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Particular class of sets which can be described entirely in terms of simpler sets
in set theory, the constructible universe (or Gödel's constructible universe), denoted by L , {\displaystyle L,} is a particular class of sets that
Constructible_universe
and sheaves are (locally) constructible. Constructible sets also feature in the definition of various types of constructible sheaves in algebraic geometry
Constructible_set_(topology)
Topics referred to by the same term
In mathematics, constructible set may refer to either: a notion in Gödel's constructible universe Constructible set (topology), a class of subsets of
Constructible_set
Possible axiom for set theory in mathematics
well-founded sets, and L {\displaystyle L} represents the constructible sets. In Zermelo–Fraenkel set theory (ZF), the property of being constructible is expressible
Axiom_of_constructibility
that the higher direct images of a constructible sheaf are constructible. Here we use the definition of constructible étale sheaves from the book by Freitag
Constructible_sheaf
Number constructible via compass and straightedge
coordinate system, a point is constructible if and only if its Cartesian coordinates are both constructible numbers. Constructible numbers and points have also
Constructible_number
Minimal standard model of ZFC
class of constructible sets of W (and so Lκ is itself a standard model). If there is a set that is a standard model of ZF, then the smallest such set is such
Minimal_model_(set_theory)
Standard system of axiomatic set theory
particular inner models, such as in the constructible universe. However, some statements that are true about constructible sets are not consistent with hypothesized
Zermelo–Fraenkel_set_theory
terminology being similar, the constructible topology is not the same as the set of all constructible sets. Constructible set (topology) Some authors prefer
Constructible_topology
Method of drawing geometric objects
is constructible if and only if it represents a constructible number, and an angle is constructible if and only if its cosine is a constructible number
Straightedge and compass construction
Straightedge_and_compass_construction
Topics referred to by the same term
polygon that can be constructed with compass and straightedge Constructible sheaf, a certain kind of sheaf of abelian groups Constructible set (topology), a
Constructibility
Concept in axiomatic set theory
In particular, the power set of an infinite set would contain only "constructible sets" if the universe is the constructible universe. But in other models
Axiom_of_power_set
Collectible miniatures game
The Pirates Constructible Strategy Game is a tabletop game (or constructible strategy game) manufactured by WizKids, Inc., released in early July 2004
Pirates Constructible Strategy Game
Pirates_Constructible_Strategy_Game
System of mathematical set theory
constructible universe. He constructed a function on the class of all ordinals that, for each ordinal, builds a constructible set by applying a set-building
Von Neumann–Bernays–Gödel set theory
Von_Neumann–Bernays–Gödel_set_theory
Lα of the constructible hierarchy is isomorphic to an element Lγ of the constructible hierarchy constructible A set is called constructible if it is in
Glossary_of_set_theory
Concept in set theory
x {\displaystyle x} . See Constructible universe#Relative constructibility. 0†, a set similar to 0# where the constructible universe is replaced by a
Zero_sharp
Fractal named after mathematician Benoit Mandelbrot
The Mandelbrot set (/ˈmændəlbroʊt, -brɒt/) is a two-dimensional set. It is defined in the complex plane as the complex numbers c {\displaystyle c} for
Mandelbrot_set
In set theory, Jensen's covering theorem states that if 0# does not exist then every uncountable set of ordinals is contained in a constructible set of
Jensen's_covering_theorem
Comprehensive list of Magic: The Gathering card sets since its inception in 1993
The trading card game Magic: The Gathering has released a large number of sets since it was first published by Wizards of the Coast. After the 1993 release
List of Magic: The Gathering sets
List_of_Magic:_The_Gathering_sets
Mathematical object studied in the field of algebraic geometry
a quasi-projective variety is usually not called a variety but a constructible set. In classical algebraic geometry, all varieties were by definition
Algebraic_variety
Branch of mathematics that studies sets
