Power series and smooth functions equivalent to a polynomial

Abstract: Abstract. An algebraic criterion is given for a power series in n variables over a field of characteristic 0 to be equivalent to a polynomial in n -k variables over the ring of power series in k variables. For convergent power series over the reals or complexes a geometric interpretation of the criterion is established. An analogous sufficient condition is obtained for germs of smooth functions. Most of the previously known results follow easily from the criterion.

Almost analytic local algebraicity of analytic sets and functions

Almost analytic local algebraicity of analytic sets and functions

Higher order approximation of analytic sets by topologically equivalent algebraic sets

Pairs of Lie-type and large orbits of group actions on filtered modules