v2009.01.01 - Convex Optimization

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H −
H +
∂H
∂H
∂H −
∂H +
d
halfspace described using an outward-normal (97) to the hyperplane
partially bounding it
halfspace described using an inward-normal (98) to the hyperplane
partially bounding it
hyperplane; id est, partial boundary of halfspace
supporting hyperplane
a supporting hyperplane having outward-normal with respect to set it
supports
a supporting hyperplane having inward-normal with respect to set it
supports
vector of distance-square
d ij
lower bound on distance-square d ij
d ij
AB
AB
C
upper bound on distance-square d ij
closed line segment between points A and B
matrix multiplication of A and B
closure of set C
decomposition orthonormal (1788) page 650, biorthogonal (1765) page 644
expansion orthogonal (1798) page 653, biorthogonal (357) page 170
vector
entry
cubix
quartix
feasible set
column vector in R n
scalar element or real variable constituting a vector or matrix
member of R M×N×L
member of R M×N×L×K
most simply, the set of all variable values satisfying all constraints of
an optimization problem