set theory (ZF) is a transitive class that includes all the ordinals and satisfies all the axioms of ZF. The canonical example is the constructible universe
Set_theory
Collection of mathematical objects
In mathematics, a set is a collection of different things; the things are called elements or members of the set and are typically mathematical objects:
Set_(mathematics)
Set of points on a line segment with certain topological properties
In mathematics, the Cantor set is a self-similar set of points lying on a single line segment that has a number of unintuitive properties. It was discovered
Cantor_set
Process of making a motion picture
including hiring cast and crew, scouting and securing locations, and constructing sets. The third stage is production, which is when the raw footage and
Filmmaking
Combinatorial principle
principle introduced by Ronald Jensen in Jensen (1972) that holds in the constructible universe and that implies the continuum hypothesis. Jensen extracted
Diamond_principle
French philosopher (born 1937)
to refer to constructible language to conceive of a 'set of dominations', which he refers to as the indiscernible set, or the generic set. It is, therefore
Alain_Badiou
Rational surface in 5-dimensional projective space
variety under the Veronese map is again a variety, rather than simply a constructible set; furthermore, these are isomorphic in the sense that the inverse map
Veronese_surface
Finite collection of distinct objects
larger finite set to a smaller finite set. The natural numbers are defined abstractly by the Peano axioms, and can be constructed set-theoretically (for
Finite_set
Algorithm for finding zeros of functions
Sutherland constructed a universal set of starting points for Newton's method: for every degree d, there exists an explicitly constructible set of approximately
Newton's_method
Intersection of an open set and a closed set
subsets need not be locally closed. (This motivates the notion of a constructible set.) Especially in stratification theory, for a locally closed subset
Locally_closed_subset
Real number uniquely specified by description
rational number, is constructible. The positive square root of 2 is constructible. However, the cube root of 2 is not constructible; this is related to
Definable_real_number
Set of the elements not in a given subset
In set theory, the complement of a set A, often denoted by A c {\displaystyle A^{c}} (or A′), is the set of elements not in A. When all elements in the
Complement_(set_theory)
Noetherian. A d-constructible set is a finite union of closed and open sets in the Kolchin topology. Equivalently, a d-constructible set is the set of solutions
Differentially_closed_field
Class of mathematical set whose elements are all subsets
Neumann universe V {\displaystyle V} and Gödel's constructible universe L {\displaystyle L} are transitive sets. The universes V {\displaystyle V} and L {\displaystyle
Transitive_set
The notion of mouse generalizes the concept of a level of Gödel's constructible hierarchy while being able to incorporate large cardinals. Mice are
Mouse_(set_theory)
Set-theoretic tree with uncountable branches
Solovay showed in unpublished work that there are Kurepa trees in Gödel's constructible universe (Jech 1971). More precisely, the existence of Kurepa trees
Kurepa_tree
Mathematical set containing no elements
the empty set or void set is the unique set having no elements; its size or cardinality (count of elements in a set) is zero. Some axiomatic set theories
Empty_set
Lemma in constructibility theory
In set theory, a branch of mathematics, the condensation lemma is a result about sets in the constructible universe. It states that if X is a transitive
Condensation_lemma
Set of elements common to all of some sets
In set theory, the intersection of two sets A {\displaystyle A} and B , {\displaystyle B,} denoted by A ∩ B , {\displaystyle A\cap B,} is the set containing
Intersection_(set_theory)
Mathematical logic concept
absoluteness of a large class of formulas between a model of set theory and its constructible universe, with important methodological consequences. The absoluteness
Absoluteness_(logic)
Sets whose elements have degrees of membership
In mathematics, fuzzy sets are sets whose elements have degrees of membership. Fuzzy sets were introduced independently by Lotfi A. Zadeh in 1965 as an
Fuzzy_set
Diagram that shows all possible logical relations between a collection of sets
