uniserial การใช้

• This extension involves the so-called quasismall uniserial modules.
• Uniserial modules are uniform, and uniform modules are necessarily directly indecomposable.
• Chambers are uniserial, arranged in a single row, or line.
• The early stage is triserial, later abruptly becoming uniserial; cross section triagular.
• Being uniserial is preserved for quotients of rings and modules, but never for products.
• Uniserial HSB, present in most living rodents, consist of a single layer of prisms.
• Since rings with unity always have a maximal right ideal, a right uniserial ring is necessarily local.
• Adult males have large, uniserial tubercles on the dorsal surface of pectoral fins rays 2-10.
• This ring is always serial, and is uniserial when " n " is a prime power.
• This result, due to Facchini, has been extended to infinite direct sums of uniserial modules by PY
  韍oda in 2006.
• Test are commonly planospiral or trochospiral but may be uniserial to multiserial and are of secreted hyaline ( glassy ) calcite.
• Premaxillary and mandibular teeth uniserial or irregular, occasionally with a few strong inner teeth ( Sublette et al . 1990 ).
• In form, rotaliid tests are typically enrolled, but maybe reduced to biserial or uniserial, or may be encrusting with proliferated chambers.
• In rodents, HSB are usually present in the PI . Three types of HSB can be separated pauciserial, uniserial, and multiserial.
• Every valuation ring is a uniserial ring, and all Artinian principal ideal rings are serial rings, as is illustrated by semisimple rings.
• For this reason, " uniserial " was used to mean " Artinian principal ideal ring " even as recently as the 1970s.
• Because of this historical precedent, some authors include the Artinian condition or finite composition length condition in their definitions of uniserial modules and rings.
• Expanding on K鰐he's work, Tadashi Nakayama used the term " generalized uniserial ring " to refer to an Artinian serial ring.
• Following the common ring theoretic convention, if a left / right dependent condition is given without mention of a side ( for example, uniserial, serial, unital.
• As noted before, a finitely generated right ideal can be generated by a single element, and so right uniserial rings are "'right B閦out "'rings.