Cognitive Representations for Partonic 2-surfaces, String World Sheets & String-like Objects
Abstract
Cognitive representations are identified as points of space-time surface X4⊂ M4 x CP2 having imbedding space coordinates in the extension of of rationals defined by the polynomial defined by the M8 pre-image of X4under M8-H correspondence. Cognitive representations have become key piece in the formulation of scattering amplitudes and in TGD view about consciousness and cognition. One might argue that number theoretic evolution as increase of the dimension of the extension of rationals favors space-time surfaces with especially large cognitive representations since the larger the number of points in the representation is, the more faithful the representation is. Strong form of holography (SH) suggests that it is enough to consider cognitive representations restricted to partonic 2-surfaces and string world sheets. What kind of 2-surfaces are the cognitively fittest one? It would not be surprising if surfaces with large symmetries acting in extension were favored and elliptic curves with discrete 2-D translation group indeed turn out to be assignable string world sheets as singularities and string like objects. In the case of partonic 2-surfaces geodesic sphere of CP2 is similar object.