between sets, popularized by John Venn (1834–1923) in the 1880s. The diagrams are used to teach elementary set theory, and to illustrate simple set relationships
Venn_diagram
System of mathematical set theory
second-order Zermelo set theory. Similarly, the set V ω ⋅ 2 ∩ L {\displaystyle V_{\omega \cdot 2}\cap L} (where L is the constructible universe) forms a
Zermelo_set_theory
System of mathematical set theory
theorems in set theory, such as the Mostowski collapse lemma. Constructible universe Admissible ordinal Hereditarily countable set Kripke–Platek set theory
Kripke–Platek_set_theory
Topics referred to by the same term
and the quotient G/N is an abelian variety. Chevalley's theorem on constructible sets. This disambiguation page lists mathematics articles associated with
Chevalley_theorem
Construction of an angle equal to one third a given angle
algebraic problem. Every rational number is constructible. Every irrational number that is constructible in a single step from some given numbers is a
Angle_trisection
Natural number
the Mandelbrot set. Since 51 is the product of the distinct Fermat primes 3 and 17, a regular polygon with 51 sides is constructible with compass and
51_(number)
Collection of sets in mathematics that can be defined based on a property of its members
In set theory and its applications throughout mathematics, a class is a collection of mathematical objects (often sets) that can be unambiguously defined
Class_(set_theory)
Phase of producing a film or television show in which the bulk of shooting takes place
aspects. While shooting in a sound stage offers more accurate planning, constructing sets may be expensive. Costs and artistic reasons (see French New Wave
Principal_photography
Mathematical set that can be enumerated
standard model (see inner model) of ZFC set theory, then there is a minimal standard model (see Constructible universe). The Löwenheim–Skolem theorem
Countable_set
Use of braces for specifying sets
{Z} ,n=2k\}} — The set of all even integers, expressed in set-builder notation. In mathematics and more specifically in set theory, set-builder notation
Set-builder_notation
introduced by Ronald Jensen in his analysis of the fine structure of the constructible universe L. Define Sing to be the class of all limit ordinals which
Square_principle
Identities and relationships involving sets
mathematics, particularly in the study of set theory, the algebra of sets defines the properties and laws of sets, the set-theoretic operations of union, intersection
Algebra_of_sets
mathematical set theory, a set of Gödel operations is a finite collection of operations on sets that can be used to construct the constructible sets from ordinals
Gödel_operation
Set theory construction
every set of reals has the perfect set property and the first uncountable cardinal ℵ1 is regular, then ℵ1 is inaccessible in the constructible universe
Solovay_model
of Zermelo–Fraenkel set theory by adding a generic subset G of a partially ordered set to M, imitating Kurt Gödel's constructible hierarchy. Dana Scott
Ramified_forcing
Set that is not a finite set
In set theory, an infinite set is a set that is not a finite set. Infinite sets may be countable or uncountable. The set of natural numbers (whose existence
Infinite_set
Class of electric multiple unit operating in Sydney, Australia
The K sets are a class of double-decker electric multiple units (EMU) that formerly operated on the Sydney Trains suburban network in New South Wales,
New_South_Wales_K_set
Infinite set that is not countable
mathematics, an uncountable set, informally, is an infinite set that contains too many elements to be countable. The uncountability of a set is closely related
Uncountable_set
Set theory concept
Whitehead and Russell. Universe (mathematics) Constructible universe Grothendieck universe Inaccessible cardinal S (set theory) Mirimanoff 1917; Moore 2013, pp
Von_Neumann_universe
American philosopher (born 1943)
and Evidence, NOUS, 2000. ISBN 022666970X. Putnam on Reference and Constructible Sets, British Journal for Philosophy of Science, 1998. A Misuse of Bayes'
Michael_Levin_(philosopher)
Mathematical set of all subsets of a set
mathematics, the power set (or powerset) of a set S is the set of all subsets of S, including the empty set and S itself. In axiomatic set theory (as developed
Power_set
American philosopher and logician (1940–1996)
Univ. Press. 1968 (with Hilary Putnam), "Degrees of unsolvability of constructible sets of integers," Journal of Symbolic Logic 33: 497–513. 1969, "Effectiveness
