Arnold's problem on monotonicity of the Newton number for surface singularities

Abstract

According to the Kouchnirenko theorem, for a generic (precisely non-degenerate in the Kouchnirenko sense) isolated singularity f its Milnor number μ (f) is equal to the Newton number (+(f)) of a combinatorial object associated to f, the Newton polyhedron + (f). We give a simple condition characterising, in terms of + (f) and + (g), the equality (+(f)) = (+(g)), for any surface singularities f and g satisfying + (f) ⊂ + (g). This is a complete solution to an Arnold's problem (1982-16) in this case.