The Expected Depth of Random Real Algebraic Plane Curves

Turgay Bayraktar; Al\.i Ula\c{s} \"Ozg\"ur K\.i\c{s}\.isel

arXiv:2110.03198·math.AG·April 22, 2026

The Expected Depth of Random Real Algebraic Plane Curves

Turgay Bayraktar, Al\.i Ula\c{s} \"Ozg\"ur K\.i\c{s}\.isel

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Abstract

In this note we study asymptotic isotopy of random real algebraic plane curves. More precisely, we obtain a Kac-Rice type formula that gives the expected number of two-sided components (i.e.\ ovals) of a random real algebraic plane curve winding around a given point. In particular, we show that expected number of such ovals for an even degree Kostlan polynomial is $\frac{d}{2}$ and independent of the given point.

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