Explore the foundations of maxel algebra in this 35-minute lecture from the Insights into Mathematics series. Delve into the theory of matrices and their relationship to maxels, focusing on idempotent diagonal maxels associated with sets of natural numbers. Examine the concept of multiplication as restriction and engage in a precise discussion on defining sets of natural numbers. Investigate partial identity maxels, idempotent properties, and the behavior of maxels when multiplied by e_J. Learn about conditions for e_J to act as an identity and explore key propositions in this field. Gain a deeper understanding of data structures in mathematics through this comprehensive exploration of maxel theory.
Maxel Algebra I - Data Structures in Mathematics Math Foundations
Insights into Mathematics via YouTube
Overview
Syllabus
Intro to a new theory of matrices
Some special diagonal maxels
Multiplication as restriction
Sets of natural numbers
Things that are not sets of numbers
Partial identity maxels
Identity maxels are idempotent
Multiplying a maxel by e_J left or right
When does e_J act as an identity?
Propositions
Taught by
Insights into Mathematics
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