George_Boolos
Infinite cardinal number
integers, such as the set of all square numbers or the set of all prime numbers, the set of all rational numbers, the set of all constructible numbers (in the
Aleph_number
Topics referred to by the same term
Circle symbol (disambiguation) Empty set (∅), the set having no elements Zero sharp (0#), in the Gödel constructible universe Phi (Φ), a letter of the Greek
0_(disambiguation)
Concept in mathematics
In set theory, a mathematical discipline, the Jensen hierarchy or J-hierarchy is a modification of Gödel's constructible hierarchy, L, that circumvents
Jensen_hierarchy
Intentionally devised human language
were not used to construct new grammars. Roughly contemporary to Plato, in his descriptive grammar of Sanskrit, Pāṇini constructed a set of rules for explaining
Constructed_language
Mathematics textbook
model theory (rather specifically aimed at models of set theory) and the theory of Gödel's constructible universe, L. The book then proceeds to describe the
Set Theory: An Introduction to Independence Proofs
Set_Theory:_An_Introduction_to_Independence_Proofs
Set theory concept
definable powerset operation rather than the full one yields Gödel's constructible universe, L, which does not satisfy the statement "there is a measurable
Large_cardinal
Set whose elements all belong to another set
In mathematics, a set A is a subset of a set B if and only if all elements of A are also elements of B; B is then a superset of A. It is possible for A
Subset
Any one of the distinct objects that make up a set in set theory
mathematics, an element (or member) of a set is any one of the distinct objects that belong to that set. For example, given a set called A containing the first four
Element_of_a_set
Process of constructing an imaginary world
of fiction set multiple works in the same world. This is known as a fictional universe. For example, science fiction writer Jack Vance set a number of
Worldbuilding
Shape containing unit line segments in all directions
In mathematics, a Kakeya set, or Besicovitch set, is a set of points in Euclidean space which contains a unit line segment in every direction. For instance
Kakeya_set
System of mathematical set theory
Kripke–Platek set theory Barwise, Jon (1975), Admissible Sets and Structures, Springer-Verlag, ISBN 3-540-07451-1. Gostanian, Richard (1980), "Constructible Models
Kripke–Platek set theory with urelements
Kripke–Platek_set_theory_with_urelements
Any collection of sets, or subsets of a set
"family of sets" because if one instead uses "set of sets" then the subsequent use of "set" can be confusing as to whether it is the containing set or one
Family_of_sets
. Let Lα denote the αth stage of Godel's constructible universe. Lα is closed under primitive recursive set functions iff α is closed under each f i {\displaystyle
Primitive recursive set function
Primitive_recursive_set_function
Informal set theories
Naive set theory is any of several set theories used in the discussion of the foundations of mathematics. Unlike axiomatic set theories, which are defined
Naive_set_theory
Class of electric trains operating in Sydney, Australia
to design, manufacture and commission the A sets. The stainless steel bodies were partially constructed by CNR Changchun Railway Vehicles in China before
New_South_Wales_A_and_B_sets
Class of electric multiple unit operating in Sydney, Australia
The H sets, commonly referred to as the OSCAR (Outer Suburban Car) trains, are a class of double-decker electric multiple units (EMU) currently operated
New_South_Wales_H_set
Type of infinite number in set theory
cardinal, a stronger notion Club set Inner model Von Neumann universe Constructible universe Drake, F. R. (1974), Set Theory: An Introduction to Large
Inaccessible_cardinal
Paradox in set theory
a set-theoretic paradox published by the British philosopher and mathematician, Bertrand Russell, in 1901. Russell's paradox shows that every set theory
Russell's_paradox
Mathematician (1845–1918)
had S1 as its set of zeros, where S1 is the set of limit points of S. If Sk+1 is the set of limit points of Sk, then he could construct a trigonometric
Georg_Cantor
Open set Clopen set Fσ set Gδ set Compact set Relatively compact set Regular open set, regular closed set Connected set Perfect set Meagre set Nowhere
List_of_types_of_sets
Size of a set in mathematics
