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In mathematics, a topological ring is a ring R {\displaystyle R} that is also a topological space such that both the addition and the multiplication are
Topological_ring
In algebra, completion w.r.t. powers of an ideal
completion is any of several related functors on rings and modules that result in complete topological rings and modules. Completion is similar to localization
Completion_of_a_ring
Group that is a topological space with continuous group operations
In mathematics, topological groups are groups and topological spaces at the same time, where the group operations are required to be continuous. This
Topological_group
Algebraic structure with addition and multiplication
Zariski topology, and in either case one would obtain a topological ring. A λ-ring is a commutative ring R together with operations λn: R → R that are like
Ring_(mathematics)
Area of mathematics using condensed sets
replaces a topological space by a certain sheaf of sets, in order to solve some technical problems of doing homological algebra on topological groups. Essentially
Condensed_mathematics
Mathematical space with a notion of closeness
Common types of topological spaces include Euclidean spaces, metric spaces and manifolds. Although very general, the concept of topological spaces is fundamental
Topological_space
(Mathematical) ring with a unique maximal ideal
also write (R, m) for a commutative local ring R with maximal ideal m. Every such ring becomes a topological ring in a natural way if one takes the powers
Local_ring
Concept in number theory
{\displaystyle K} is a global field, its adele ring, often denoted A K {\displaystyle \mathbb {A} _{K}} , is a topological ring built from the completions K v {\displaystyle
Adele_ring
Type of space in mathematics
All rings will be assumed to be commutative and with unit. Let A be a (Noetherian) topological ring, that is, a ring A which is a topological space
Formal_scheme
Algebraic structure
commutative ring R, the powers of I form topological neighborhoods of 0 which allow R to be viewed as a topological ring. This topology is called the I-adic
Commutative_ring
All numbers between two given numbers
usual topology, the algebra of intervals forms a topological ring. The group of units of this ring consists of four quadrants determined by the axes
Interval_(mathematics)
In commutative algebra, a Zariski ring is a commutative Noetherian topological ring A whose topology is defined by an ideal a {\displaystyle {\mathfrak
Zariski_ring
Infinite sum that is considered independently from any notion of convergence
hand side. This topological structure, together with the ring operations described above, form a topological ring. This is called the ring of formal power
Formal_power_series
In mathematics, a topological module is a module over a topological ring such that scalar multiplication and addition are continuous. A module topology
Topological_module
Formal power series with coefficients tending to 0
complete fields. Over a discrete topological ring, the ring of restricted power series coincides with a polynomial ring; thus, in this sense, the notion
Restricted_power_series
Vector space with a notion of nearness
In mathematics, a topological vector space (also called a linear topological space and commonly abbreviated TVS or t.v.s.) is one of the basic structures
Topological_vector_space
targets Topological group – Group that is a topological space with continuous group operations Topological module Topological ring Topological semigroup
Topological_abelian_group
Sheaf of rings in mathematics
mathematics, a ringed space is a family of (commutative) rings parametrized by open subsets of a topological space together with ring homomorphisms that
Ringed_space
1954–1955 fantasy novel by J. R. R. Tolkien
The Lord of the Rings is an epic high fantasy novel written by the English author and scholar J. R. R. Tolkien. Set in Middle-earth, the story began as
The_Lord_of_the_Rings
Concept in abstract algebra
ring, being a local ring, carries a natural (adic) topology and is a topological ring. It also admits a metric space structure where the distance between
Discrete_valuation_ring
mathematics, a topological algebra A {\displaystyle A} is an algebra and at the same time a topological space, where the algebraic and the topological structures
Topological_algebra
of a topological ring whose powers are bounded. These elements are used in the theory of adic spaces. Let A {\displaystyle A} be a topological ring. A subset
Power-bounded_element
Simple mechanical puzzles using topology
