On the norms of \(r\)-circulant matrices with the hyperharmonic numbers (Q2790786)

Circulant matrices are particularly tractable as their inverses, conjugate transposes, sums and products are again circulant, they are normal and their eigenvalues and -vectors are well known. A circulant matrix is called \(r\)-circulant if its \((i, j)\)-entry is multiplied by \(r\) for all \(i, j\) with \(i > j\). Recent papers have obtained upper and lower bounds for the spectral norms of \(r\)-circulant matrices with Fibonacci, Lucas and generalized \(k\)-Horadam numbers, and Bahşi and Solak have computed the spectral norms of \(r\)-circulant matrices with hyper-Fibonacci and hyper-Lucas numbers. In this paper, the author computes the spectral norms of \(r\)-circulant matrices with hyperharmonic numbers.