Using sedumi 1.02, a MATLAB toolbox for optimization over symmetric cones Optim. Methods Softw., 11–12 (1999), pp. 625-653 CrossrefView in ScopusGoogle Scholar [53] V.N. Temlyakov Weak greedy algorithms Adv. Comput. Math., 12 (2–3) (2000), pp. 213-227 View in ScopusGoogle Scho...
On the contrary, the iso-base map (Fig. S1b) simulates a strongly evolved morphology that obliterates sharp morphologies and isolated peaks and cones. Once subtracted from the actual (i.e., 1943 hDSM) topography, these maps help quantify the most eroded areas (Fig. 7a, b; Champagnac ...
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Khurana, Symmetric duality in multiobjective programming involving generalized convex function, European J. Oper. Res. 165 (2005) 592-597.Saini, H., Gulati, T.R. Nondifferentiable multiobjective symmetric duality with F -convexity over cones. Nonlinear Anal., 74: 1577-1584 (2011)...
Reduced Reverse Symmetric Division Degree Index of\({\mathbb{G}\mathbb{D}}_{\alpha }(r,t)\) In view Table1using Eq. (18), we have $$\begin{aligned} (\mathcal {I}_m)(\mathcal {RR_D\,M}({\mathbb{G}\mathbb{D}}_{\alpha };l,m))= & \left( 6rt+\frac{1}{3}r+\frac...
Faraut, U., Korányi, A.: Analysis on Symmetric Cones. Oxford Mathematical Monographs, Oxford University Press, New York, 1994 Ferris, M.C., Pang, J.-S., eds.: Complementarity and Variational Problems: State of the Art. SIAM, Philadelphia, 1997 Fischer, A.: Solution of monotone complement...
C.M. Theobald [1] An inequality for the trace of the product of two symmetric matrices, Math. Proc. Camb. Phil. Soc., 77 (1975), 265–268. Google Scholar R.C. Thompson [1] Singular value inequalities for matrix sums and minors, Linear Algebra and Appl., 11 (1975), 251–269. ...
Suppose equality holds in Fan's inequality (1.2.2), and choose a spectral decomposition X + Y = U T (Diag λ(X + Y ))U for some matrix U in On. §1.2 Symmetric matrices 21 (a) Prove λ(X)T λ(X + Y ) = U T (Diag λ(X))U, X + Y . (b) Apply Fan's inequality ...
CR functions on an embedded quadric M always extend holomorphically to $$M+i\Gamma _M$$ where $$\Gamma _M$$ is the closure of the convex hull of the image
On the manifoldMmodelling our spacetime, we shall considerfiber bundles,i.e., quadruples\((B, M, \pi , F)\)where\(\pi :B \rightarrow M\)is a smooth, surjective map and such that there exists an open cover\(\{U_\alpha \}_{\alpha \in A}\)of the base manifoldMand an associa...