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Toda Gorouzaemon Nyudo Seigen
Toda may refer to: *Toda (surname), a Japanese surname *Queen Toda of Navarre (fl. 885–970) *Toda people *Toda language *Toda Embroidery *Toda lattice *Toda field theory *Oscillator Toda *Toda, Saitama, Japan * TODA Racing, who tune and race vehicles in various racing series, and additionally sell aftermarket parts to automotive enthusiasts *Toda bracket *Toda fibration *Takeoff Distance Available, see Runway#Declared distances *Theatre of Digital Art The Theatre of Digital Art (ToDA) is an exhibition space for digital art and a venue for digital theatre located at Souk Madinat in Jumeirah, Dubai, United Arab Emirates. ToDA was announced in 2019, providing a 1,800 m2 immersive art space, with s ..., Dubai, UAE {{Disambiguation Language and nationality disambiguation pages ...
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Toda (surname)
Toda (written: 戸田) is a Japanese surname. Notable people with the surname include: *Erika Toda (born 1988), Japanese actress *Hiroshi Toda (born 1928), Japanese mathematician *Jōsei Toda (1900–1958), educator and peace activist *Toda Katsushige (1557–1600), Japanese ''daimyō'' *Toda Kazuaki (1542–1604), Japanese samurai *Kazuyuki Toda (born 1977), Japanese football player *Keiko Toda (born 1957), Japanese actress *Morikazu Toda (1917–2010), Japanese physicist *Naho Toda (born 1974), Japanese actress *Natsuko Toda (born 1936), subtitles translator *, Japanese speed skater *Toda Seigen (fl. 1519–1590), Japanese swordsman *Seinosuke Toda (born 1959), computer scientist *Tomojiro Toda (1946–2016), sumo wrestler See also

*Tola (name) *Tona (name) *Tonda (name) *Tova {{surname Japanese-language surnames ...
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Toda Of Navarre
Toda Aznárez (Basque: ''Tota Aznar''; d. 15 October 958), known as Toda of Pamplona, was queen of Pamplona by her marriage to Sancho I. She ruled the kingdom as regent during the minority of her son García Sánchez I from 931. She was herself descended from the previous royal dynasty, Aritza. Family Toda was the daughter of Aznar Sánchez, lord of Larraun, paternal grandson of King García Íñiguez of Pamplona, while her mother Onneca Fortúnez was a daughter of King Fortún Garcés. Thus, Toda was a descendant of the Aritza dynasty of Navarrese monarchs. Toda was an aunt or cousin of Caliph Abd-al-Rahman III. Toda was married to King Sancho I of Pamplona, with whom she had the following children: * Urraca, queen of León from 931 until 951 as the wife of Ramiro II * Oneca, queen of León from 926 until 931 as the wife of Alfonso IV * Sancha, countess of Castile as the wife of Fernán González * Velasquita, married first to Count Munio Vélaz of Álava, then to Galin ...
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Toda People
Toda people are a Dravidian ethnic group who live in the Indian states of Tamil Nadu. Before the 18th century and British colonisation, the Toda coexisted locally with other ethnic communities, including the Kota, Badaga and Kurumba, in a loose caste-like society, in which the Toda were the top ranking. During the 20th century, the Toda population has hovered in the range 700 to 900. Although an insignificant fraction of the large population of India, since the early 19th century the Toda have attracted "a most disproportionate amount of attention because of their ethnological aberrancy" and "their unlikeness to their neighbours in appearance, manners, and customs". The study of their culture by anthropologists and linguists proved significant in developing the fields of social anthropology and ethnomusicology. The Toda traditionally live in settlements called ', consisting of three to seven small thatched houses, constructed in the shape of half-barrels and located across ...
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Toda Language
Toda is a Dravidian language noted for its many fricatives and trills. It is spoken by the Toda people, a population of about one thousand who live in the Nilgiri Hills of southern India. The Toda language originated from Toda-Kota subgroup of South Dravidian. Phonemic inventory Vowels For a Dravidian language, Toda's sixteen vowels is an unusually large number. There are eight vowel qualities, each of which may occur long or short. There is little difference in quality between the long and short vowels, except for , which occurs as when short and as when long. Consonants Toda has an unusually large number of fricatives and trills. Its seven places of articulation are the most for any Dravidian language. The voiceless laterals are true fricatives, not voiceless approximants; the retroflex lateral is highly unusual among the world's languages.Spajić et al. (1994) Voiceless fricatives are allophonically voiced intervocalically in Toda. There are also the invariably vo ...
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Toda Embroidery
The Toda Embroidery, also locally known as "pukhoor", is an art work among the Toda pastoral people of Nilgiris, in Tamil Nadu, made exclusively by their women. The embroidery, which has a fine finish, appears like a woven cloth but is made with use of red and black threads with a white cotton cloth background. Both sides of the embroidered fabric are usable and the Toda people are proud of this heritage. Both men and women adorn themselves with the embroidered cloaks and shawls. This handicraft product is listed as a geographically tagged product and is protected under the Geographical Indications of Goods (Registration & Protection) Act (GI Act) 1999 of the Government of India. It was registered by the Controller General of Patents Designs and Trademarks under the title "Toda Embroidery" and recorded at GI Application number 135 under Class 24, Class 25, and Class 26 as Textiles and Textile Goods, clothing, and Embroidery, respectively, in March 2013. A certificate of the GI ...
