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We also construct a sheaf on , called the “structure sheaf” as in the affine case, which makes it into a scheme.As in the case of the Spec construction there are many ways to proceed: the most direct one, which is also highly suggestive of the construction of regular functions on a projective variety in classical algebraic geometry, is the following.
The WUSCT is a projective test; a type of psychometric test designed to measure psychic phenomenon by capturing a subject's psychological projection and measuring it in a quantifiable manner. The test has been characterized as a good test for clinical use as it can measure across distinct psychopathologies and help in choosing treatment ...
The responses to projective tests are content analyzed for meaning rather than being based on presuppositions about meaning, as is the case with objective tests. Projective tests have their origins in psychoanalysis, which argues that humans have conscious and unconscious attitudes and motivations that are beyond or hidden from conscious awareness.
Projective identification is a term introduced by Melanie Klein and then widely adopted in psychoanalytic psychotherapy.Projective identification may be used as a type of defense, a means of communicating, a primitive form of relationship, or a route to psychological change; [1] used for ridding the self of unwanted parts or for controlling the other's body and mind.
Baum test (also known as the "Tree test" or the "Koch test") is a projective test that is used extensively by psychologists around the world. [1] " Baum " is the German word for tree. It reflects an individual's personality and their underlying emotions by drawing a tree and then analyzing it.
In social psychology, social projection is the psychological process through which an individual expects behaviors or attitudes of others to be similar to their own. Social projection occurs between individuals as well as across ingroup and outgroup contexts in a variety of domains. [1]
For m = 0 the generalized Jacobian J m is just the usual Jacobian J, an abelian variety of dimension g, the genus of C. For m a nonzero effective divisor the generalized Jacobian is an extension of J by a connected commutative affine algebraic group L m of dimension deg(m)−1. So we have an exact sequence 0 → L m → J m → J → 0
The Albanese variety is the abelian variety generated by a variety taking a given point of to the identity of .In other words, there is a morphism from the variety to its Albanese variety (), such that any morphism from to an abelian variety (taking the given point to the identity) factors uniquely through ().