「TOPOLOGICAL」の共起表現一覧(1語右で並び替え)
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| The | topological A-model comes with a target space which is |
| ad and A.B. Thaheem): Double multipliers on | topological algebras, Internat. |
| general method of domain representations of | topological algebras. |
| dra in three and four dimensions, and their | topological analogues". |
| for film development, scanning and for the | topological and kinematic search of tau decays. |
| Topological approach to the chemistry of conjugated mol | |
| s she became interested in fixed points and | topological aspects of dynamical systems. |
| n − 1)-sphere in Euclidean n-space bounds a | topological ball, however embedded. |
| He also was the first to measure the | topological Berry's Phase (Geometric phase) . |
| l logic S4 is characterized by the class of | topological boolean algebras-that is, boolean algebras |
| Topological changes are propagated once the gene is pul | |
| the matrix, facultative S/MARs responds to | topological changes which are initiated by the associat |
| It is a singular non-self-dual solution of | topological charge 1/2. |
| The unique nature of the | topological codes, such as the toric code, is that stab |
| the digital topology which is the basic for | topological computing is in . |
| dicate logic processor based on the idea of | topological computing was designed and tested by FPGA m |
| Topological computing is the designing and building of | |
| It is a generalization of the | topological concept of linking number to the differenti |
| rtin-Mazur zeta function is invariant under | topological conjugation. |
| Its name comes from a | topological construction from the icosidodecahedron wit |
| ptive name triakis icosahedron represents a | topological construction starting with an icosahedron a |
| Its name comes from a | topological construction from the snub dodecahedron wit |
| sner and he found the gravitational kink, a | topological defect in the gravitational metric, whose q |
| iously the coordinator of an ESF Network on | Topological Defects in Particle Physics, Condensed Matt |
| Cosmic Strings and Other | Topological Defects by A. Vilenkin, E. P. S. Shellard, |
| ymmetry breaking, phase transitions and the | topological defects (monopoles, cosmic strings or domai |
| curves in general relativity; varieties of | topological defects in field theory; and cosmological d |
| See | topological degree theory. |
| Topological degree theory has applications in complemen | |
| In mathematics, | topological degree theory is a generalization of the wi |
| of the coordination sequence is denoted the | topological density, and the sum of the first ten terms |
| ed to higher dimensions, in particular to a | topological dimension of three. |
| operimetric dimension to be larger than the | topological dimension. |
| Topological domain theory | |
| Any change of T in a closed | topological domain must be balanced by a change in W, a |
| ey (the components) exist by specifying the | topological domain of its realization as such a network |
| theory can be viewed as a special case of a | topological double cover. |
| ferential geometry, differential equations, | topological dynamical systems theory and non-standard a |
| an, was one of the founders of symbolic and | topological dynamics. |
| His research interests are nonlocal and | topological effects in quantum mechanics, quantum field |
| shitz transition at the band edge or at the | topological electronic transitions of the Fermi surface |
| , every isometry between metric spaces is a | topological embedding. |
| He requsted leave from the | Topological Engineers in 1859 and died in 1861. |
| The | topological entropy of the map f is defined by |
| me entropy h is always bounded above by the | topological entropy htop of the geodesic flow on M. |
| But sometimes it can have a useful | topological existence in transforming polyhedra. |
| A smooth | topological feature which prevents a CTC from being def |
| The BF model is a | topological field theory, which when quantized, becomes |
| is important in conformal field theory and | topological field theory, is named after him. |
| ees of freedom, which is why it is called a | topological field theory. |
| g Boolean algebra and then extend this to a | topological field of sets by taking the topology genera |
| Topological fields of sets that are separative, compact | |
| f mathematical research with its origins in | topological fixed point theory. |
| With regular polygon faces, the two | topological forms types are the square pyramid and tria |
| As a consequence, a large class of the | topological four-manifolds do not admit any smooth stru |
| tence of "exotic" smooth structures-certain | topological four-manifolds could carry an infinite fami |
| Whereas Michael Freedman classified | topological four-manifolds, Donaldson's work focused on |
| "The | topological fundamental group and generalized covering |
| Topological graph theory | |
| His Ph.D. thesis from | topological graph theory was written under the guidance |
| In | topological graph theory there are several definitions |
| Topological graph theory, AT White, LW Beineke, Selecte | |