disproved from the axioms of ZFC by showing that both CH and AC hold in his constructible universe: an inner model of ZFC. The existence of a model of ZFC in
Cardinality
Topics referred to by the same term
memory management system by Harlequin Object pool pattern, a pattern to construct sets of initialized programming objects that are kept ready to use Thread
Pool
Set of elements in any of some sets
In set theory, the union (denoted by ∪) of a collection of sets is the set of all elements in the collection. It is one of the fundamental operations
Union_(set_theory)
Classical problem in combinatorics
The set cover problem is a classical question in combinatorics, computer science, operations research, and complexity theory. Given a set of elements
Set_cover_problem
2005 film directed by Sydney Pollack
Nations were denied, and faced with increased production costs to use a constructed set in Toronto, Pollack approached then-Secretary-General Kofi Annan directly
The_Interpreter_(2005_film)
2019 South Korean film by Bong Joon Ho
constructed set. The ground floor and the garden were constructed on an empty outdoor lot, while the basement and first floor were constructed on set
Parasite_(2019_film)
Proposition in mathematical logic
proof shows that both CH and AC hold in the constructible universe L {\displaystyle L} , an inner model of ZF set theory, assuming only the axioms of ZF.
Continuum_hypothesis
Mathematical concept
elements of some set S {\displaystyle S} have a notion of equivalence (formalized as an equivalence relation), then one may naturally split the set S {\displaystyle
Equivalence_class
Abstract data type for storing distinct values
in a set. Some set data structures are designed for static or frozen sets that do not change after they are constructed. Static sets allow only query
Set_(abstract_data_type)
Set with exactly one element
a singleton (also known as a unit set or one-point set) is a set with exactly one element. For example, the set { 0 } {\displaystyle \{0\}} is a singleton
Singleton_(mathematics)
Smallest cardinal strictly greater in size than another cardinal
says that for any well-orderable cardinal, a larger such cardinal is constructible. The minimum actually exists because the ordinals are well-ordered.
Successor_cardinal
Totemic animal of the god Set
In ancient Egyptian art, the Set animal, or sha,[citation needed] is the affiliated animal of the god Set. Because Set was identified with the Greek monster
Set_animal
Fictional character in the DC Universe
live-action by James Marsters in Smallville and Blake Ritson in Krypton, and is set to appear in the DC Universe (DCU) film Man of Tomorrow (2027), portrayed
Brainiac_(character)
Natural number
Fermat primes is equal to the number of sides of the largest regular constructible polygon with a straightedge and compass that has an odd number of sides
32_(number)
1965 film by Robert Wise
director Boris Leven to design and construct all of the original interior sets at Fox studios, as well as some external sets in Salzburg. The Trapp villa was
The_Sound_of_Music_(film)
Class of electric train operating in Sydney, Australia
The T sets, also referred to as the Tangara trains, are a class of double-decker electric multiple units (EMU) that operate on the Sydney Trains network
New_South_Wales_T_set
Concept in mathematical logic
In set theory, a hereditary set (or pure set) is a set whose elements are all hereditary sets. That is, all elements of the set are themselves sets, as
Hereditary_set
CONSTRUCTIBLE SET
CONSTRUCTIBLE SET
Surname or Lastname
English
English : habitational name from a place in Kent named Meopham, from an Old English personal name MÄ“apa + Old English hÄm ‘homestead’, ‘settlement’.
Male
Italian
Italian form of Roman Latin Septimus, SETTIMIO means "seventh."
Surname or Lastname
English
English : habitational name from places in Cheshire and East Yorkshire, so named from Old English mylen ‘mill’ + tūn ‘enclosure’, ‘settlement’.
Surname or Lastname
English
English : occupational name for a stone- or bricklayer, from Middle English setter ‘one who lays stones or bricks in building’ (agent derivative of setten ‘to set’).English : occupational name from Old French saietier ‘silk weaver’ (an agent derivative of sayete, a kind of silk).English : from an agent derivative of Middle English setten ‘to place (decoration, on a garment or metal surface)’, probably an occupational name for an embroiderer.German : unexplained.Norwegian : unexplained.
