Spectral extremal problem for the odd prism
Abstract
The spectral Tur\'an number (n, F) denotes the maximum spectral radius (G) of an F-free graph G of order n. This paper determines (n, C2k+1) for all sufficiently large n, establishing the unique extremal graph. Here, C2k+1 is the odd prism -- the Cartesian product C2k+1 K2 -- where the Cartesian product G F has vertex set V(G) × V(F), and edges between (u1,v1) and (u2,v2) if either u1 = u2 and v1v2 ∈ E(F), or (v1 = v2 and u1u2 ∈ E(G)).
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