Maximum likelihood degree of Fermat hypersurfaces via Euler characteristics
Abstract
Maximum likelihood degree of a projective variety is the number of critical points of a general likelihood function. In this note, we compute the Maximum likelihood degree of Fermat hypersurfaces. We give a formula of the Maximum likelihood degree in terms of the constants βμ, , which is defined to be the number of complex solutions to the system of equations z1=z2=·s=zμ=1 and z1+·s +zμ+1=0.
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