Feasible Interior Point Method for Absolute Value Equation

Abstract: A feasible interior point method is proposed for solving the NP-hard absolute value equation (AVE) when the singular values of A exceed one. We formulate the NP-hard AVE as linear complementary problem, and prove that the solution to AVE is existent and unique under suitable assumptions. Then we present a feasible interior point algorithm for AVE based on the Newton direction and centering direction. We show that this algorithm has the polynomial complexity. Preliminary numerical results show that this method … Show more

“…In the next example, we compare Algorithm 3.2 with a feasible primal-dual IPMs used to solve the AVE (1.2). This latter is developed by Long ( [16]).…”

“…Problem 3 [16]. The data (A, B, b) of the AVE is given by rand( state , 0); R = rand(n, n); A = R * R + n * eye(n); b = rand(n, 1); B = I; q = ((A + eye(n)) * (inv(A − eye(n))) − eye(n)) * b.…”

“…The numerical results are summarized in Table 3, where Algorithm 3.2 is denoted by Algo1 and the algorithm used in [16] is denoted by Algo2. From [16], we use the same tolerance ε = 10 −4 . 3.…”

“…In the literatures, most numerical methods directly tackled the AVE based on smoothing and non-smoothing nonlinear optimization techniques. However, other numerical approaches focus on reformulating the AVE (1.1)-(1.2) as complementarity problems; see e.g., Yong et al [16].…”

Solving absolute value equations via complementarity and interior-point methods

“…In the next example, we compare Algorithm 3.2 with a feasible primal-dual IPMs used to solve the AVE (1.2). This latter is developed by Long ( [16]).…”

“…Problem 3 [16]. The data (A, B, b) of the AVE is given by rand( state , 0); R = rand(n, n); A = R * R + n * eye(n); b = rand(n, 1); B = I; q = ((A + eye(n)) * (inv(A − eye(n))) − eye(n)) * b.…”

“…The numerical results are summarized in Table 3, where Algorithm 3.2 is denoted by Algo1 and the algorithm used in [16] is denoted by Algo2. From [16], we use the same tolerance ε = 10 −4 . 3.…”

“…In the literatures, most numerical methods directly tackled the AVE based on smoothing and non-smoothing nonlinear optimization techniques. However, other numerical approaches focus on reformulating the AVE (1.1)-(1.2) as complementarity problems; see e.g., Yong et al [16].…”

Solving absolute value equations via complementarity and interior-point methods