On conjugacy classes of finite groups
Date of Publication
1999
Document Type
Bachelor's Thesis
Degree Name
Bachelor of Science in Mathematics
College
College of Science
Department/Unit
Mathematics and Statistics
Abstract/Summary
This research consolidates two papers on the number s of conjugacy classes of a finite group G. Its central feature consists of two important theorems namely: (1) Let m greater than or equal to 2 be an integer. If each prime divisor of /G/ is congruent to 1 (mod m), then /G/ = s (mod2m2).
(11) If the order of a group G is not divisible by 3, then /G/ = s (mod 3).
Abstract Format
html
Language
English
Format
Accession Number
TU09236
Shelf Location
Archives, The Learning Commons, 12F, Henry Sy Sr. Hall
Physical Description
73 leaves
Recommended Citation
Lazatin, V. V., & Tingzon, M. E. (1999). On conjugacy classes of finite groups. Retrieved from https://animorepository.dlsu.edu.ph/etd_bachelors/16568