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Aut2023: MAS4105 3247 (14608)
Linear Algebra 1
MTWF6[12:50-13:40]
Matherly Hall 7
(Abstract) Linear Algebra
Our LinA TA is Mr. Aaron Thrasher.
The various Math czars who help out.
| Computer&Projector |
CP-Probs |
Time |
Memory/Telepathy |
Blackboard |
| Dawson/Jake |
Allan |
Pietro/Katie |
Katie |
Xavier/everybody |
Optional:
LinA IOP (Individual Optional Project)
...is due,
slid
u
n
d
e
r
my office door (Little Hall 402, Northeast corner)
no later than
[2PM, Thursday, 07Dec2023].
This IOP
must be carefully typed,
but diagrams may be hand-drawn.
At all times have a paper copy you can hand-in; I do
NOT accept
electronic versions.
Print out a copy each day, so that you always have the latest version to
hand-in; this, in case your printer or computer fails.
(You are too old for My dog ate my homework.
)
Please follow the guidelines on the
Checklist 
(pdf, 3pages) to earn full credit.
In all of my courses,
attendance is absolutely required
(excepting illness and religious holidays).
In the unfortunate event that you miss a class, you are
responsible to get all
Notes / Announcements / TheWholeNineYards
from a classmate, or several.
All my classes have a
substantial
class-participation grade.
Vector spaces
-
Autumn2023: LinA syllabus
- Three matrices: Same Char-Poly but different Min-Polys.
- Current:
Have read the beginning of
w:Characteristic
polynomial.
The defn we'll use is in the
Cayley-Hamilton pamphlet (pdf).
An example of
computing an eigenbasis.
If time permits, we will discuss
Jordan Canonical Form (JCF),
In particular,
I would like you to know the stmt and proof of the
Block Upper-Triangular--matrix Lemma
[just
page 4
in JCF].
- Prof. K's LinAlg-Notes (pdf)
Linear Recurrence
using matrices (pdf)
solves a fibonacci-like recurrence; it makes a cryptic
reference to Jordan Canonical Form.
Its method is to attempt to diagonalize a matrix.
Examples:
a 2x2 diagonalizable matrix. And
a 3x3 matrix with only 2 dimenions of eigenvalues.
Also
powers of a diagonalizable 4x4 matrix.
Finally, here are
examples showing Trace and char-poly are preserved under conjugation.
- Our wholly expialadocious
Class-S
is available for cogitation and edification.
- An overview of the
Sign of a permutation.
Available are
more extensive notes on permutations,
Here we explore
N×N determinants (txt) and
an application of
Cramer's “Rule”, i.e Theorem (txt).
Abstract properties of determinants.
Work through
w:Determinant.
Please read the first few paragraphs of:
w:Bilinear_map
and
w:Bilinear_form,
as well as
w:Multilinear_map
and
w:Alternating_multilinear_map.
- A
proof of the Rank-Nullity Theorem (pdf),
and also a
proof that RREF is unique (pdf),
stated appropriately.
- Voila!
Examples of
RREF over Rationals
and
RREF over Zedp (plus Change-of-Basis)
and
RREF over Complex numbers.
- Example: Computing a matrix-inverse
- Examples on
obtaining a basis for column-span,
and
Change-of-Basis (Maple).
- Computing bases for the LeftNullspace,
ColumnSpan and RowSpan of a 4x7 matrix.
Also available is a
Gauss-Jordan calculator.
- Gaussian elimination Animation
- Future:
Rotation-matrix cartoon:
w:The Circle group
and
w:Rotations in 3D space.
Do we like
w:Rotations in N-dim'al space?
The
delightful
Class-R
is online for your soln-posting pleasure.
The
Euclidean algorithm can be presented in table-form; I
call this form the
Lightning-bolt algorithm (pdf),
because the update-rule looks like a lightning-bolt (used thrice).
Here is a
practice sheet for LBolt (pdf).
- What is Gambling doing here?.
Aha! now we know...
