Other available formats:
Looking for an examination copy?
This title is not currently available for examination. However, if you are interested in the title for your course we can consider offering an examination copy. To register your interest please contact firstname.lastname@example.org providing details of the course you are teaching.
Originally published in 1925, this book forms part of a three-volume work created to expand upon the content of a series of lectures delivered at the University of Calcutta during the winter of 1909–10. The chief feature of all three volumes is that they deal with rectangular matrices and determinoids as distinguished from square matrices and determinants, the determinoid of a rectangular matrix being related to it in the same way as a determinant is related to a square matrix. An attempt is made to set forth a complete and consistent theory or calculus of rectangular matrices and determinoids. The third volume was originally intended to be divided into two parts, but the second section was never published. The part that made it into print deals chiefly with applications to vector analysis and the theory of invariants.
Not yet reviewed
Be the first to review
Review was not posted due to profanity×
- Date Published: June 2013
- format: Paperback
- isbn: 9781107414266
- length: 700 pages
- dimensions: 254 x 178 x 36 mm
- weight: 1.2kg
- availability: Available
Table of Contents
20. The irresoluble and irreducible factors of rational integral functions
21. Resultants and eliminants of rational integral functions and equations
22. Symmetric functions of the elements of similar sequences
23. The potent divisors of a rational integral functional matrix
24. Equipotent transformations of rational integral functional matrices
25. Rational integral functions of a square matrix
26. Equimutant transformations of a square matrix whose elements are constants
28. Commutants of commutants
29. Invariant transformands
Appendix A. Rational integral functions of a matrix which is not square
Appendix B. Some properties of a standardised general compound slope M
Appendix C. Weierstrauss's and Kronecker's reductions of a matrix which is homogeneous and linear in two scalar variables or linear in a single scalar variable
Sorry, this resource is locked
Are you sure you want to delete your account?
This cannot be undone.
Thank you for your feedback which will help us improve our service.
If you requested a response, we will make sure to get back to you shortly.×