO MODULE OF A KNOT
Journal of Knot Theory and Its Ramifications, 1998Let M be the manifold obtained by 0-framed surgery along a knot K in the 3-sphere. A Topological Quantum Field Theory assigns to a fundamental domain of the universal abelian cover of M an operator, whose non-nilpotent part is the Turaev-Viro module of K.
Abchir, H., Blanchet, C.
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2003
These invariants were first described by V. Turaev and 0. Viro [121]. They possess two important properties. First, just like homology groups, they are easy to calculate. Only the limitations of the computer at hand may cause some difficulties. Second, they are very powerful, especially if used together with the first homology group.
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These invariants were first described by V. Turaev and 0. Viro [121]. They possess two important properties. First, just like homology groups, they are easy to calculate. Only the limitations of the computer at hand may cause some difficulties. Second, they are very powerful, especially if used together with the first homology group.
openaire +1 more source