(also called entanglement puzzles, tanglement puzzles, tavern puzzles or topological puzzles) are a type or group of mechanical puzzle that involves disentangling
Disentanglement_puzzle
Generalization of boundedness
Kolmogorov in 1935. Suppose X {\displaystyle X} is a topological vector space (TVS) over a topological field K . {\displaystyle \mathbb {K} .} A subset B
Bounded set (topological vector space)
Bounded_set_(topological_vector_space)
Topological space that is connected
Connectedness is one of the principal topological properties that distinguish topological spaces. A subset of a topological space X {\displaystyle X} is a connected
Connected_space
Algebraic structure formed from a collection of algebraic structures
{B} \end{bmatrix}}.} A topological vector space (TVS) X , {\displaystyle X,} such as a Banach space, is said to be a topological direct sum of two vector
Direct_sum
Branch of topology
topology. A set with a topology is called a topological space. Metric spaces are an important class of topological spaces where a real, non-negative distance
General_topology
Embedding a topological space into a compact space as a dense subset
embedding of a topological space X as a dense subset of a compact space is called a compactification of X. It is often useful to embed topological spaces in
Compactification (mathematics)
Compactification_(mathematics)
Mathematical generalization of boundedness
between topological and bornological notions may even be unnecessary. For example, for linear maps between normed spaces, being continuous (a topological notion)
Bornology
Indexed set in mathematics
I {\displaystyle I} -adic topology, R {\displaystyle R} becomes a topological ring. If an R {\displaystyle R} -module M {\displaystyle M} is then given
Filtration_(mathematics)
Concept in number theory
makes R × {\displaystyle R^{\times }} a topological group. Proof. Since R {\displaystyle R} is a topological ring, it is sufficient to show that the inverse
Idele_group
Concept in mathematics
provide a set with group structure (a group) or a topological space with group structure (a topological group), supplying appropriate names to the generic
Lawvere_theory
Topological space in which closed subsets satisfy the descending chain condition
In mathematics, a Noetherian topological space, named for Emmy Noether, is a topological space in which closed subsets satisfy the descending chain condition
Noetherian_topological_space
Reals with an extra square root of +1 adjoined
the usual topology of the plane, the split-complex numbers form a topological ring. The algebra of split-complex numbers forms a composition algebra since
Split-complex_number
Type of topological group in mathematics
targets Topological group – Group that is a topological space with continuous group operations Topological module Topological ring Topological semigroup
Locally_compact_group
Algebraic geometry
analogous to being a local diffeomorphism. Let A be a topological ring, and let B be a topological A-algebra. Then B is formally étale if for all discrete
Formally_étale_morphism
Field theory involving topological effects in physics
mathematical physics, a topological quantum field theory (or topological field theory or TQFT) is a quantum field theory that computes topological invariants. While
Topological quantum field theory
Topological_quantum_field_theory
algebra von Neumann double commutant theorem Commutant, bicommutant Topological ring Noncommutative geometry Disk algebra Colombeau algebra Barrelled space
List of functional analysis topics
List_of_functional_analysis_topics
Branch of algebra that studies commutative rings
topological rings and modules. Completion is similar to localization, and together they are among the most basic tools in analysing commutative rings
Commutative_algebra
targets Topological group – Group that is a topological space with continuous group operations Topological module Topological ring Topological vector lattice
Topological_semigroup
Theory in theoretical physics
In theoretical physics, topological string theory is a version of string theory. Topological string theory appeared in papers by theoretical physicists
Topological_string_theory
Area of mathematics
Abstract analysis. An approach to analysis based on topological groups, topological rings, and topological vector spaces. Geometry of Banach spaces contains
Functional_analysis
Analysis of datasets using techniques from topology
In applied mathematics, topological data analysis (TDA) is an approach to the analysis of datasets using techniques from topology. Extraction of information
Topological_data_analysis
Three linked but pairwise separated rings
