Isoperimetric bubbles in spaces with density rp + a

Abstract

Least perimeter solutions for a region with fixed mass are sought in Rd on which a density function (r) = rp+a, with p>0, a>0, weights both perimeter and mass. On the real line (d=1) this is a single interval that includes the origin. For p 1 the isoperimetric interval has one end at the origin; for larger p there is a critical value of a above which the interval is symmetric about the origin. In the case p=2, for d=2 and 3, the isoperimetric region is a circle or sphere, respectively, that includes the origin; the centre moves towards the origin as a increases, with constant radius, and then remains centred on the origin for a above the critical value as the radius decreases.

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