Fragmentariness and Metamorphoses of Nanostructures

“…It is clear that only the manifold concept can underlie the mathematical formalism for describing nanostructures and is completely consistent with the concepts of fragmentariness, structural inhomogeneity [1,2], and local curvature [14,17] and the principle of assembling a complex structure from simple building blocks [15]. In the general case, an individual structural complex corresponds to a local coordinate neighborhood U i of the bundle base and the complete closed set of geometrical structural complexes is determined by the fiber (structural group) of the relevant fiber bundle.…”

“…Let us now demonstrate that all the sought geometrical structural complexes can be determined using the Möbius-Kantor configuration 8 3 , which, in turn, is embedded in the finite projective plane PG (2,3). In [21][22][23], it was shown that the 16-vertex structural complex 2Z8 (the aggregate composed of two Bernal polyhedra Z8 joined together by the twofold axis) is determined by the 8 3 subconfiguration when two additional bonds 1'-6 and 6'-7 are formed (Fig.…”

“…

In our recent works [1,2], we analyzed the structural diversity of nanoparticles and the fragmentariness of their structure and formulated the statement that the structural inhomogeneity is a fundamental property of the nanostate. This statement was experimentally confirmed for a number of materials.

In particular, reasoning from the results of neutron diffraction and X-ray diffraction investigations of ZrO 2 nanoparticles, Burkhanov et al [3] proposed a twophase model allowing for the difference between the central and peripheral regions of a particle and their pseudomorphic conjugation.

…”

“…In our recent works [1,2], we analyzed the structural diversity of nanoparticles and the fragmentariness of their structure and formulated the statement that the structural inhomogeneity is a fundamental property of the nanostate. This statement was experimentally confirmed for a number of materials.…”

“…Geometrical structural complexes are determined by the subtables of the incidence table of the finite projective plane PG(2,2). The subtables differ only in the 3'-3 and 7'-5 incidence signs.…”

Nanostructures with coherent boundaries and the local approach

“…It is clear that only the manifold concept can underlie the mathematical formalism for describing nanostructures and is completely consistent with the concepts of fragmentariness, structural inhomogeneity [1,2], and local curvature [14,17] and the principle of assembling a complex structure from simple building blocks [15]. In the general case, an individual structural complex corresponds to a local coordinate neighborhood U i of the bundle base and the complete closed set of geometrical structural complexes is determined by the fiber (structural group) of the relevant fiber bundle.…”

“…Let us now demonstrate that all the sought geometrical structural complexes can be determined using the Möbius-Kantor configuration 8 3 , which, in turn, is embedded in the finite projective plane PG (2,3). In [21][22][23], it was shown that the 16-vertex structural complex 2Z8 (the aggregate composed of two Bernal polyhedra Z8 joined together by the twofold axis) is determined by the 8 3 subconfiguration when two additional bonds 1'-6 and 6'-7 are formed (Fig.…”

“…

In our recent works [1,2], we analyzed the structural diversity of nanoparticles and the fragmentariness of their structure and formulated the statement that the structural inhomogeneity is a fundamental property of the nanostate. This statement was experimentally confirmed for a number of materials.

In particular, reasoning from the results of neutron diffraction and X-ray diffraction investigations of ZrO 2 nanoparticles, Burkhanov et al [3] proposed a twophase model allowing for the difference between the central and peripheral regions of a particle and their pseudomorphic conjugation.

…”

“…In our recent works [1,2], we analyzed the structural diversity of nanoparticles and the fragmentariness of their structure and formulated the statement that the structural inhomogeneity is a fundamental property of the nanostate. This statement was experimentally confirmed for a number of materials.…”

“…Geometrical structural complexes are determined by the subtables of the incidence table of the finite projective plane PG(2,2). The subtables differ only in the 3'-3 and 7'-5 incidence signs.…”

Nanostructures with coherent boundaries and the local approach

Physico-chemical Analysis of Ceramic Material Systems: From Macro- to Nanostate

From ancient inorganic chemistry and alchemy of ceramics to modern nanotechnology