In mathematics, the Borromean rings are three simple closed curves in three-dimensional space that are topologically linked and cannot be separated from
Borromean_rings
targets Topological group – Group that is a topological space with continuous group operations Topological module Topological ring Topological semigroup
Linear_topology
Type of regular Hausdorff space
particular, every topological manifold is Tychonoff. Every totally ordered set with the order topology is Tychonoff. Every topological group is completely
Tychonoff_space
Self-interacting genomic region
Dixon JR, Selvaraj S, Yue F, Kim A, Li Y, Shen Y, et al. (April 2012). "Topological domains in mammalian genomes identified by analysis of chromatin interactions"
Topologically associating domain
Topologically_associating_domain
Ring-shaped large-scale structure near the constellation Boötes
The Big Ring is a ring-shaped large-scale structure formed by galaxies and galaxy clusters near the constellation Boötes with a diameter of 1.3 billion
Big_Ring
Algebraic structure in linear algebra
{\displaystyle V\to W,} maps between topological vector spaces are required to be continuous. In particular, the (topological) dual space V ∗ {\displaystyle
Vector_space
Series of mathematics books by Nicolas Bourbaki
establish that the object A [ [ I ] ] {\displaystyle A[[I]]} is also a topological ring. The Summary of Results was a section that collected the Theory of
Éléments_de_mathématique
Aerodynamic condition related to helicopter flight
falls into a new topological state of the surrounding flow field, induced by its own downwash, and suddenly loses lift. Since vortex rings are a surprisingly
Vortex_ring_state
Tool to track locally defined data attached to the open sets of a topological space
systematically tracking data (such as sets, abelian groups, rings) attached to the open sets of a topological space and defined locally with regard to them. For
Sheaf_(mathematics)
In mathematics, Topological Hochschild homology is a topological refinement of Hochschild homology which rectifies some technical issues with computations
Topological Hochschild homology
Topological_Hochschild_homology
Type of mathematical space
the cover containing it. The corresponding topological property is used to define compactness: a topological space is compact if every open cover has a
Compact_space
Mathematical result in differential geometry
dimension of the space of solutions) is equal to the topological index (defined in terms of some topological data). It includes many other theorems, such as
Atiyah–Singer_index_theorem
Subset (often algebraic set) that is not the union of subsets of the same nature
reformulated in purely topological terms, using the Zariski topology, for which the closed sets are the algebraic subsets: A topological space is irreducible
Irreducible_component
coefficient ring. The spectrum of topological modular forms is constructed as the global sections of a sheaf of E-infinity ring spectra on the moduli stack
Topological_modular_forms
Ring without nonzero zero divisors
of commutative rings: a ring R is an integral domain if and only if it is reduced and its spectrum Spec R is an irreducible topological space. The first
Domain_(ring_theory)
Hungarian and American mathematician and physicist (1903–1957)
defining locally convex spaces and topological vector spaces for the first time. In addition several other topological properties he defined at the time
John_von_Neumann
Mathematical set with some added structure
linear and topological structures underlie the linear topological space (in other words, topological vector space) structure. A linear topological space is
Space_(mathematics)
Doughnut-shaped surface of revolution
topology, a torus is any topological space that is homeomorphic to a torus. The surface of a coffee cup and a doughnut are both topological tori with genus one
Torus
Set of a ring's prime ideals
One can thus view the topological space Spec ( R ) {\displaystyle \operatorname {Spec} (R)} as an "enrichment" of the topological space A {\displaystyle
Spectrum_of_a_ring
redirect targets Ordered topological vector space Ordered vector space – Vector space with a partial order Partially ordered ring – Ring with a compatible partial
Ordered_ring
extension of a regular local ring. Zariski Named after Oscar Zariski 1. A Zariski ring is a complete Noetherian topological ring with a basis of neighborhoods
Glossary of commutative algebra
Glossary_of_commutative_algebra
Branch of algebraic topology
In mathematics, topological K-theory is a branch of algebraic topology. It was founded to study vector bundles on topological spaces, by means of ideas
Topological_K-theory
Topology on prime ideals and algebraic varieties
