Item Successfully Added to Cart
An error was encountered while trying to add the item to the cart. Please try again.
OK
Please make all selections above before adding to cart
OK
Share this page via the icons above, or by copying the link below:
Copy To Clipboard
Successfully Copied!
Nineteen Papers on Algebraic Semigroups
 
Nineteen Papers on Algebraic Semigroups
Hardcover ISBN:  978-0-8218-3115-1
Product Code:  TRANS2/139
List Price: $175.00
MAA Member Price: $157.50
AMS Member Price: $140.00
eBook ISBN:  978-1-4704-3350-5
Product Code:  TRANS2/139.E
List Price: $165.00
Individual Price: $132.00
Hardcover ISBN:  978-0-8218-3115-1
eBook: ISBN:  978-1-4704-3350-5
Product Code:  TRANS2/139.B
List Price: $340.00 $257.50
MAA Member Price: $231.75
AMS Member Price: $206.00
Nineteen Papers on Algebraic Semigroups
Click above image for expanded view
Nineteen Papers on Algebraic Semigroups
Hardcover ISBN:  978-0-8218-3115-1
Product Code:  TRANS2/139
List Price: $175.00
MAA Member Price: $157.50
AMS Member Price: $140.00
eBook ISBN:  978-1-4704-3350-5
Product Code:  TRANS2/139.E
List Price: $165.00
Individual Price: $132.00
Hardcover ISBN:  978-0-8218-3115-1
eBook ISBN:  978-1-4704-3350-5
Product Code:  TRANS2/139.B
List Price: $340.00 $257.50
MAA Member Price: $231.75
AMS Member Price: $206.00
  • Book Details
     
     
    American Mathematical Society Translations - Series 2
    Volume: 1391988; 210 pp
    MSC: Primary 20; Secondary 94

    This volume contains papers selected by leading specialists in algebraic semigroups in the U.S., the United Kingdom, and Australia. Many of the papers strongly influenced the development of algebraic semigroups, but most were virtually unavailable outside the U.S.S.R. Written by some of the most prominent Soviet researchers in the field, the papers have a particular emphasis on semigroups of transformations. Boris Schein of the University of Arkansas is the translator.

  • Table of Contents
     
     
    • Articles
    • A. Ya. Aĭzenshtat — Homomorphisms of semigroups of endomorphisms of ordered sets
    • A. Ya. Aĭzenshtat — On ideals of semigroups of endomorphisms
    • A. Ya. Aĭzenshtat — Subgroups of semigroups of endomorphisms of ordered sets
    • A. Ya. Aĭzenshtat — Regular semigroups of endomorphisms of ordered sets
    • A. Ya. Aĭzenshtat — On certain semigroups of endomorphisms determining the order in a set
    • A. E. Evseev — A survey of partial groupoids
    • A. E. Evseev and N. E. Podran — Semigroups of transformations of a finite set generated by idempotents with given projection characteristics
    • A. E. Evseev and N. E. Podran — Semigroups of transformations generated by idempotents with a given defect
    • I. S. Ponizovskiĭ — Transitive representations by transformations of semigroups of a certain class
    • B. M. Shaĭn — Embedding semigroups in inverse semigroups
    • B. M. Shaĭn — On certain classes of semigroups of binary relations
    • B. M. Shaĭn — On certain comitants of semigroups of binary relations
    • B. M. Shaĭn — An idempotent semigroup is determined by its pseudogroup of local automorphisms
    • B. M. Shaĭn — Semigroups for which every transitive representation by functions is a representation by invertible functions
    • B. M. Shaĭn — Inverse semigroups that do not admit representations by partial transformations of their proper subsets
    • É. G. Shutov — Homomorphisms of the semigroup of all partial transformations
    • É. G. Shutov — On a certain semigroup of one-to-one transformations
    • É. G. Shutov — Embeddings of semigroups
    • Yu. M. Vazhenin — Inverse codes
  • Requests
     
     
    Review Copy – for publishers of book reviews
    Permission – for use of book, eBook, or Journal content
    Accessibility – to request an alternate format of an AMS title
Volume: 1391988; 210 pp
MSC: Primary 20; Secondary 94

This volume contains papers selected by leading specialists in algebraic semigroups in the U.S., the United Kingdom, and Australia. Many of the papers strongly influenced the development of algebraic semigroups, but most were virtually unavailable outside the U.S.S.R. Written by some of the most prominent Soviet researchers in the field, the papers have a particular emphasis on semigroups of transformations. Boris Schein of the University of Arkansas is the translator.

  • Articles
  • A. Ya. Aĭzenshtat — Homomorphisms of semigroups of endomorphisms of ordered sets
  • A. Ya. Aĭzenshtat — On ideals of semigroups of endomorphisms
  • A. Ya. Aĭzenshtat — Subgroups of semigroups of endomorphisms of ordered sets
  • A. Ya. Aĭzenshtat — Regular semigroups of endomorphisms of ordered sets
  • A. Ya. Aĭzenshtat — On certain semigroups of endomorphisms determining the order in a set
  • A. E. Evseev — A survey of partial groupoids
  • A. E. Evseev and N. E. Podran — Semigroups of transformations of a finite set generated by idempotents with given projection characteristics
  • A. E. Evseev and N. E. Podran — Semigroups of transformations generated by idempotents with a given defect
  • I. S. Ponizovskiĭ — Transitive representations by transformations of semigroups of a certain class
  • B. M. Shaĭn — Embedding semigroups in inverse semigroups
  • B. M. Shaĭn — On certain classes of semigroups of binary relations
  • B. M. Shaĭn — On certain comitants of semigroups of binary relations
  • B. M. Shaĭn — An idempotent semigroup is determined by its pseudogroup of local automorphisms
  • B. M. Shaĭn — Semigroups for which every transitive representation by functions is a representation by invertible functions
  • B. M. Shaĭn — Inverse semigroups that do not admit representations by partial transformations of their proper subsets
  • É. G. Shutov — Homomorphisms of the semigroup of all partial transformations
  • É. G. Shutov — On a certain semigroup of one-to-one transformations
  • É. G. Shutov — Embeddings of semigroups
  • Yu. M. Vazhenin — Inverse codes
Review Copy – for publishers of book reviews
Permission – for use of book, eBook, or Journal content
Accessibility – to request an alternate format of an AMS title
Please select which format for which you are requesting permissions.