Non-Geometric Cospectral Mates of Line Graphs with a Linear Representation
Abstract
For an incidence geometry G = (P, L, I) with a linear representation Tn*(K), we apply WQH switching to construct a non-geometric graph ' cospectral with the line graph of G. As an application, we show that for h ≥ 2 and 0 < m < h, there are strongly regular graphs with parameters (v, k, λ, μ) = (22h (2m+h+2m-2h), 2h (2h+1)(2m-1), 2h (2m+1-3), 2h (2m-1)) which are not point graphs of partial geometries of order (s,t,α) = ((2h+1)(2m-1), 2h-1, 2m-1).
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