Twice Punctured Euclidean and Hyperbolic Manifolds, Revisited as a Hypothetical Explanation for Quantum Dots

Upon reading a newspaper article from December 2023, I realized that my 1984 conference paper might provide a possible explanation relevant to the Nobel Prize in Chemistry awarded to Alexey Yekimov, Luis E. Brus, and Moungi G. Bawendi. After corresponding with my colleague, Academician István Hargittai, he extended his congratulations. I subsequently presented the topic at several conferences in 2024, including those held in Budapest, Sopron, Belgrade, and Senj.

 Naturally, the author could not have anticipated the relevance and significance of the topic at that time. This was an incidental consequence of my earlier erroneous paper [2], intended to construct an infinite series of non-orientable compact hyperbolic manifolds as a polyhedral tiling series in the Bolyai-Lobachevsky hyperbolic space H3. Fortunately, I observed and improved the mistake soon. Specifically, those constructions were not manifolds because the two fixed-point orbits represent punctures where point reflections (central inversions) occur in the symmetry group of the tricky polyhedral tilings.

But these singular points, interpreted as 'quantum dots' (e.g., copper and chlorine ions), respectively, in a silicon-based glass fluid that subsequently solidifies produce optical effects (due to electron transitions) whose colors might depend on the sizes of crystal particles.

This suggests that the unexpected result was more significant than the original intention that could be reached easily later!

The main point of this paper is that – in addition to an Euclidean crystal group 61. Pbca – I constructed infinitely many hyperbolic space groups (in Bolyai-Lobachevsky space) possibly providing such a material.

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A complete connected Riemannian n-dimensional manifold of constant sectional curvature is briefly called a space form. Intuitively, each space form is locally isometric to one of the classical n-spaces of constant curvature. It is well-known that each space form can be represented as an orbit space M/G.

Manifolds and 'Twice Punctured Manifolds'

Here M is one of simply connected n-spaces of curvature K, i.e. M is either a spherical (K > 0) or the Euclidean (K = 0) or a hyperbolic n-space (K < 0). The isometry group G acts discontinuously and freely on M, i.e. there is a nonempty open set V in M so that no two distinct points of V are equivalent under G, moreover, the identity 1 is the only element of G which has fixed points. Then G can be considered as the fundamental group of the manifold M/G.

There are 'twice punctured manifolds' which have two exceptional singular points with„half-ball-like" neighbourhoods, where the centrally opposite points are glued together. Such a fundamental group G has two singular orbits; that is, M/G is 'twice punctured'.

1.1. Dia 6. Euclidean example 61. Pbca

Orientation-preserving transformations:

1 (x¹, x², x³) the identity --- s₁ (½ + x¹, ½ - x², -x³); s₂ (-x¹, ½ + x², ½ - x³); s₃ (½ - x¹, -x², ½ + x³) represent screw motions

Orientation reversing transforms:

-1 (-x¹, -x², -x³) a point reflection (at the origin) --- b (½ - x¹, ½ + x², x³): OAEC =: b-1 → FBDG =: b; c (x¹, ½ - x², ½ + x³); a (½ + x¹, x², ½ - x³) glide reflections

A supergroup occurs: 205. Pa3− =: G^~, If F_G is a cube, then a threefold rotation occurs around OG.

Then at later presentations a movable “wonder cube” model (recently presented to me by Endre Budai, a teacher colleague in Teleki Blanka Gymnasium of Székesfehérvár, provided the following internet link https://www.thingiverse.com/thing:10483) incidentally illustrated this nano-size situation. The opposite vertices (with bigger part (Cu), smaller part (Cl) can be (trigonally) rotated.

Péter SZABÓ, University of Sopron, produced this cube model using a 3D printer in more variants.

1.2. To 61. Pbca = G in figure of former dia 6

The fundamental domain (asymmetric unit) F_G of 61. Pbca = G geometrically describes this group (e.g. in [4]) in the orthorhombic coordinate system OE1E2E3, where the lengths of basis vectors OE_i := |e_i| = a_i (i = 1, 2, 3) are given parameters (by measuring the material crystal, to be determined). An orthorhombic lattice ΛG of G is given by integer coordinate triple to the identity transform 1 (as linear part). as defined in our conventions, each α(A, a) Î G can be given by mapping µ: X ↦ XA + a =: Xµ = Y with A by linear integer unimodular matrix to the basis (ei = OE_i) above, and the translational component a, as illustrated in dia 6, the position vector is OX = X = xⁱe_i (Einstein-Schouten summing index convention), the above Y is the image.

Assume that O, D, E, F are G-equivalent point reflection centres, say with copper (Cu) ion parts, and similarly G, A, B, and C., are with Chlorine (Cl) ion parts, so that the fundamental cube FG contain also "central" silicon (Si) atom in OG and 2-2 ones at the 3 opposite face pairs of F_G, equivalent by glide reflections b, c, a, respectively. Assume that these (approximate) proportions 1/2 : 1/2 : 7(?) of atoms Cu, Cl, Si can form crystal particles of appropriate cubic size, and these particles float in a silicon fluid that freezes. The singularities (as constraints) near Cu and Cl ions cause electrons “jumping-leaping” with light effects, i.e. quantum dots. This may have applications in display technologies. e.g. TV screen.

The author thanks his colleagues Dr. István PROK and Dr. Jenő SZIRMAI for scientific collaborations, to Dr. Ede BENDE and Acad. István HARGITTAI for Chemistry consultations, to Dr. Jenő SZIRMAI for assistance in preparation of this presentation.

I gratefully acknowledge Prof. Dr. János SZENTHE (1933-2023) who was my Master in differential geometry, inspiring and supporting my publications [1], [2], [3].

New infinite series of non-orientable hyperbolic space forms as the original intention

Tis section explains how the earlier issue was resolved, and obtain from twice punctured manifold series a non-orientable manifold series by modified face identifications. Indeed, only orbits C and D need to be merged, to get a ball-like neighbourhood for C = D orbit.

Changing the face identifications: screw motions p, r to glide reflections c, d (respectively) in G1tu, so C = D is glued together, we obtain non-orientable space form [3].

M /N¹_tu (M = H³). Compare with the former H³/G¹_tu ( Here C = D)

Similarly, changing glide reflections c, d to screw motions p, r in G²t , so C = D is glued together, we obtain non-orientable space form M /N²_t (Here M = H³).

Compare with the former H3/Gt2 (Here C = D)

Table 2: The algorithmic fundamental group presentations of our non-orientable manifold series  and of their orientable twofold covering groups Gt (in Hungarian from [3], but as before in Table 1).

Another fundamental domain with trigonal rotation symmetry with other presentations (the figure constructed as a fine D-V cell by our Indonesian doctor student (now PhD) Arnasli Yahya)

Our analogous non-orientable manifold fundamental group series N¹_tu and N²_tu and their orientable twofold covering group series G_t

Of course, the reader needs more detailed explanations. Thus we (with Jenő Szirmai and Arnasli Yahya) turn back to the topic in a revisited mathematical paper.

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