| 例文 | 共起表現 |
「Κ」の共起表現一覧(1語右で並び替え)
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| More generally, for a cardinal | κ, a κ-Aronszajn tree is a tree of height κ such t |
| More generally, for any infinite cardinal | κ, a κ-Suslin tree is a tree of height κ such that |
| With [ | κ]<ω denoting the set of all finite subsets of κ, |
| ed it to act as both a peripherally active μ and | κ agonist with a fast onset of action. |
| Levorphanol has affinity to μ, | κ, and δ opioid receptors, but lacks complete cros |
| ary embedding j:(Vκ, ∈, P) → (Vλ, ∈, P) for some | κ and λ in S. |
| Kappa Andromedae ( | κ And, κ Andromedae) is a star in the constellatio |
| Kappa Aquilae ( | κ Aql, κ Aquilae) is a star in the constellation A |
| Kappa Arae ( | κ Ara, κ Arae) is a double star in the constellati |
| Kappa Arietis ( | κ Ari, κ Arietis) is a binary star in the constell |
| One can try defining an ω-huge cardinal | κ as one such that an elementary embedding j : V → |
| RANKL (Receptor Activator for Nuclear Factor | κ B Ligand) is found on the surface of stromal cel |
| Receptor Activator of Nuclear Factor | κ B (RANK), also known as TRANCE Receptor, is a ty |
| κ Cancri is a blue-white B-type giant with a mean | |
| κ Canis Majoris is a blue-white B-type subgiant wi | |
| Stating that | κ cannot go to zero is analogous to the third law |
| Kappa Capricorni ( | κ Cap, κ Capricorni) is a star in the constellatio |
| κ Capricorni is a yellow G-type giant with an appa | |
| Kappa Cassiopeiae ( | κ Cas, κ Cassiopeiae) is a star in the constellati |
| In red/blue Phe105-Met106 bond of | κ- casein (Mod. of Kumosinski et al.,1993.) |
| hydrolyzes the peptide bond in Phe105-Met106 of | κ- casein and is considered to be the most efficien |
| κ Cassiopeiae is a blue-white B-type supergiant wi | |
| attern consists of α Cassiopeiae, β Cassiopeiae, | κ Cassiopeiae, η Cassiopeiae and λ Cassiopeiae. |
| Kappa Centauri ( | κ Cen, κ Centauri) is a binary star in the constel |
| The primary component, | κ Centauri A, is a blue-white B-type subgiant with |
| Kappa Cephei ( | κ Cep) is a triple star system. |
| Kappa Canis Majoris ( | κ CMa, κ Canis Majoris) is a star in the constella |
| Kappa Cancri ( | κ Cnc, κ Cancri) is a star in the constellation Ca |
| l measure, any closed unbounded (club) subset of | κ contains most ordinals less than κ. |
| κ Cru (Kappa Crucis, HD 111973) is a star in star | |
| In fact, for any infinite cardinal | κ, every κ-Suslin tree is a κ-Aronszajn tree (the |
| A cardinal | κ for which no κ-Aronszajn trees exist is said to |
| If an uncountable cardinal | κ has a measure on it, then it has a normal measur |
| If the axiom of choice holds, every cardinal | κ has a successor κ+ > κ, and there are no cardina |
| The | κ- Hefutoxin1 consists of 22 residues and one amida |
| The kappa- Hefutoxin 1 and 2 ( | κ- Hefutoxin1/2) are the toxic components of the ve |
| The | κ- Hefutoxin2 is build up of 23 residues with free |
| Kappa Herculis ( | κ Her, κ Herculis) is a double star in the constel |
| n a set is hereditarily of cardinality less than | κ if and only if its transitive closure is of card |
| , a set is hereditarily of cardinality less than | κ if and only it is of cardinality less than κ, an |
| Existence of a 2κ-supercompact cardinal | κ implies existence of many quasicompact cardinals |
| If | κ is not zero the space is not Euclidean. |
| where | κ is the critical point of j. |
| κ is almost n-huge if and only if there is j : V → | |
| In fact, if | κ is Ramsey, then every set with rank less than κ |
| If λ is any ordinal, | κ is λ-strong means that κ is a cardinal number an |
| An infinite ordinal | κ is subtle if and only if for every λ<κ, every tr |
| If λ is any ordinal, | κ is λ-supercompact means that there exists an ele |
| A cardinal number | κ is strongly λ-unfoldable if and only if for ever |
| Formally, a cardinal number | κ is λ-unfoldable if and only if for every transit |
| Equivalently, | κ is a measurable cardinal if and only if it is an |
| Every measurable cardinal | κ is a 0-huge cardinal because κM⊂M, that is, ever |
| A cardinal | κ is called remarkable if for all regular cardinal |
| h after forcing with (P, ≤) the following holds: | κ is supercompact and remains supercompact after f |
| Then | κ is strong means that it is λ-strong for all ordi |
| An uncountable cardinal number | κ is said to be Rowbottom if for every function f: |
| (Sometimes the condition that | κ is regular and uncountable is included.) |
| κ is called an extendible cardinal if it is η-exte | |
| Then | κ is supercompact means that it is λ-supercompact |
