Fučík spectrum for discrete systems: curves and their tangent lines

In this paper, we study the Fučík spectrum of a square matrix $A$ and provide necessary and sufficient conditions for the existence of Fučík curves emanating from the point $(λ,λ)$ with $λ$ being a real eigenvalue of $A$. We extend recent results by Maroncelli (2024) and remove his assumptions on symmetry of $A$ and simplicity of $λ$. We show that the number of Fučík curves can significantly exceed the multiplicity of $λ$ and determine all the possible directions they can emanate in. We also treat the situation when the algebraic multiplicity of $λ$ is greater than the geometric one and show that in such a case the Fučík curves can loose their smoothness and provide the slopes of their "one-sided tangent lines". Finally, we offer two possible generalizations: the situation off the diagonal and Fučík spectrum of a general Fredholm operator on the Hilbert space with a lattice structure.