40 The third moment of quadratic L__�__-Functions 51:33 Discrete Moments 23:47 Floer Homology Applications 1 1:01:32 Floer Homotopy 4 1:01:50 Spectra and Smash Products 2 1:03:17 A knot Floer stable homotopy type 1:01:49 Floer Homology Fundamentals 8 1:01:15 Floer Homology ...
The topic of the lessons presented here is the quadratic function. Students learn about the properties of quadratic functions and apply them later in the lesson to real-world problems, such as the height of a bridge and the shape of a water fountain. In this way, students acquire both ...
The qcdnum program numerically solves the evolution equations for parton densities and fragmentation functions in perturbative QCD. Un-polarised parton den... M Botje - 《Computer Physics Communications》 被引量: 281发表: 2011年 On the spectrum of a matrix model for the D=11 supermembrane compact...
An FPTAS for Minimizing Indefinite Quadratic Forms over Integers in Polyhedra We present a generic approach that allows us to develop a fully polynomial-time approximation scheme (FTPAS) for minimizing nonlinear functions over the in... R Hildebrand,R Weismantel,K Zemmer - SIAM 被引量: 11发表:...
We estimate the entropy numbers of related compact embeddings and apply the outcome to say something about the distribution of eigenvalues of the generated degenerate positive definite self-adjoint elliptic operators KeywordQuadratic forms-degenerate elliptic operators-entropy numbers-distribution of eigenvalues...
This paper focuses on the quadratic optimization over two classes of nonnegative zero-norm constraints: nonnegative zero-norm sphere constraint and zero-norm simplex constraint, which have important applications in nonnegative sparse eigenvalue problems and sparse portfolio problems, respectively. We estab...
O.L. Mangasarian, “Locally unique solutions of quadratic programs, linear and nonlinear complementarity problems,”Mathematical Programming 19 (1980) 200–212. Google Scholar O.L. Mangasarian and L. McLinden, “Simple bounds for solutions of monotone complementarily problems and convex programs,”...
et al. Nonlinear perturbations of linear eigenvalue problems at resonance J. Math. Mech. (1970) LiS. et al. Nontrivial critical points for asymptotically quadratic functions J. math. Analysis Applic. (1992) There are more references available in the full text version of this article.Cited...
We rigorously establish a quadratic rate of convergence of the method in a neighborhood of the solution of Eq. (1.1). In the study of Newton’s method to Eq. (1.1), a critical point is in establishing the well posedness of the linearized MFG system. To address this, we broaden the ...
(8 papers), regression splines (6), kernel smoothing (7), polynomial splines (5), cubic splines (3), smoothing splines (3), wavelet bases (3), roughness penalties (2), local polynomials (2), local quadratics (1), local weighted regression (1), P-splines (1) and log-splines (1)...