| This is no longer the case if the cofinality of | κ is uncountable. |
| ngs included are determined by their effect on P( | κ) (as computed at the stage the embedding is incl |
| mit of greatly Mahlo cardinals, where a cardinal | κ is called greatly Mahlo if it is κ+-Mahlo. |
| A cardinal number | κ is called η-extendible if for some λ there is a |
| Every I2 cardinal | κ is an I3 cardinal and has a stationary set of I3 |
| Every I1 cardinal | κ is an I2 cardinal and has a stationary set of I2 |
| is added, where | κ is either (N − 24) / 12 or N / 12 depending upon |
| This property can be used to show that | κ is a limit of most types of large cardinals whic |
| If α is an ordinal, the cardinal number | κ is called α-indescribable if for every formula φ |
| the ultrafilter or measure which witnesses that | κ is measurable cannot be in M since the smallest |
| which is a standard model of ZF, and the ordinal | κ is the set of ordinals which occur in W, then Lκ |
| If | κ is supercompact, there is a κ-c.c. |
| κ is the permeability, m2 | |
| If | κ is n+1-ineffable, then the set of n-ineffable ca |
| If | κ is a subtle cardinal, then the set of κ-shrewd c |
| In particular, if | κ is singular (i.e. |
| If | κ is weakly compact then no κ-Aronszajn trees exis |
| nd any subset containing most ordinals less than | κ is stationary in κ. |
| κ is super n-huge if and only if for every ordinal | |
| κ is super almost n-huge if and only if for every | |
| If | κ is measurable and p∈Vκ and M (the ultrapower of |
| Kappa Leonis ( | κ Leonis, κ Leo) is a 4th-magnitude double star in |
| Kappa Lyrae ( | κ Lyr) is a 4th magnitude star approximately 238 l |
| The size | κ of the maximum clique in a graph is at most equa |
| he μ opioid receptor and agonist activity at the | κ opioid receptor. |
| than μ receptors, and has little to no effect on | κ opioid receptors. |
| (-)-pentazocine is a | κ opioid receptor agonist, while (+)-pentazocine i |
| eptor, but retains modest affinity for the μ and | κ opioid receptors. |
| Kappa Orionis ( | κ Ori, κ Orionis, 53 Orionis) is the sixth-brighte |
| n-selective opioid which is a μ antagonist but a | κ partial agonist. |
| Kappa Persei ( | κ Per) is a star in the constellation Perseus. |
| ely deactivated so that the actions of the δ and | κ receptors can be studied separately, in contrast |
| e δ-opioid agonist with little affinity for μ or | κ receptors. |
| Kappa Scorpii ( | κ Sco, κ Scorpii) is a star in the constellation S |
| Kappa Serpentis ( | κ Ser, κ Serpentis) is a star in the constellation |
| This prevents them from witnessing even a | κ+ strongly compact cardinal κ. |
| al measure is a measure on a measurable cardinal | κ such that the equivalence class of the identity |
| rable cardinal is an uncountable cardinal number | κ such that there exists a κ-additive, non-trivial |
| of a κ-complete normal non-principal ideal I on | κ such that for every A ∉ I and for every function |
| matics, a Reinhardt cardinal is a large cardinal | κ, suggested by Reinhardt (, ), that is the critic |
| Kappa Tauri ( | κ Tau, κ Tauri) is a star system in the constellat |
| however there are five known forms (α, β, γ, δ, | κ) The α- β phase transition is accompanied by a c |
| imited rank exists above a supercompact cardinal | κ, then a cardinal with that property exists below |
| if the limit of some sequence in C is less than | κ, then the limit is also in C. |
| It is essentially the same as setting | κ to zero. |
| Kappa Trianguli Australis ( | κ TrA, κ Trianguli Australis) is a star in the con |
| Kappa Tucanae ( | κ Tuc, κ Tucanae) is a star system in the constell |
| Kappa Ursae Majoris ( | κ UMa, κ Ursae Majoris) is a binary star in the co |
| Kappa Velorum ( | κ Vel, κ Velorum) is a binary star in the constell |
| κ Velorum is also called Markeb. | |
| arkab, a name shared with α Pegasi, k Puppis and | κ Velorum. |
| Kappa Virginis ( | κ Vir, κ Virginis) is a star in the constellation |
| Kappa Volantis ( | κ Vol, κ Volantis) is a triple star system in the |
| The system's third component, | κ Volantis C, is a magnitude +8.5 star 37.7 arcsec |
| eration is easy to define: for a cardinal number | κ we have |
| plete ultrafilter U such that for every {Ri: i < | κ} where each Ri is a binary relation and Ri ∈ Vκ, |
| (Here, "most" means that the set of elements of | κ where the property holds is a member of the ultr |
| ry cardinal μ, there is an inaccessible cardinal | κ which is strictly larger, μ < κ. |
| A κ-Suslin tree is a tree of height | κ which has no chains or antichains of size κ. |
| 例文 | 共起表現 |
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