Projective geometries, Q-polynomial structures, and quantum groups
Abstract
In 2023 we obtained a Q-polynomial structure for the projective geometry LN(q). In the present paper, we display a more general Q-polynomial structure for LN(q). Our new Q-polynomial structure is defined using a free parameter that takes any positive real value. For =1 we recover the original Q-polynomial structure. We interpret the new Q-polynomial structure using the quantum group Uq1/2(sl2) in the equitable presentation. We use the new Q-polynomial structure to obtain analogs of the four split decompositions that appear in the theory of Q-polynomial distance-regular graphs.
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