Dodgson\u27s method of computing determinants is attractive, but fails if an interior entry of an intermediate matrix is zero. This paper reviews Dodgson\u27s method and introduces a generalization, the double-crossing method, that provides a workaround for many interesting cases. © THE MATHEMATICAL ASSOCIATION OF AMERICA
Given a matrix of integers, we wish to compute the determinant using a method that does not introduc...
AbstractDodgson’s condensation method has become a powerful tool in the automation of determinant ev...
AbstractWe give a description of a non-archimedean approximate form of Dodgson's condensation method...
AbstractUsing a recurrence derived from Dodgson's Condensation Method, we provide numerous explicit ...
In 1866, Charles Ludwidge Dodgson published a paper concerning a method for evaluating determinants ...
University of Minnesota M.S. thesis. July 2011. Major: Applied and computational mathematics. Adviso...
In this expository paper, we analyze and compare two determinantal identities constructed in the mid...
In this paper we present the new algorithm to calculate determinants of nth order using Salihu’s met...
Dodgson\u27s condensation method has become a powerful tool in the automation of determinant evaluat...
A new more accurate formula to calculate condition number of the determinant of matrix is proposed. ...
The determinant of a matrix always depends on the concept of row or column. That is to evaluate the ...
Copy the first two columns of the matrix to its right. Multiply along the blue lines and the red lin...
Abstract. This paper is concerned with the numerical computation of the determinant of matrices. Alg...
We present an extremely simple method for computing determinants, one that uses no division operatio...
Abstract. Zeilberger has given a combinatorial proof of Dodgson’s rule for calculating determinants....
Given a matrix of integers, we wish to compute the determinant using a method that does not introduc...
AbstractDodgson’s condensation method has become a powerful tool in the automation of determinant ev...
AbstractWe give a description of a non-archimedean approximate form of Dodgson's condensation method...
AbstractUsing a recurrence derived from Dodgson's Condensation Method, we provide numerous explicit ...
In 1866, Charles Ludwidge Dodgson published a paper concerning a method for evaluating determinants ...
University of Minnesota M.S. thesis. July 2011. Major: Applied and computational mathematics. Adviso...
In this expository paper, we analyze and compare two determinantal identities constructed in the mid...
In this paper we present the new algorithm to calculate determinants of nth order using Salihu’s met...
Dodgson\u27s condensation method has become a powerful tool in the automation of determinant evaluat...
A new more accurate formula to calculate condition number of the determinant of matrix is proposed. ...
The determinant of a matrix always depends on the concept of row or column. That is to evaluate the ...
Copy the first two columns of the matrix to its right. Multiply along the blue lines and the red lin...
Abstract. This paper is concerned with the numerical computation of the determinant of matrices. Alg...
We present an extremely simple method for computing determinants, one that uses no division operatio...
Abstract. Zeilberger has given a combinatorial proof of Dodgson’s rule for calculating determinants....
Given a matrix of integers, we wish to compute the determinant using a method that does not introduc...
AbstractDodgson’s condensation method has become a powerful tool in the automation of determinant ev...
AbstractWe give a description of a non-archimedean approximate form of Dodgson's condensation method...
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