Ifs and Oughts
(2010) : Kolodny, Niko Macfarlane, John
url: https://www.jstor.org/stable/25700490
#modal_logic #dyadic #paradox #semantics #deontic_logic #my_bibtex

#tensor product of V w its dual space S is #isomorphic to space of linear maps M : V -> V: a #dyadic tensor vf is M sending any w in V to f(w)v. When V is Euclidean n-space, inner product can identify S w V i->dyadic tensor tensor product of two vectors in Euclidean space.

#tensor product of V w its dual space S is #isomorphic to space of linear maps M : V -> V: a #dyadic tensor vf is M sending any w in V to f(w)v. When V is Euclidean n-space, inner product can identify S w V i->dyadic tensor tensor product of two vectors in Euclidean space.

#dyadic / cross product takes in two vectors and returns a second order #tensor / pseudovector called a dyadic

#dyadic / cross product takes in two vectors and returns a second order #tensor / pseudovector called a dyadic