- BingChat —a Cautionary Tale...
- Past: the
Math-Greek alphabet (pdf).
This demo page
illustrates these linear transformations:
Dilations, Rotations and Shears.
It also shows the affine transformation of Translation.
Please peruse the Wikipedia pages that define
Group, Ring, Field
as well as Set builder notation.
General Info
Our LinA class has a LISTSERV archive. I will email to each
student how to post-to and read-from the Archive.
(The archive is at a private URL, only for the use of the folks
in our class.)
Quantifiers
∀ and
∃
(“for all”
and
“there exists”)
are like nitroglycerin, in that one little mis-step leads to the whole
thing blowing up in your face.
There is no partial credit when it comes to Explosives and Quantifiers.
-JLF King
Linear Algebra (5th edition).
| Author: | Friedberg, Insel, Spence |
ISBN: | 978-0134860244 |
| Year: | 2019 |
Publisher: | Pearson |
It is available
from the publisher and from
online booksellers.
Michael's Matrices
First, some Lisp code...
(defun Num-GL-matrices (P N &aux VS-Card NumMatrices NumInvertible Prob)
"Our vectorspace, VS, is N-dim'al over Zed_P, where P is prime.
Our NxN matrices are points in VS of dimension P²."
(setq
VS-Card (expt P N)
NumMatrices (expt VS-Card N) ; # of ordered lists of N vectors; a matrix.
NumInvertible (iter
(for kMO :below N)
(for p^kMO :first 1 :then p^k)
(for p^k = (* p^kMO p))
(multiply (- VS-Card p^kMO))
) )
(setq Prob (/ NumInvertible NumMatrices))
(when (> *JK-PRINT* 5)
(format t "~%Prob(GL_~D(Zed_~D)) = ~A ≈≈ ~F.~%" N P Prob Prob)
(format t "~%Prob-of-singular = ~A ≈≈ ~:*~F.~%" (- 1 Prob))
)
(list NumInvertible Prob) ;; Return-value
)
... along with some runs:
% (Num-GL-matrices 17 3)
Prob(GL_3(Zed_17)) = 22634496/24137569 ≈≈ 0.9377289.
Prob-of-singular = 1503073/24137569 ≈≈ 0.0622711.
(111203278848 22634496/24137569)
% (iter (for N :from 1 :to 12) (format t "~%~2D: ~101D" N (first (Num-GL-matrices 5 N))))
1: 4
2: 480
3: 1488000
4: 116064000000
5: 226614960000000000
6: 11064475422000000000000000
7: 13506266841692625000000000000000000
8: 412177498341354683437500000000000000000000000
9: 314466314168148447161790527343750000000000000000000000000
10: 5997968329750020529620924720314025878906250000000000000000000000000000
11: 2860054114776434486551525246466392329633235931396484375000000000000000000000000000000
12: 34094501770277653127041454190627871991478120675310492515563964843750000000000000000000000000000000000
See OEIS A053292, for Zed_5.
Available are OEIS numbers for small primes.
The probability of a non-singular N×N over Zed_P is
Prob_P(N) = [1 - 1/P]·[1 - 1/P2]·[1 - 1/P3]···[1 - 1/PN].
Hence map
n ↦ Prob_P(n)
is a strictly-decreasing fnc (but with positive limit, by Borel-Cantelli) .
Related links
An example, for those
who like to play with online Wolfram/Alpha.
This is related to the important
Euler function
(not Euler's totient fnc)
which is discussed in
Pentagonal number theorem.
[In UF's math dept., Profs. Alladi, Berkovich and Garvan
are experts in q-series, if you are interested in learning more about it.]
Our Teaching Page
has important information for my students.
(It has the
Notes, Exams and Links
from all of my previous courses.)
The Teaching Page has my schedule,
LOR guidelines,
and Usually Useful Pamphlets.
One of them is the
Further information is at our
class-archive URL
(I email this private URL directly to students).
LinA Assignment for Add/Drop week
JK Home page
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