Conditions are given under which the Lojasiewicz exponent and local Euler obstruction are bi-Lipschitz invariants for ideals on affine toric varieties, with the Euler obstruction preserved for non-degenerate isolated hypersurface singularities.
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Bi-Lipschitz Invariants in Singularity Theory: Lojasiewicz Exponent and Euler Obstruction
Conditions are given under which the Lojasiewicz exponent and local Euler obstruction are bi-Lipschitz invariants for ideals on affine toric varieties, with the Euler obstruction preserved for non-degenerate isolated hypersurface singularities.