Continuant (mathematics) algebra , the continuant multivariate polynomial representing the determinant of a tridiagonal matrix and having applications in generalized continued fractions .Definition The n -th continuant is defined recursively byProperties The continuant can be computed by taking the sum of all possible products of x 1 ,...,x n disjoint pairs of consecutive terms are deleted . For example, : The continuant can be computed as the determinant of a tridiagonal matrix: : , the -st Fibonacci number . Ratios of continuants represent continued fractions as follows: : The following matrix identity holds: :. *For determinants, it implies that *: *and also *:Generalizations with respect to three sequences a , b and c , so that K is a polynomial of a 1 ,...,a n b 1 ,...,b n −1c 1 ,...,c n −1recurrence relation becomesb r c r K only as a product b r c r loss of generality in assuming that the b r equal to 1.simply called continuant.
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