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Linear form
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#	Item
311	Completing the Square, Gaussian Elimination, and Quadratic Forms In high school you learned how to complete the square: x2 + 6x = x2 + 6x + 9 − 9 = (x + 3)2 − 32 . Add to Reading List Source URL: www.swarthmore.edu Language: English - Date: 1998-06-04 15:22:07 Quadratic forms Matrices Matrix theory Factorization Symmetric matrix Completing the square Definite quadratic form Matrix Matrix decomposition Algebra Mathematics Linear algebra
312	Traffic Shaping to Optimize Ad Delivery DEEPAYAN CHAKRABARTI, Yahoo! Research ERIK VEE, Yahoo! Research Add to Reading List Source URL: www.cs.cmu.edu Language: English - Date: 2012-04-26 15:25:16 Linear programming Static single assignment form Mathematical optimization Applied mathematics Computing Mathematics Operations research Traffic shaping Ad serving
313	Jordan Normal and Rational Normal Form Algorithms Bernard Parisse, Morgane Vaughan Add to Reading List Source URL: www-fourier.ujf-grenoble.fr Language: English - Date: 2005-01-17 06:50:20 Matrix theory Eigenvalues and eigenvectors Frobenius normal form Matrix Characteristic polynomial Jordan normal form Recurrence relation Trace Polynomial Algebra Linear algebra Mathematics
314	AN IDENTITY FOR THE DETERMINANT ( Linear and Multilinear Algebra, 36(3) : [removed], 1994) Add to Reading List Source URL: www.math.wsu.edu Language: English - Date: 2001-08-08 12:00:58 Matrix theory Eigenvalues and eigenvectors Matrix Frobenius normal form Diethylenetriamine Deta Romania Minor Partition Determinant Algebra Mathematics Linear algebra
315	Discrete Mathematics[removed]–233 www.elsevier.com/locate/disc Add to Reading List Source URL: www.math.wsu.edu Language: English - Date: 2011-04-01 16:10:53 Matrix theory Matrices Determinants Invertible matrix Matrix Rank Hermite normal form Symplectic matrix Algebra Linear algebra Mathematics
316	COMBINATORIAL EIGENVALUES OF MATRICES John S. Maybee 1 Program in Applied Mathematics Add to Reading List Source URL: www.math.wsu.edu Language: English - Date: 2001-08-08 12:01:05 Sparse matrices Matrix theory Spectral theory Eigenvalues and eigenvectors Singular value decomposition Spectrum Matrix Tridiagonal matrix Frobenius normal form Algebra Linear algebra Mathematics
317	Matrix Roots of Eventually Positive Matrices Judith J. McDonalda , Pietro Paparellab,∗, Michael J. Tsatsomerosa a Department of Mathematics, Washington State University, Pullman, WA[removed], U.S.A. Add to Reading List Source URL: www.math.wsu.edu Language: English - Date: 2013-10-22 16:50:11 Matrix theory Spectral theory Perron–Frobenius theorem Spectrum Eigenvalues and eigenvectors Matrix Jordan normal form Spectral theory of ordinary differential equations Algebra Linear algebra Mathematics
318	A useful algebraic system of statistical models Ben Klemens∗ May 13, 2014 Abstract This paper proposes a single form for statistical models that accommodates Add to Reading List Source URL: ben.klemens.org Language: English - Date: 2014-05-13 13:45:39 Estimation theory Maximum likelihood Likelihood-ratio test Statistical model Normal distribution Likelihood function Akaike information criterion Generalized linear model Ordinary least squares Statistics Statistical theory Regression analysis
319	arXiv:1006.3147v1 [math.SP] 16 Jun[removed]Karlin Theory On Growth and Mixing Extended to Linear Differential Equations Lee Altenberg [removed] Add to Reading List Source URL: dynamics.org Language: English - Date: 2010-06-16 20:13:16 Matrix theory Markov processes Singular value decomposition Matrices Matrix Diagonal matrix Frobenius normal form Markov chain Eigenvalues and eigenvectors Algebra Linear algebra Mathematics
320	Matrix Norms and Quadratic Forms Let M = [aij ] be a matrix. The matrix norm \|\|M \|\| is defined by \|\|M \|\| = max{\|M x\| : \|x\| = 1}. Add to Reading List Source URL: www.swarthmore.edu Language: English - Date: 1998-06-04 15:21:59 Matrices Matrix theory Abstract algebra Matrix Eigenvalues and eigenvectors Quadratic form Vector space Symmetric matrix Diagonalizable matrix Algebra Mathematics Linear algebra

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