In 1980 Yang and Yau~\cite{YY} proved the celebrated upper bound for the first eigenvalue on an orientable surface of genus $\gamma$. Later Li and Yau~\cite{LY} gave a simple proof of this bound by introducing the concept of conformal volume of a Riemannian manifold. In the same paper they proposed an approach for obtaining a similar estimate for non-orientable surfaces. In the present paper we formalize their argument and improve the bounds stated in~\cite{LY}.
A note on lower bounds for the first eigenvalue of the Witten-Laplacian
Metrics on a closed surface of genus two which maximize the first eigenvalue of the Laplacian
Lower bounds for the first eigenvalue of the magnetic Laplacian
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