cyclotomy

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cyclotomy

[si-klot´ah-me]
incision of the ciliary muscle; cyclicotomy.
Miller-Keane Encyclopedia and Dictionary of Medicine, Nursing, and Allied Health, Seventh Edition. © 2003 by Saunders, an imprint of Elsevier, Inc. All rights reserved.

cy·clot·o·my

(sī-klot'ō-mē),
Operation of cutting the ciliary muscle.
[cyclo- + G. tomē, incision]
Farlex Partner Medical Dictionary © Farlex 2012

cyclotomy

(sī-klŏt′ə-mē)
n.
Surgical incision of the ciliary muscle.

cy·clot·o·my

(sī-klot'ŏ-mē)
Operation of cutting the ciliary muscle.
[cyclo- + G. tomē, incision]
Medical Dictionary for the Health Professions and Nursing © Farlex 2012
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For d [greater than or equal to] 3 and w a primitive dth root of unity,
We will call B[[??], a] the N-reduced algebra of polynomials and denote it by [B.sub.N][[??], a] if q is a primitive Nth root of unity and [??] obeys the additional relation [[??].sup.N] = 0.
The equation F([omega]) = 0 is an algebraic equation with rational coefficients in the unknown (omega); hence, if some primitive d-th root of unity satisfies it, then every primitive d-th root of unity satisfies it.
We remind the reader that if p [member of] I then we assume that p is not a root of unity.
Fix once and for all a primitive nth root of unity [zeta].
Let i be the maximal natural number such that k contains a primitive [l.sup.i]-th root of unity. Then, the image [xi] of a primitive [l.sup.i]-th root of unity under the composite map
Let [[omega].sub.d] be a primitive d-th root of unity. Then
In this paper we will always assume that q [not equal to] 1 and that q [member of] F is a primitive [l.sup.th] root of unity in a field F of characteristic zero (so necessarily l [greater than or equal to] 2).
We assume K contains a primitive [[absolute value of G].sup.2]-th root of unity. After [Is, p.186] we say (G, K, [xi]) a character triple, if K is a normal subgroup of G and [xi] is a G-invariant irreducible character of K.
In , this formula was studied in the case where q is an arbitrary root of unity, and higher order analogs of the peak algebra were obtained.
Let [xi] be a primitive m-th root of unity, and [[mu].sub.m] be the multiplicative group of m-th roots of unity.
It is known that its kernel is = {[[zeta].sub.p]} [K.sup.M.sub.q-1] (K), where [[zeta].sub.p] is a primitive p-th root of unity. This fact is a byproduct of the Milnor-Bloch-Kato conjecture (due to Suslin, cf.

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