The Schottky Conjecture and beyond

Abstract

The `Schottky Conjecture' deals with the electrostatic field enhancement at the tip of compound structures such as a hemiellipsoid on top of a hemisphere. For such a 2-primitive compound structure, the apex field enhancement factor γa(C) is conjectured to be multiplicative (γa(C) = γa(1) γa(2)) provided the structure at the base (labelled 1, e.g. the hemisphere) is much larger than the structure on top (referred to as crown and labelled 2, e.g. the hemi-ellipsoid). We first demonstrate numerically that for generic smooth structures, the conjecture holds in the limiting sense when the apex radius of curvature of the primitive-base Ra(1), is much larger than the height of the crown h2 (i.e. h2/Ra(1) → 0). If the condition is somewhat relaxed, we show that it is the electric field above the primitive-base (i.e. in the absence of the crown), averaged over the height of the crown, that gets magnified instead of the field at the apex of the primitive-base. This observation leads to the Corrected Schottky Conjecture (CSC), which for 2-primitive structures reads as γa(C) γa(1)γa(2) where . denotes the average value over the height of the crown. For small protrusions (h2/h1 typically less than 0.2), γa(1) can be approximately determined using the Line Charge Model so that γa(C) γa(1)γa(2) (2Ra(1)/h2)(1 + h2/2Ra(1)). The error is found to be within 1\% for h2/Ra(1) < 0.05, increasing to about 3\% (or less) for h2/Ra(1) = 0.1 and bounded below 5\% for h2/Ra(1) as large as 0.5. The CSC is also found to give good results for 3-primitive compound structures. The relevance of the Corrected Schottky Conjecture for field emission is discussed.