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mtimes

Class: LagOp

Lag operator polynomial multiplication

Syntax

C = mtimes(A, B, 'Tolerance',tolerance)
C = A * B

Description

Given two lag operator polynomials A(L) and B(L),C = mtimes(A, B, 'Tolerance',tolerance) performs a polynomial multiplication C(L) = A(L) * B(L). If at least one of A or B is a lag operator polynomial object, the other can be a cell array of matrices (initial lag operator coefficients), or a single matrix (zero-degree lag operator). 'Tolerance' is the nonnegative scalar tolerance used to determine which coefficients are included in the result. The default tolerance is 1e-12. Specifying a tolerance greater than 0 allows the user to exclude polynomial lags with near-zero coefficients. A coefficient matrix of a given lag is excluded only if the magnitudes of all elements of the matrix are less than or equal to the specified tolerance.

C = A * B performs a polynomial multiplication C(L) = A(L) * B(L).

Tips

The multiplication operator (*) invokes mtimes, but the optional coefficient tolerance is available only by calling mtimes directly.

Examples

expand all

Multiply Two Lag Operator Polynomials

Create two LagOp polynomials and multiply them together:

A = LagOp({1 -0.6 0.08});
B = LagOp({1 -0.5});
mtimes(A,B)
ans = 

    1-D Lag Operator Polynomial:
    -----------------------------
        Coefficients: [1 -1.1 0.38 -0.04]
                Lags: [0 1 2 3]
              Degree: 3
           Dimension: 1

See Also

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