Male
Hindi/Indian
(सेठ) Hindi name derived from the Sanskrit word setu, SETH means "bridge." Compare with other forms of Seth.
Surname or Lastname
English
English : habitational name from a place in Shropshire, so named from Welsh mynydd ‘hill’ + Old English tūn ‘enclosure’, ‘settlement’.
Surname or Lastname
English and Irish
English and Irish : variant of Mayhew.Variant of French Mailhot.A William Mayo born in Wiltshire, England, c. 1684 was a surveyor who settled in VA about 1623 and helped survey the VA-NC boundary and found Richmond and Petersburg, VA. [newpara]The Mayo Clinic in Rochester, MN, was founded by William Worrall Mayo (1819–1911), who immigrated to the U.S. from England, in 1845, and his sons, all gifted and innovative physicians and surgeons.
Surname or Lastname
Scottish and English
Scottish and English : topographic name for someone who lived near a mill, Middle English mille, milne (Old English myl(e)n, from Latin molina, a derivative of molere ‘to grind’). It was usually in effect an occupational name for a worker at a mill or for the miller himself. The mill, whether powered by water, wind, or (occasionally) animals, was an important center in every medieval settlement; it was normally operated by an agent of the local landowner, and individual peasants were compelled to come to him to have their grain ground into flour, a proportion of the ground grain being kept by the miller by way of payment.English : from a short form of a personal name, probably female, as for example Millicent.
Surname or Lastname
English
English : habitational name from Mitcham in Surrey, so named from Old English micel ‘big’ + hÄm ‘homestead’, ‘settlement’.
Surname or Lastname
English and Scottish
English and Scottish : habitational name from any of the numerous and widespread places so called. The majority of these are named with Old English middel ‘middle’ + tūn ‘enclosure’, ‘settlement’; a smaller group, with examples in Cumbria, Kent, Northamptonshire, Northumbria, Nottinghamshire, and Staffordshire, have as their first element Old English mylen ‘mill’.
Male
English
Anglicized form of Hebrew Sheth, SETH means "buttocks." In the bible, this is the name of the third son of Adam and Eve. Compare with other forms of Seth.
Male
Greek
(Σήθι) Greek form of Egyptian Seti, SETHI means "of Seth."Â
Surname or Lastname
English
English : topographic name for someone who lived in the center of a village, from Middle English midde ‘mid’ + toun ‘village’, ‘town’.English : habitational name from places in Lancashire, Worcestershire, and West Yorkshire, so named in Old English as ‘farmstead at a river confluence’, from (ge)m̄ðe ‘river confluence’ + tūn ‘farmstead’, ‘settlement’.
Surname or Lastname
English and Scottish
English and Scottish : habitational name from any of the places so called. In over thirty instances from many different areas, the name is from Old English midel ‘middle’ + tūn ‘enclosure’, ‘settlement’. However, Middleton on the Hill near Leominster in Herefordshire appears in Domesday Book as Miceltune, the first element clearly being Old English micel ‘large’, ‘great’. Middleton Baggot and Middleton Priors in Shropshire have early spellings that suggest gem̄ðhyll (from gem̄ð ‘confluence’ + hyll ‘hill’) + tūn as the origin.A Scottish family of this name derives it from lands at Middleto(u)n near Kincardine. The Scottish physician Peter Middleton practiced in New York City after 1752 and was one of the founders of the medical school at King's College (now Columbia University) in 1767. One of the earliest of the Charleston, SC, Middleton family of prominent legislators was Arthur Middleton, born in Charleston in 1681.
Surname or Lastname
English
English : habitational name from Milwich in Staffordshire, so named from Old English myln ‘mill’ + wīc ‘dairy farm’; ‘(trading) settlement’.
Surname or Lastname
English
English : patronymic from Setter.
