On spectral minimal partitions II, the case of the rectangle

Abstract

In continuation of HHOT, we discuss the question of spectral minimal 3-partitions for the rectangle ]- a2, a2[× ] - b2, b2[ , with 0< a≤ b. It has been observed in HHOT that when 0< ab < 38 the minimal 3-partition is obtained by the three nodal domains of the third eigenfunction corresponding to the three rectangles ]- a2, a2[× ] - b2,- b6[, ]- a2, a2[× ] - b6, b6[ and ]- a2, a2[× ] b6, b2[. We will describe a possible mechanism of transition for increasing ab between these nodal minimal 3-partitions and non nodal minimal 3-partitions at the value 38 and discuss the existence of symmetric candidates for giving minimal 3-partitions when 38< ab ≤ 1. Numerical analysis leads very naturally to nice questions of isospectrality which are solved by introducing Aharonov-Bohm Hamiltonians or by going on the double covering of the punctured rectangle.