| In | topological graph theory the first Betti number of a gr |
| This makes (2+1)-dimensional | topological gravity a topological theory with no gravit |
| ind, and argued that nonperturbatively 2+1D | topological gravity differs from Chern-Simons because t |
| opology make it into a Lie group, a type of | topological group. |
| chaperonin PapD share a high structural and | topological homology in their β sheet regions. |
| Wiener index is the oldest | topological index related to molecular branching. |
| Hosoya's article "The | Topological Index Z Before and After 1971" describes th |
| A | topological index may have the same value for a subset |
| lar topology, and mathematical chemistry, a | topological index also known as a connectivity index is |
| the Wiener index (also Wiener number) is a | topological index of a molecule, defined as the sum of |
| ability is very important characteristic of | topological index. |
| ncrease the discrimination capability a few | topological indices may be combined to superindex. |
| Topological indices are numerical parameters of a graph | |
| rimental properties, usually referred to as | topological indices (TIs). |
| Topological indices are used in the development of quan | |
| Topological indices are used for example in the develop | |
| These were new | topological invariants sensitive to the underlying smoo |
| ation expresses this inequality in terms of | topological invariants of the underlying real oriented |
| er of nuts and bolts can also be related to | topological invariants, such as the Euler characteristi |
| ws over a field, which generalize classical | topological K-theory. |
| alent Legendrian knots that are isotopic as | topological knots. |
| ly nineties, he pioneered IGP and EGP-based | topological load balancing techniques using IP Anycast |
| on is defined for any compact m-dimensional | topological manifold M |
| s defined on a particular background space ( | topological manifold). |
| y declaring '... and what he is saying is a | topological mapping of the truth'. |
| LUT4 translocation to the cell surface, the | topological mapping of the insulin signal transduction |
| hey showed that there exist two-dimensional | topological median algebras that cannot be embedded int |
| an eversion of the sphere, i.e. a homotopy ( | topological metamorphosis) which starts with a sphere a |
| Using the Borsuk-Ulam Theorem: Lectures on | Topological Methods in Combinatorics and Geometry. |
| problems posed by Francesco Severi, and the | topological methods of Solomon Lefschetz. |
| homeomorphic subgraphs (also called | topological minors). |
| In mathematics, a generalized map is a | topological model which allows one to represent and to |
| is represented by a boundary representation | topological model, where analytical 3D surfaces and cur |
| The results support the idea of a common | topological motif for members of the SSSF. |
| This kind of the | topological network analysis is normally done to find r |
| y for non-abelian gauge theories because of | topological obstructions and the best that can be done |
| Nef polyhedra is closed with respect to the | topological operations of taking closure, interior, ext |
| rrangement A generally concern geometrical, | topological, or other properties of the complement, M(A |
| tite lattices, RVB liquid phases possessing | topological order also appear. |
| The discovery of | topological order in quantum dimer models (more than a |
| been proposed as a physical explanation for | topological order by Michael A. Levin and Xiao-Gang Wen |
| ming a standard algorithm for computing the | topological order, this simplifies into O(|V| + |E| + | |
| E| + |V|), if T is the time required by the | topological order. |
| rtices of G to levels in the reverse of the | topological ordering constructed in the previous step. |
| DAG in linear time, by attempting to find a | topological ordering and then testing whether the resul |
| ordering is not unique; a DAG has a unique | topological ordering if and only if it has a directed p |
| Every directed acyclic graph has a | topological ordering, an ordering of the vertices such |
| The family of | topological orderings of a DAG is the same as the famil |
| e Lefschetz zeta-function is a tool used in | topological periodic and fixed point theory, and dynami |
| are considered as two overlapping edges as | topological polyhedron. |
| A theory of a particular case of | topological processors has been proposed by Ryabov and |
| e in his career for producing an innovative | topological proof of the infinitude of prime numbers. |
| portant tool for studying combinatorial and | topological properties of polytopes. |
| Because degree is itself a | topological property of networks, this type of assortat |
| A configuration with this non-trivial | topological property is called the Nielsen-Olesen vorte |
| ed around issues of mass inhomogeneties and | topological quantum field theories. |
| mology, which is related to his interest in | topological quantum field theory. |
| ors could be used as a building block for a | topological quantum computer, in view of their non-Abel |
| team is involved in the development of the | topological quantum computer. |
