The harmonic index \(H(G)\) of a graph \(G\) is defined as the sum of the weights \(\frac{2}{d_u+ d_v}\) of all edges \(uv\) of \(G\), where \(d_u\) denotes the degree of a vertex \(u\) in \(G\). We determine the \(n\)-vertex trees with the second and third maximum harmonic indices for \(n \geq 7\), the fourth maximum harmonic index for \(n \geq 10\), and fifth maximum harmonic index for $n \geq 11\), and unicyclic graphs with the second and third maximum harmonic indices for \(n \geq 5\), the fourth maximum harmonic index for \(n \geq 7\), and fifth maximum harmonic index for \(n \geq 8\), and bicyclic graphs with the maximum harmonic index for \(n \geq 6\), the second and third maximum harmonic indices for \(n \geq 7\), and fourth maximum harmonic index for \(n \geq 9\).
1970-2025 CP (Manitoba, Canada) unless otherwise stated.