20,611 research outputs found

    A K-Theoretic Proof of Boutet de Monvel's Index Theorem for Boundary Value Problems

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    We study the C*-closure A of the algebra of all operators of order and class zero in Boutet de Monvel's calculus on a compact connected manifold X with non-empty boundary. We find short exact sequences in K-theory 0->K_i(C(X))->K_i(A/K)->K_{1-i}(C_0(T*X'))->0, i= 0,1, which split, where K denotes the compact ideal and T*X' the cotangent bundle of the interior of X. Using only simple K-theoretic arguments and the Atiyah-Singer Index Theorem, we show that the Fredholm index of an elliptic element in A is given as the composition of the topological index with mapping K_1(A/K)->K_0(C_0(T*X')) defined above. This relation was first established by Boutet de Monvel by different methods.Comment: Title slightly changed. Accepted for publication in Journal fuer die reine und angewandte Mathemati

    Electromagnetic structure and weak decay of meson K in a light-front QCD-inspired

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    The kaon electromagnetic (e.m.) form factor is reviewed considering a light-front constituent quark model. In this approach, it is discussed the relevance of the quark-antiquark pair terms for the full covariance of the e.m. current. It is also verified, by considering a QCD dynamical model, that a good agreement with experimental data can be obtained for the kaon weak decay constant once a probability of about 80% of the valence component is taken into account.Comment: 4 pages and 1 figure eps. To appear Nucl. Phys. A (2007

    C*-Structure and K-Theory of Boutet de Monvel's Algebra

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    We consider the norm closure AA of the algebra of all operators of order and class zero in Boutet de Monvel's calculus on a manifold XX with boundary YY. We first describe the image and the kernel of the continuous extension of the boundary principal symbol to AA. If the XX is connected and YY is not empty, we then show that the K-groups of AA are topologically determined. In case the manifold, its boundary and the tangent space of the interior have torsion-free K-theory, we prove that Ki(A/K)K_i(A/K) is isomorphic to the direct sum of Ki(C(X))K_i(C(X)) and K1−i(C0(TX′))K_{1-i}(C_0(TX')), for i=0,1, with KK denoting the compact ideal and TX′TX' the tangent bundle of the interior of XX. Using Boutet de Monvel's index theorem, we also prove this result for i=1 without assuming the torsion-free hypothesis. We also give a composition sequence for AA.Comment: Final version, to appear in J. Reine Angew. Math. Improved K-theoretic result
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