q-analogues of Fisher's inequality and oddtown theorem
Abstract
A classical result in design theory, known as Fisher's inequality, states that if every pair of clubs in a town shares the same number of members, then the number of clubs cannot exceed the number of inhabitants in the town. In this short note, we establish a q-analogue of Fisher's inequality. Additionally, we present a q-analogue of the oddtown theorem for the case when q is an odd prime power.
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