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

Print

Accession Number

TU09236

Shelf Location

Archives, The Learning Commons, 12F, Henry Sy Sr. Hall

Physical Description

73 leaves

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