making the set of prime ideals of a commutative ring (called the spectrum of the ring) a topological space. The Zariski topology allows tools from topology
Zariski_topology
targets Topological group – Group that is a topological space with continuous group operations Topological module Topological ring Topological semigroup
Complete_field
Type of topological space
is a topological space where distinct points have disjoint neighbourhoods. Of the many separation axioms that can be imposed on a topological space,
Hausdorff_space
Type of topological group in mathematics Ramification of local fields Topological abelian group Topological group – Group that is a topological space with
Locally_compact_field
This is a list of general topology topics. Topological space Topological property Open set, closed set Clopen set Closure Boundary Interior Density G-delta
List of general topology topics
List_of_general_topology_topics
Non-orientable surface with one edge
Every non-orientable surface contains a Möbius strip. As an abstract topological space, the Möbius strip can be embedded into three-dimensional Euclidean
Möbius_strip
Branch of mathematics
of a ring generated by vector bundles over a topological space or scheme. In algebraic topology, it is a cohomology theory known as topological K-theory
K-theory
Topological space that is homeomorphic to a metric space
mathematics, a metrizable space is a topological space that is homeomorphic to a metric space. That is, a topological space ( X , τ ) {\displaystyle (X,\tau
Metrizable_space
elements". Any ring with nil radical is SBI. Any Banach algebra is SBI: more generally, so is any compact topological ring. The ring of rational numbers
SBI_ring
considered separately. It is a weakening of the concept of a topological group; all topological groups are semitopological groups but the converse does not
Semitopological_group
Number of "holes" of a surface
itself on a sphere with n cross-caps or on a sphere with n/2 handles. In topological graph theory there are several definitions of the genus of a group. Arthur
Genus_(mathematics)
Topological space whose topology is fully captured by its lattice of open sets
In mathematics, a sober space is a topological space X such that every (nonempty) irreducible closed subset of X is the closure of exactly one point of
Sober_space
Number-theoretic concept
In mathematics, a profinite integer is an element of the ring (sometimes pronounced as zee-hat or zed-hat) Z ^ = lim ← Z / n Z , {\displaystyle {\widehat
Profinite_integer
Research field in deep learning
graphs, or general topological spaces like simplicial complexes and CW complexes. TDL addresses this by incorporating topological concepts to process
Topological_deep_learning
Hypothetical horizonless compact object in general relativity
In physics, a topological star (also called a topological soliton in this context) is a smooth, horizonless solution of the five-dimensional Einstein–Maxwell
Topological_star
space, because it is a topological ring — in some sense, the only topology on Z {\displaystyle \mathbb {Z} } for which it is a ring. By contrast, the Golomb
Arithmetic progression topologies
Arithmetic_progression_topologies
Region between two concentric circles
is shaped like a ring or a hardware washer. The word "annulus" is borrowed from the Latin word anulus or annulus meaning 'little ring'. The adjectival
Annulus_(mathematics)
Cohomology class
can form group ring spectra. One can define the algebraic K-theory, topological Hochschild homology, and so on, of a highly structured ring spectrum. One
Highly structured ring spectrum
Highly_structured_ring_spectrum
Algebraic structure used in topology
topology, cohomology is a way of attaching algebraic invariants to a topological space or other mathematical object that encode its properties in a way
Cohomology
French mathematician (1928–2014)
study of algebraic and topological K-theory, which explores the topological properties of objects by associating them with rings. After direct contact
Alexander_Grothendieck
Subject area in mathematics
Given a compact topological space X, the topological K-theory Ktop(X) of (real) vector bundles over X coincides with K0 of the ring of continuous real-valued
Algebraic_K-theory
Chemical structures
species with simple topological identity could also demonstrate complicated topological structures in a larger spatial scale. Topological structures, along
Topological_polymers
Equivalence class of objects sharing local properties at a point in a topological space
In mathematics, the notion of a germ of an object in/on a topological space is an equivalence class of that object and others of the same kind that captures
