Characteristic polynomial

Results: 61



#Item
31Problem with Vadim Tarin’s NP=RP Proof Charanjit S. Jutla IBM Watson Research The author manages to show that computing the permanent over characteristic 3 of a matrix M can be reduced in polynomial time to computing t

Problem with Vadim Tarin’s NP=RP Proof Charanjit S. Jutla IBM Watson Research The author manages to show that computing the permanent over characteristic 3 of a matrix M can be reduced in polynomial time to computing t

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Source URL: eccc.hpi-web.de

Language: English - Date: 2010-01-04 06:24:48
327.2 FINDING THE EIGENVALUES OF A MATRIX Consider an n × n matrix A and a scalar λ. By definition λ is an eigenvalue of A if there is a nonzero vector ~v in Rn such that A~v = λ~v

7.2 FINDING THE EIGENVALUES OF A MATRIX Consider an n × n matrix A and a scalar λ. By definition λ is an eigenvalue of A if there is a nonzero vector ~v in Rn such that A~v = λ~v

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Source URL: in1.csie.ncu.edu.tw

Language: English - Date: 2002-12-16 01:43:24
33Math 19b: Linear Algebra with Probability Oliver Knill, Spring[removed]

Math 19b: Linear Algebra with Probability Oliver Knill, Spring[removed]

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Source URL: www.math.harvard.edu

Language: English - Date: 2011-05-18 16:03:22
34Characteristic and Counting Polynomials for Nonane Isomers

Characteristic and Counting Polynomials for Nonane Isomers

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Source URL: ph.academicdirect.org

Language: English - Date: 2013-08-11 07:49:19
356.241J Course Notes, Chapter [number]: Minimality and stability of interconnected systems

6.241J Course Notes, Chapter [number]: Minimality and stability of interconnected systems

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Source URL: ocw.mit.edu

Language: English - Date: 2015-03-15 16:14:42
366.241J Course Notes, Chapter 27: Poles and zeros of MIMO systems

6.241J Course Notes, Chapter 27: Poles and zeros of MIMO systems

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Source URL: ocw.mit.edu

Language: English - Date: 2015-03-15 16:14:41
37October[removed]On “an apparent truth about matrices” Bryan Gin-ge Chen

October[removed]On “an apparent truth about matrices” Bryan Gin-ge Chen

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Source URL: www.physics.upenn.edu

Language: English - Date: 2011-08-24 14:51:49
38MIT EECS[removed]FALL[removed]PROBLEM SET 1 (due Sept. 16, 2009) Problem 1.1 This assignment checks your ability to write down a matrix representation of a linear function

MIT EECS[removed]FALL[removed]PROBLEM SET 1 (due Sept. 16, 2009) Problem 1.1 This assignment checks your ability to write down a matrix representation of a linear function

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Source URL: web.mit.edu

Language: English - Date: 2009-09-10 03:05:24
39Microsoft Word - ps1_2c.doc

Microsoft Word - ps1_2c.doc

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Source URL: web.mit.edu

Language: English - Date: 2009-09-25 01:09:01
40BOUNDING THE EQUIVARIANT BETTI NUMBERS AND ´ COMPUTING THE GENERALIZED EULER-POINCARE CHARACTERISTIC OF SYMMETRIC SEMI-ALGEBRAIC SETS SAUGATA BASU

BOUNDING THE EQUIVARIANT BETTI NUMBERS AND ´ COMPUTING THE GENERALIZED EULER-POINCARE CHARACTERISTIC OF SYMMETRIC SEMI-ALGEBRAIC SETS SAUGATA BASU

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Source URL: math.nyu.edu

Language: English - Date: 2014-01-07 18:07:32