transpose
121Hermitian adjoint — In mathematics, specifically in functional analysis, each linear operator on a Hilbert space has a corresponding adjoint operator. Adjoints of operators generalize conjugate transposes of square matrices to (possibly) infinite dimensional… …
122Matrix exponential — In mathematics, the matrix exponential is a matrix function on square matrices analogous to the ordinary exponential function. Abstractly, the matrix exponential gives the connection between a matrix Lie algebra and the corresponding Lie group.… …
123Scandinavian Defense — Infobox chess opening openingname = Scandinavian Defense Chess diagram|= = rd|nd|bd|qd|kd|bd|nd|rd|= pd|pd|pd| |pd|pd|pd|pd|= | | | | | | | |= | | |pd| | | | |= | | | |pl| | | |= | | | | | | | |= pl|pl|pl|pl| |pl|pl|pl|=… …
124Black Knights' Tango — a b c d e f g …
125Matrix norm — In mathematics, a matrix norm is a natural extension of the notion of a vector norm to matrices. Contents 1 Definition 2 Induced norm 3 Entrywise norms 3.1 Frobenius norm …
126Matrix congruence — In mathematics, two matrices A and B over a field are called congruent if there exists an invertible matrix P over the same field such that PTAP = B where T denotes the matrix transpose. Matrix congruence is an equivalence relation. Matrix… …
127Peres-Horodecki criterion — The Peres Horodecki criterion is a necessary condition, for the joint density matrix ho of two systems A and B, to be separable. It is also called the PPT criterion, for positive partial transpose . In the 2x2 and 2x3 dimensional cases the… …
128Indian Defence — Infobox chess opening Chess diagram|= | = rd|nd|bd|qd|kd|bd| |rd|= pd|pd|pd|pd|pd|pd|pd|pd|= | | | | |nd| | |= | | | | | | | |= | | |pl| | | | |= | | | | | | | |= pl|pl|pl| |pl|pl|pl|pl|= rl|nl|bl|ql|kl|bl|nl|rl|=| moves = 1. d4 Nf6 ECO = A45 A79 …
