dr. Lerario's seminar at SISSA - change of time
Emanuele Tuillier Illingworth
tuillier at sissa.it
Thu Feb 20 13:39:59 CET 2014
SEMINAR ANNOUNCEMENT
Wednesday Feb. 26, 16:30, room 133.
A. Lerario (Institut Camille Jordan, Lyon)
"Counting the number of nodal lines of a random polynomial"
To determine the average number of real zeroes of a univariate
polynomial whose coefficients are random variables is a classical problem.
A natural way to generalize it is to ask for the average number of
connected components of the zero set of a random polynomial in several
variables. This question is much influenced by a random approach to
Hilbert's Sixteenth Problem, to study the number and the arrangement in
the projective space of the components of a real algebraic hypersurface.
The answer to the above questions (both in the univariate and the
multivariable case) strongly depends on the choice of the probability
distribution.
In this talk I will show that in fact the case of several variables can
be reduced to the classical univariate problem - using a sort of average
hyperplane section theorem.
More precisely, the number of connected components of a random
hypersurface in RP^n of degree d has the same order of the number of
points of intersection of this hypersurface with a fixed projective
line, raised to the n-th power.
The methods combine harmonic analysis and random matrix theory, using a
distribution result for the Morse index of the critical points of a
random function on the sphere.
(This is joint work with Y. Fyodorov and E. Lundberg)
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