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DYNAMIC EQUATIONS OF CONTROLLED MECHANICA L SYSTEM WITH REDUNDANT HOLONOMIC CONSTRAINTS are discussed. The case of redundant constraints and positive semidefinite mass matrix in obtaining
Characterization of the trace by young's inequality numbers such that 1/p + 1/q = 1. We prove that if for any pair A, B of positive semi-definite n × n
On matrix-subadditive functions and a relevant trace inequality, B of Hermitian positive semidefinite n × n-matrices then f is concave. © 1998 OPA (Overseas
Approximation of positive semidefinite spectral problemsA variational positive semidefinite spectral problem in an infinite-dimensional Hilbert space
Positive definiteness of forms: Numerical identificationThe question about positive definiteness or semidefiniteness of quadratic forms (or, more generally
Approximation of positive semidefinite spectral problemsA variational positive semidefinite spectral problem in an infinite-dimensional Hilbert space
On matrix-subadditive functions and a relevant trace inequality, B of Hermitian positive semidefinite n × n-matrices then f is concave. © 1998 OPA (Overseas
Characterization of the trace by young's inequality numbers such that 1/p + 1/q = 1. We prove that if for any pair A, B of positive semi-definite n × n
Study of a Logarithmic Barrier Approach for Linear Semidefinite ProgrammingIn this paper, we present a logarithmic barrier interior-point method for solving a semidefinite
Optimality Criteria without Constraint Qualifications for Linear Semidefinite Problems-infinite programming with multidimensional index set and a linear problem of semi-definite programming. In the study
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