In mathematics, the Hodge star operator or Hodge dual is an important linear map introduced in general by W. V. D. Hodge. It is defined on the exterior algebra of a ...
Two generalisations of the Evans function, for the analysis of the linearisation about solitary waves, are shown to be equivalent. The generalisation introduced
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Poincare duality and Hodge duality. up vote 3 down vote favorite. The Poicare duality is defined in Greub's Multilinear algebra (1967) in Chapter 6, ...
I'm having problems understanding Hodge duality in its most basic form. It relates exterior p forms to exterior n-p forms where n is the dimensionality of the manifold.
We define a working rule for the Hodge duality ⋆ operation on the (2+2) ... HODGE DUALITY OPERATION AND ITS PHYSICAL APPLICATIONS ON SUPERMANIFOLDS. R. P. MALIK.
c 2011 Chapter 17 Hodge duality We will next de ne the Hodge star operator. We will de neit in a chart rather than abstractly. The Hodge star operator, denoted ? in ...
Abstract It has been claimed that whereas scalars can be bound to a Randall-Sundrum brane, higher /p-form potentials cannot, in contradiction with the Hodge duality ...
Electric-Magnetic-Duality and Hodge Duality Extended to Differental Cocycles Posted by Urs Schreiber
arXiv:hep-th/0404088v4 1 Sep 2004 hep-th/0404088 CSULB–PA–04–3 (Revised Version) Hodge Duality and Cosmological Constant Hitoshi NISHINO1 and Subhash RAJPOOT2