Germ_(mathematics)
Duality for locally compact abelian groups
considerations. A topological group is a locally compact group if the underlying topological space is locally compact and Hausdorff; a topological group is abelian
Pontryagin_duality
American mathematician
E ∞ {\displaystyle E_{\infty }} -ring spectra. This was later used in the Hopkins–Miller construction of topological modular forms. Subsequent work of
Michael_J._Hopkins
Topological space that locally resembles Euclidean space
structure, or that only its topological properties are being considered. Formally, a topological manifold is a topological space locally homeomorphic to
Manifold
Algebraic concept in measure theory, also referred to as an algebra of sets
intuitionistic logic respectively. Topological fields of sets representing these algebraic structures provide a related topological semantics for these logics
Field_of_sets
Concept in algebraic geometry
the local rings O X , x {\displaystyle {\mathcal {O}}_{X,x}} are also Noetherian rings. A Noetherian scheme is a Noetherian topological space. But the
Noetherian_scheme
Algebraic topology theory
cohomology) is a cohomology theory from algebraic topology which applies to topological spaces with a group action. It can be viewed as a common generalization
Equivariant_cohomology
Topological space in which all singleton sets are closed
every pair of topologically distinguishable points. The properties T1 and R0 are examples of separation axioms. Let X be a topological space and let x
T1_space
wave analogues of electronic topological phases studied in condensed matter physics. Similar to electronic topological insulators, the photonic counterpart
Photonic topological insulator
Photonic_topological_insulator
Space homeomorphic to some ring spectrum
In mathematics, a spectral space is a topological space that is homeomorphic to the spectrum of a commutative ring. It is sometimes also called a coherent
Spectral_space
Manifold upon which it is possible to perform calculus
a differentiable manifold is a topological manifold with a globally defined differential structure. Any topological manifold can be given a differential
Differentiable_manifold
Type of algebraic structure
graded ring of R along I; geometrically, it is the coordinate ring of the normal cone along the subvariety defined by I. Let X be a topological space,
Graded_ring
Construction of a ring of fractions
of a commutative ring a topological space equipped with the Zariski topology; this topological space is called the spectrum of the ring. In this context
Localization (commutative algebra)
Localization_(commutative_algebra)
TOPOLOGICAL RING
TOPOLOGICAL RING
Surname or Lastname
English, German, and Dutch
English, German, and Dutch : metonymic occupational name for a maker of rings (from Middle English ring, Middle High German rinc, Middle Dutch ring), either to be worn as jewelry or as component parts of chain-mail, harnesses, and other objects. In part it may also have arisen as a nickname for a wearer of a ring.Scandinavian : from ring ‘ring’, probably an ornamental name but possibly applied in the same sense as 3 or 1.German : topographic name from Middle High German, Middle Low German rink, rinc ‘circle’.Irish (eastern County Cork) : reduced Anglicized form of Gaelic Ó Rinn (see Reen).
Boy/Male
Australian, British, English, French, German, Japanese
Ring; Apple; Peace be with You
Surname or Lastname
English
English : of uncertain origin. It is first attested in Norwich in 1259 as Ringerose, and later forms show no significant variantion. Unless it had already been drastically altered by folk etymology at that early date, it is probably from Middle English ring ‘ring’ + rose ‘rose’, but if so the original meaning is far from clear.
Girl/Female
Tamil
Anamika | அநாமிகா
Ring finger, Virtuous, Free of the limitations imposed by a name
Anamika | அநாமிகா
Surname or Lastname
English, German, and Jewish (Ashkenazic)
English, German, and Jewish (Ashkenazic) : from the Middle English, German, or Yiddish elements gold + ring. As an English or German surname it is most probably a nickname for someone who wore a gold ring. As a Jewish surname it is generally an ornamental name.Scottish : habitational name from Goldring in the bailiary of Kylestewart.The name is found in England as early as 1230, when Thomas Goldring is recorded as holding property in Essex and Hertfordshire. The name was quite common in London, Sussex, and Hampshire from early times, and descendants of these bearers are now also well established in Canada. The first known bearer in Scotland is Thomas of Goldringe, who held land in Prestwick in 1511.
