Monomial

Results: 129



#Item
41Basis selection for SOS programs via facial reduction and polyhedral approximations Frank Permenter1 Abstract— We develop a monomial basis selection procedure for sum-of-squares (SOS) programs based on facial reduction

Basis selection for SOS programs via facial reduction and polyhedral approximations Frank Permenter1 Abstract— We develop a monomial basis selection procedure for sum-of-squares (SOS) programs based on facial reduction

Add to Reading List

Source URL: www.mit.edu

Language: English - Date: 2014-09-20 19:47:55
42UNIVERSITY OF BELGRADE FACULTY OF MATHEMATICS Samira M. Zeada Classification of Monomial Orders In Polynomial Rings and Gr¨

UNIVERSITY OF BELGRADE FACULTY OF MATHEMATICS Samira M. Zeada Classification of Monomial Orders In Polynomial Rings and Gr¨

Add to Reading List

Source URL: www.matf.bg.ac.rs

Language: English - Date: 2015-01-21 05:35:37
43A Data Driven Approach for Algebraic Loop Invariants? Rahul Sharma1 , Saurabh Gupta2 , Bharath Hariharan2 , Alex Aiken1 , Percy Liang1 , and Aditya V. Nori3 2

A Data Driven Approach for Algebraic Loop Invariants? Rahul Sharma1 , Saurabh Gupta2 , Bharath Hariharan2 , Alex Aiken1 , Percy Liang1 , and Aditya V. Nori3 2

Add to Reading List

Source URL: theory.stanford.edu

Language: English - Date: 2013-01-08 02:57:59
444.3 Multiply Polynomials To find the product of two monomials, we multiply the coefficients together and use the product rule for exponents to multiply any exponents. For example, . To multiply a monomial by a polynomial

4.3 Multiply Polynomials To find the product of two monomials, we multiply the coefficients together and use the product rule for exponents to multiply any exponents. For example, . To multiply a monomial by a polynomial

Add to Reading List

Source URL: www.math.psu.edu

Language: English - Date: 2012-05-19 19:23:22
45On the Alekhnovich–Razborov degree lower bound Yuval Filmus∗ October 17, 2014 1

On the Alekhnovich–Razborov degree lower bound Yuval Filmus∗ October 17, 2014 1

Add to Reading List

Source URL: www.cs.toronto.edu

Language: English - Date: 2014-10-17 02:14:03
46Artificial Intelligence: A New Synthesis Nils J. Nilsson Errata November, On page 26 in the second paragraph of Section 2.1.4, replace the sentence that begins with “The number of monomials . . .” and the acc

Artificial Intelligence: A New Synthesis Nils J. Nilsson Errata November, On page 26 in the second paragraph of Section 2.1.4, replace the sentence that begins with “The number of monomials . . .” and the acc

Add to Reading List

Source URL: ai.stanford.edu

Language: English - Date: 2012-11-20 13:21:00
47CRYPTANALYSIS OF MATRIX CONJUGATION SCHEMES A. D. MYASNIKOV AND A. USHAKOV Abstract. In this paper we cryptanalyze two protocols: GrigorievShpilrain authentication protocol and Wang et al. public key encryption protocols

CRYPTANALYSIS OF MATRIX CONJUGATION SCHEMES A. D. MYASNIKOV AND A. USHAKOV Abstract. In this paper we cryptanalyze two protocols: GrigorievShpilrain authentication protocol and Wang et al. public key encryption protocols

Add to Reading List

Source URL: eprint.iacr.org

Language: English - Date: 2012-12-10 21:50:06
48Lower Bounds for Tropical Circuits and Dynamic Programs∗ Stasys Jukna University of Frankfurt, Institute of Computer Science, Germany Vilnius University, Institute of Mathematics and Informatics, Vilnius, Lithuania juk

Lower Bounds for Tropical Circuits and Dynamic Programs∗ Stasys Jukna University of Frankfurt, Institute of Computer Science, Germany Vilnius University, Institute of Mathematics and Informatics, Vilnius, Lithuania juk

Add to Reading List

Source URL: lovelace.thi.informatik.uni-frankfurt.de

Language: English - Date: 2015-02-05 11:02:38
49May, spring 2002, Alexander Postnikov 7 OPEN PROBLEMS IN COMBINATORICS Problem 1 (see Catalan addendum1 6.C3) Start with a monomial x in the variables xij , i < j, and repeatedly apply the following reduc

May, spring 2002, Alexander Postnikov 7 OPEN PROBLEMS IN COMBINATORICS Problem 1 (see Catalan addendum1 6.C3) Start with a monomial x in the variables xij , i < j, and repeatedly apply the following reduc

Add to Reading List

Source URL: www-math.mit.edu

Language: English - Date: 2004-09-28 17:33:55
50Homogeneous polynomials / Polynomials / Monomial / Multiplication / Mathematics / Abstract algebra / Algebra

Monday- Tuesday- 1 Wednesday- 2 Thursday- 3 Friday- 4

Add to Reading List

Source URL: cnapolitano.weebly.com

Language: English - Date: 2009-03-18 15:33:02