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Toda Lattice
The Toda lattice, introduced by , is a simple model for a one-dimensional crystal in solid state physics. It is famous because it is one of the earliest examples of a non-linear completely integrable system. It is given by a chain of particles with nearest neighbor interaction, described by the Hamiltonian :\begin H(p,q) &= \sum_ \left(\frac +V(q(n+1,t)-q(n,t))\right) \end and the equations of motion :\begin \frac p(n,t) &= -\frac = e^ - e^, \\ \frac q(n,t) &= \frac = p(n,t), \end where q(n,t) is the displacement of the n-th particle from its equilibrium position, and p(n,t) is its momentum (mass m=1), and the Toda potential V(r)=e^+r-1. Soliton solutions Soliton solutions are solitary waves spreading in time with no change to their shape and size and interacting with each other in a particle-like way. The general N-soliton solution of the equation is : \begin q_N(n,t)=q_+ + \log \frac , \end where :C_N(n,t)=\Bigg(\frac\Bigg)_, with :\gamma_j(n,t)=\gamma_j\,e^ where \kappa ...
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Toda Field Theory
In mathematics and physics, specifically the study of field theory and partial differential equations, a Toda field theory, named after Morikazu Toda, is specified by a choice of Kac–Moody algebra and a specific Lagrangian. Fixing the Kac–Moody algebra to have rank r, that is, the Cartan subalgebra of the algebra has dimension r, the Lagrangian can be written \mathcal=\frac\left\langle \partial_\mu \phi, \partial^\mu \phi \right\rangle -\frac\sum_^r n_i \exp(\beta \langle\alpha_i, \phi\rangle). The background spacetime is 2-dimensional Minkowski space, with space-like coordinate x and timelike coordinate t. Greek indices indicate spacetime coordinates. For some choice of root basis, \alpha_i is the ith simple root. This provides a basis for the Cartan subalgebra, allowing it to be identified with \mathbb^r. Then the field content is a collection of r scalar fields \phi_i, which are scalar in the sense that they transform trivially under Lorentz transformations of the under ...
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Oscillator Toda
In physics, the Toda oscillator is a special kind of nonlinear oscillator. It represents a chain of particles with exponential potential interaction between neighbors. These concepts are named after Morikazu Toda. The Toda oscillator is used as a simple model to understand the phenomenon of self-pulsation, which is a quasi-periodic pulsation of the output intensity of a solid-state laser in the transient regime. Definition The Toda oscillator is a dynamical system of any origin, which can be described with dependent coordinate ~x~ and independent coordinate ~z~, characterized in that the evolution along independent coordinate ~z~ can be approximated with equation : \frac+ D(x)\frac+ \Phi'(x) =0, where ~D(x)=u e^+v~, ~\Phi(x)=e^x-x-1~ and prime denotes the derivative. Physical meaning The independent coordinate ~z~ has sense of time. Indeed, it may be proportional to time ~t~ with some relation like ~z=t/t_0~, where ~t_0~ is constant. The derivative ~\dot x=\frac may ...
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Toda, Saitama
is a city located in Saitama Prefecture, Japan. , the city had an estimated population of 140,902 in 66,765 households and a population density of 7700 persons per km². The total area of the city is . Geography Toda is located in the flat lowlands of far southeastern Saitama Prefecture, separated from Tokyo by the Arakawa River. The Sasame River also flows through the city before joining the Arakawa. Surrounding municipalities * Saitama Prefecture ** Saitama ** Asaka ** Kawaguchi ** Wakō ** Warabi * Tokyo Metropolis ** Itabashi ** Kita Climate Toda has a humid subtropical climate (Köppen ''Cfa'') characterized by warm summers and cool winters with light to no snowfall. The average annual temperature in Toda is 14.8 °C. The average annual rainfall is 1482 mm with September as the wettest month. The temperatures are highest on average in August, at around 26.6 °C, and lowest in January, at around 3.2 °C. Demographics Per Japanese census data, the ...
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Toda Bracket
In mathematics, the Toda bracket is an operation on homotopy classes of maps, in particular on homotopy groups of spheres, named after Hiroshi Toda, who defined them and used them to compute homotopy groups of spheres in . Definition See or for more information. Suppose that :W\stackrel X\stackrel Y\stackrel Z is a sequence of maps between spaces, such that the compositions g\circ f and h\circ g are both nullhomotopic. Given a space A, let CA denote the cone of A. Then we get a (non-unique) map : F\colon CW\to Y induced by a homotopy from g\circ f to a trivial map, which when post-composed with h gives a map :h\circ F\colon CW\to Z. Similarly we get a non-unique map G\colon CX\to Z induced by a homotopy from h\circ g to a trivial map, which when composed with C_f\colon CW\to CX, the cone of the map f, gives another map, : G\circ C_f\colon CW\to Z. By joining together these two cones on W and the maps from them to Z, we get a map : \langle f, g, h\rangle\colon SW\to Z repr ...
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Toda Fibration
In mathematics, the EHP spectral sequence is a spectral sequence used for inductively calculating the homotopy groups of spheres localized at some prime ''p''. It is described in more detail in and . It is related to the EHP long exact sequence of ; the name "EHP" comes from the fact that George W. Whitehead named 3 of the maps of his sequence "E" (the first letter of the German word "Einhängung" meaning "suspension"), "H" (for Heinz Hopf, as this map is the second Hopf–James invariant), and "P" (related to Whitehead products). For p = 2 the spectral sequence uses some exact sequences associated to the fibration :S^n(2)\rightarrow \Omega S^(2)\rightarrow \Omega S^(2), where \Omega stands for a loop space and the (2) is localization of a topological space In mathematics, well-behaved topological spaces can be localized at primes, in a similar way to the localization of a ring at a prime. This construction was described by Dennis Sullivan in 1970 lecture notes that were finally p ...
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