Surname or Lastname
English
English : regional name from the district around Middlesbrough named Cleveland ‘the land of the cliffs’, from the genitive plural (clifa) of Old English clif ‘bank’, ‘slope’ + land ‘land’.Americanized spelling of Norwegian Kleiveland or Kleveland, habitational names from any of five farmsteads in Agder and Vestlandet named with Old Norse kleif ‘rocky ascent’ or klefi ‘closet’ (an allusion to a hollow land formation) + land ‘land’.Grover Cleveland (1837–1908), 22nd and 24th president of the U.S., was the fifth child of a country Presbyterian clergyman. His father, Richard Falley Cleveland, a graduate of Yale College and of the theological seminary at Princeton, was descended from a certain Moses Cleaveland who arrived in MA in 1635.
Surname or Lastname
English
English : variant of Sewell.Samuel Sewall (1652–1730) came with his parents from Bishop Stoke, Hampshire, England, to Newbury, MA, as a nine-year-old boy. In 1676 he married Hannah Hull, a wealthy heiress, and in 1681 he was appointed printer to the Council in Boston. He served as a judge in the infamous Salem witchcraft trials of 1692—the only one of the judges to admit publicly that he had been wrong. In 1700 he published The Selling of Joseph, which argues that all men are created equal and presents theological arguments against slavery.
Surname or Lastname
English
English : from the Old English personal name Hringwulf.German : from a short form of a Germanic personal name based on hring ‘ring’.German : metonymic occupational name for a ring maker (see Ringler).German : altered spelling of Ringel, an Old Prussian personal name.
Surname or Lastname
English
English : variant of Kestel.German : from Middle High German kezzel ‘kettle’, ‘cauldron’, hence a metonymic occupational name for a maker of copper cooking vessels, or alternatively a topographic and habitational name, from the same word in the sense ‘(ring-shaped) hollow’.Dutch and Belgian : habitational name from any of the places so named in the Belgian provinces of Antwerp and Limburg or the Dutch province of North Brabant.
Surname or Lastname
English and German
English and German : variant of Ring 1.Perhaps a Rhenish short form of the Latin personal name Quirinus.
Surname or Lastname
English
English : patronymic from Dear 1.German : probably a variant of Döring (see Doering).
Boy/Male
English
Ring.
Girl/Female
Tamil
Anumika | அநà¯à®‚மிகாÂ
Ring finger
Anumika | அநà¯à®‚மிகாÂ
Surname or Lastname
English
English : habitational name from places in Cumbria, Lincolnshire, and Northamptonshire. The first gets its name from Old English HaferingtÅ«n ‘settlement (Old English tÅ«n) associated with someone called Hæfer’, a byname meaning ‘he-goat’. The second probably meant ‘settlement (Old English tÅ«n) of someone called Hæring’. Alternatively, the first element may have been Old English hæring ‘stony place’ or hÄring ‘gray wood’. The last, recorded in Domesday Book as Arintone and in 1184 as Hederingeton, is most probably named with an unattested Old English personal name, Heathuhere.Irish (County Kerry and the West) : adopted as an Anglicized form of Gaelic Ó hArrachtáin ‘descendant of Arrachtán’, a personal name from a diminutive of arrachtach ‘mighty’, ‘powerful’.Irish (County Kerry) : adopted as an Anglicized form of Gaelic Ó hIongardail, later Ó hUrdáil, ‘descendant of Iongardal’.Irish : reduced Anglicized form of Gaelic Ó hOireachtaigh ‘descendant of Oireachtach’, a byname meaning ‘member of the assembly’ or ‘frequenting assemblies’.
