The transpose of the cofactor matrix of a given square matrix.
(of a matrix) Transpose conjugate.
(of an operator) Hermitian conjugate.
A functor related to another functor by an adjunction.
A curve A such that any point of a given curve C of multiplicity r has multiplicity at least r–1 on A. Sometimes the multiple points of C are required to be ordinary, and if this condition is not satisfied the term sub-adjoint is used.
An assistant to someone who holds a position in the military or civil service.
An assistant mayor of a French commune.
Used in certain contexts, in each case involving a pair of transformations, one of which is, or is analogous to, conjugation (either inner automorphism or complex conjugation).
(of a functor) That is related to another functor by an adjunction.
(of one curve to another curve) Having a relationship of the nature of an adjoint (adjoint curve); sharing multiple points with.