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Publication
A categorification of the quantum sl(N)-link polynomials using foams
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Advisor(s)
Abstract(s)
In this thesis we define and study a categorification of the sl(N)-link polynomial using
foams, for N 3.
For N = 3 we define the universal sl(3)-link homology, using foams, which depends
on three parameters and show that it is functorial, up to scalars, with respect to link
cobordisms. Our theory is integral. We show that tensoring it with Q yields a theory
which is equivalent to the rational universal Khovanov-Rozansky sl(3)-link homology.
For N 4 we construct a rational theory categorifying the sl(N)-link polynomial using
foams. Our theory is functorial, up to scalars, with respect to link cobordisms. To
evaluate closed foams we use the Kapustin-Li formula. We show that for any link our
homology is isomorphic to the Khovanov-Rozansky homology. We conjecture that the
theory is integral and we compute the conjectured integral sl(N)-link homology for
the (2;m)-torus links and show that it has torsion of order N.
Description
Tese de dout., Matemática, Faculdade de Ciências e Tecnologia, Universidade do Algarve, 2008
Keywords
Teses Geometria Topologia