| have the interpretation of winding numbers ( | topological quantum numbers) of various strings and bra |
| ns of high-level features, geometric types, | topological relationships, temporal coordinates and rel |
| universal cover concept from topology; the | topological requirement that a universal cover be simpl |
| l models with respect to their geometrical, | topological, semantical and appearance properties. |
| e a crude volcano cone, giving the vessel a | topological similarity to a Bundt pan. |
| lated interests in the theory of monopoles, | topological solitons and skyrmions. |
| In the process of this duality | topological solitons called Abrikosov-Nielsen-Oleson vo |
| Then, any | topological sort of this graph is a valid instruction s |
| Topological sorting is the algorithmic problem of findi | |
| We thus obtain a | topological space . |
| A | topological space is first countable if and only if . |
| Let S be a subset of a | topological space X. |
| R0 space, a | topological space in which two topologically distinguis |
| This means that given a | topological space X, the identity map |
| In mathematics, a spectral space is a | topological space which is homeomorphic to the spectrum |
| The closed points of a | topological space X are precisely the minimal elements |
| amed after R. H. Bing, characterizes when a | topological space is metrizable. |
| A | topological space is zero-dimensional with respect to t |
| Conversely, given any | topological space X, the collection of subsets of X tha |
| a necessary and sufficient condition for a | topological space to be metrizable. |
| The theorem states that a | topological space X is metrizable if and only if it is |
| mplicial complex from an open covering of a | topological space X. |
| as the algebra of regular open sets in the | topological space of P (with underlying set P, and a ba |
| In mathematics, in the field of topology, a | topological space is said to be hemicompact if it has a |
| If T is a | topological space and x0 is a point in T, we turn the s |
| paper showing that the homology theory of a | topological space could be defined in terms of its dist |
| A book B is a | topological space consisting of a single line ℓ called |
| A real function on a | topological space is upper semi-continuous if and only |
| mathematics, the closure of a subset S in a | topological space consists of all points in S plus the |
| A | topological space is zero-dimensional with respect to t |
| the complete lattices of open sets of some | topological space, also ordered by subset inclusion. |
| ontinuous functions whose domain is a given | topological space. |
| ural preorder on the set of the points of a | topological space. |
| A function between two | topological spaces |
| of metric spaces is geometry, the study of | topological spaces is topology. |
| The | topological spaces called Fort space and Arens-Fort spa |
| ore general framework for dualities between | topological spaces and partially ordered sets. |
| More explicitly, a map f : X → Y between | topological spaces X and Y is an embedding if f yields |
| , graph theory and its applications (1958), | topological spaces (1959), principles of combinatorics |
| herent spaces and Priestley spaces (ordered | topological spaces, that are compact and totally order- |
| oved results regarding the metrizability of | topological spaces, including what would later be calle |
| he work of Frigyes Riesz in connection with | topological spaces. |
| aves in place of bundles based on arbitrary | topological spaces. |
| of distinct Sasakian Einstein metrics on a | topological sphere of dimension 2n − 1 is at least prop |
| Top 3 changes the | topological status of DNA by binding and cleaving singl |
| g DNA replication to continue unhindered by | topological strain. |
| His primary area of research is | Topological string theory, where he is known for his wo |
| Estrada, E. | Topological structural classes of complex networks. |
| set of axioms which can be used to define a | topological structure on a set. |
| Due to its distinctive | topological structure, the statistical mechanics of lat |
| structures; homeomorphisms, which preserve | topological structures; and diffeomorphisms, which pres |
| less implicit) behind the preservation of a | topological sub-structure is that it is of a particular |
| In 3+1D and lower, it reduces to a | topological surface term. |
| tric (bottom) networks which do not exhibit | topological symmetry nor antimetry. |
| action for vierbeins by adding a part of a | topological term (Nieh-Yan) which does not alter the cl |
| omagnetic field was studied in detail and a | topological theory of guided waves and components was p |
| ron with an Euler characteristic of zero (a | topological torus). |
| with five sides and there are two distinct | topological types, this term is less frequently used th |
| h has proved of fundamental geometrical and | topological value in broader areas. |
| me as the closure of the convex hull in the | topological vector space. |
| eorem is a proposition about convex sets in | topological vector spaces. |
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