Surname or Lastname
English and French
English and French : from a medieval personal name, ultimately from Greek Basileios ‘royal’. The name was borne by a 4th-century bishop of Caesarea in Cappadocia, regarded as one of the four Fathers of the Eastern Church; he wrote important theological works and established a rule for religious orders of monks. Various other saints are also known under these and cognate names. The popularity of Vasili as a Russian personal name is largely due to the fact that this was the ecclesiastical name of St. Vladimir (956–1015), Prince of Kiev, who was chiefly responsible for the introduction of Christianity to Russia. As an American surname, this has also absorbed some Greek, Russian, and other derivatives of Greek Vasili.
Surname or Lastname
English
English : habitational name from places in Oxfordshire and West Sussex named Goring, from Old English GÄringas ‘people of GÄra’, a short form of the various compound names with the first element gÄr ‘spear’.German (Göring) : see Goering.
Surname or Lastname
English (of Norman origin)
English (of Norman origin) : from the Old French personal name Reinger, Rainger, composed of the Germanic elements ragin ‘advice’, ‘counsel’ + gÄr, gÄ“r ‘spear’, ‘lance’.English : occupational name for a maker of rings (see Ring 1) or for a bell ringer, from Middle English ring(en) ‘to ring’, Old English hringan.German : occupational name for a turner, someone who made objects by rotating them on a lathe or wheel.
Surname or Lastname
English
English : variant of Hurst.Jewish (Ashkenazic) : ornamental name or nickname from Polish herszt ‘ringleader’, ‘chieftain’.
Boy/Male
Tamil
Sitadevi | ஸீதாதேவீ
Mudrapradayaka deliverer of the ring of Sita
Sitadevi | ஸீதாதேவீ
Surname or Lastname
English
English : patronymic from Dear 1.German (Döring) : see Doering.
TOPOLOGICAL RING
TOPOLOGICAL RING
Girl/Female
Arabic, Muslim
To Walk with Pride
Boy/Male
Hindu
Boy/Male
Muslim
Hawk, Messenger, Herald
Boy/Male
Muslim
Trained
Female
English
Anglicized form of Hebrew Tsiyba, ZIBA means "a plant." In the bible, this is the name of a servant of Saul.
Surname or Lastname
English
English : variant spelling of Joyce. See also Choice.
Boy/Male
Indian
The causer of death
Boy/Male
Australian, Chinese, Czech, Slovenia
War; Battle
Female
Dutch
, bitter.
Surname or Lastname
English and Dutch
English and Dutch : nickname for an idle person, from Middle Dutch slac, Middle English slack, ‘lazy’, ‘careless’.English : topographic name from northern Middle English slack ‘shallow valley’ (Old Norse slakki), or a habitational name from one of the places named with this word, for example near Stainland and near Hebden Bridge in West Yorkshire.Scottish (Dumfriesshire) : habitational name, maybe from Slake or Slack in Roberton, Roxburghshire (now part of Borders region).It may also be an Americanized spelling of Slovenian Slak, a nickname from slak ‘bindweed’.
TOPOLOGICAL RING
TOPOLOGICAL RING
TOPOLOGICAL RING
TOPOLOGICAL RING
TOPOLOGICAL RING
a.
Of or pertaining to nosology.
a.
Characterized by tropes; varied by tropes; tropical.
n.
A student in a theological seminary.
a.
Of or pertaining to pomology.
a.
Of or pertaining to theology, or the science of God and of divine things; as, a theological treatise.
a.
Of or pertaining to oology.
a.
Relating to a horologe, or to horology.
a.
Of or pertaining to noology.
a.
Pertaining to doxology; giving praise to God.
a.
Of or pertaining to zoology, or the science of animals.
v. i.
To introduce innovations in doctrine, esp. in theological doctrine.
v. t.
To use in a tropological sense, as a word; to make a trope of.
a.
Of or pertaining tootology.
a.
Alt. of Posological
adv.
In a zoological manner; according to the principles of zoology.
a.
Of or pertaining to orology.
a.
Alt. of Tropological
a.
Pertaining to homology; having a structural affinity proceeding from, or base upon, that kind of relation termed homology.
a.
Pertaining to posology.
a.
Theological.