Surname or Lastname
English
English : habitational name from places called Merton in London, Devon, Norfolk, and Oxfordshire, named in Old English with mere ‘lake’, ‘pool’ + tūn ‘enclosure’, ‘settlement’. Compare Marton, Martin 2.
Female
Japanese
(節å) Japanese name SETSUKO means "temperate child."
Surname or Lastname
English
English : habitational name from a place in North Yorkshire, so named from Old English setl ‘seat’, ‘dwelling’.
Male
Greek
(Σήθος) Greek form of Egyptian Sutekh, possibly SETHOS means "one who dazzles." In mythology, this is the name of an ancient evil god of Chaos, storms, and the desert, who slew Osiris.Â
CONSTRUCTIBLE SET
CONSTRUCTIBLE SET
Boy/Male
Muslim
Name of a reciter of Quran
Male
Hebrew
(×’Ö¼Ö´× Ö¼Ö¸×”) Hebrew unisex name GINA means "garden." Compare with strictly feminine forms of Gina.
Boy/Male
Norse
True.
Male
English
Irish surname transferred to forename use, from an Anglicized form of Gaelic Baile an Doire, BALLINDERRY means "town of the oak wood."
Boy/Male
Hindu, Indian
Who Wins Soul
Boy/Male
Muslim/Islamic
Ayyub was a Prophet of Allah known for his patience in the face of severity and hardship. There have been other noted men by this name for instance Ibn Tamim was a reciter of the Quran, Al-Sakhtiyani
Boy/Male
Indian
Habit, Custom, Name of Lord Ayyappa
Surname or Lastname
Americanized spelling of Jansen, Janssen, and Jansson.English
Americanized spelling of Jansen, Janssen, and Jansson.English : patronymic from the personal name Jan, a medieval form of John.
Boy/Male
Bengali, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Tamil, Telugu
Son
Girl/Female
Indian, Punjabi, Sikh
One Light; Light of God
CONSTRUCTIBLE SET
CONSTRUCTIBLE SET
CONSTRUCTIBLE SET
CONSTRUCTIBLE SET
CONSTRUCTIBLE SET
a.
Capable of being extended, whether in length or breadth; susceptible of enlargement; extensible; extendible; -- the opposite of contractible or compressible.
n.
The act or process, by which living tissues or cells take up and convert into their own proper substance the nutritive material brought to them by the blood, or by which they transform their cell protoplasm into simpler substances, which are fitted either for excretion or for some special purpose, as in the manufacture of the digestive ferments. Hence, metabolism may be either constructive (anabolism), or destructive (katabolism).
a.
Pertaining to a master builder, or to architecture; evincing skill in designing or construction; constructive.
a.
Having small bristles or setae.
n.
One of a series of substances formed, in secreting cells, by constructive or anabolic processes, in the production of protoplasm; -- opposed to katastate.
n.
Capability of being contracted; quality of being contractible; as, the contractibility and dilatability of air.
a.
Having ability to construct or form; employed in construction; as, to exhibit constructive power.
a.
Pertaining to anabolism; an anabolic changes, or processes, more or less constructive in their nature.
a.
According to interpretation; constructive.
adv.
In a constructive manner; by construction or inference.
a.
Capable of contraction.
a.
Eager in appetite or desire of gratification; affected by keen hunger; ravenous; as, an eagle or a lion sharp-set.
a.
Constructive.
a.
Properly or firmly set.
a.
Capable of expansion; that may be dilated; -- opposed to contractible; as, the lungs are dilatable by the force of air; air is dilatable by heat.
n.
The constructive metabolism of the body, as distinguished from katabolism.
a.
Derived from, or depending on, construction or interpretation; not directly expressed, but inferred.
a.
Capable of being instructed; teachable; docible.
a.
Building up; constructive; -- opposed to destructive.
n.
An instrument used to set or turn the teeth of a saw a little sidewise, that they may make a kerf somewhat wider than the thickness of the blade, to prevent friction; -- called also saw-wrest.