|
Organizers |
Nonexistence of Cinfinity or formal power series variation in solutions to Hilbert's 17th problem
by
Charles N. Delzell
Louisiana State University
[Note: This abstract supersedes the abstract submitted May 1, 1999.]
Recall Hilbert's 17th problem: If f in R[X1, ..., Xn] is positive semidefinite (psd), then f=sum piri2, for some nonnegative pi in R and some ri in R(X1, ..., Xn). (Below it will be helpful not to absorb the pi into the ri, which one would otherwise do.) Fix d in {0, 1, 2, ... }, and consider the set of all psd f of degree <= d. I have recently proved that for d > 2, there can be no solution to Hilbert's 17th problem in which the pi and the coefficients of the ri vary in a Cinfinity manner as functions of the coefficients of f; nor can they be taken to be formal power series in the coefficients of f. I had already shown in 1990 (Recent Advances in Real Algebraic Geometry and Quadratic Forms, Contemp. Math., AMS, 1994), that analytic variation is impossible; and Gonzalez-Vega and Lombardi showed (Math. Z., 1997) that for every fixed, finite r >= 0, Cr variation is possible (improving the continuous, piecewise-polynomial variation found in 1988 and 1991 by me and by González-Vega/Lombardi, respectively; the latter improved my continuous, semialgebraic variation of 1980). The impossibility of Cinfinity variation follows from the impossibility of formal power series variation, which, in turn, is based on a refinement of the proof of the impossibility of analytic variation.
Date received: June 8, 1999
Copyright © 1999 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # cacv-60.