Brennan conjecture

The Brennan conjecture is a mathematical hypothesis (in complex analysis) for estimating (under specified conditions) the integral powers of the moduli of the derivatives of conformal maps into the open unit disk. The conjecture was formulated by James E. Brennan in 1978.^[1][2][3]

Let Template:Mvar be a simply connected open subset of ${\displaystyle ℂ}$ with at least two boundary points in the extended complex plane. Let ${\displaystyle \phi }$ be a conformal map of Template:Mvar onto the open unit disk. The Brennan conjecture states that ${\displaystyle \underset{W}{\int }|\phi {}^{\prime }{|}^p\mathrm{d}x\mathrm{d}y<\mathrm{\infty }}$ whenever ${\displaystyle 4/3<p<4}$. Brennan proved the result when ${\displaystyle 4/3<p<p_0}$ for some constant ${\displaystyle p_0>3}$.^[1] Bertilsson proved in 1999 that the result holds when ${\displaystyle 4/3<p<3.422}$, but the full result remains open.^[4][5]

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