Tuesday, March 15, 2011
Sunday, February 13, 2011
The Tao Of Campbell
Here is a polyaesthetic proportional poem titled "The Tao Of Campbell"
To understand how proportional poems work click here
Dreams are to personal myths as myth is to cultural dream.
Here is a detail of the image:
Posted by Kaz Maslanka at 10:08 PM 3 comments
Labels: Joseph Campbell, proportional poems, similar triangles poems
Sunday, February 06, 2011
Singularity (Polyaesthetic)
Here is a polyaesthetic version of the proportional poem titled "Singularity"
Here is a detail view from the piece titled "Singularity"
Posted by Kaz Maslanka at 10:48 PM 3 comments
Labels: proportional poems, similar triangles poems, singularity
Monday, January 31, 2011
Milton Babbitt Passes Away At 94
I really enjoyed Milton Babbitt's work.
Rest In Peace -
For More Information Click Here
Posted by Kaz Maslanka at 10:26 PM 0 comments
Labels: Milton Babbitt
Monday, January 17, 2011
Is Mathematical Poetry A Subset of Visual Poetry?
This is some of the comments to one of Geof Huth’s blog post reviewing Bob Grumman’s new book, really a chapbook, entitled A Preliminary Taxonomy of Poetry
Geof said, “Mathematical poems add mathematical features that visualize the poetry, so I consider them visual poems, and to have a category for flowchart poetry assumes that process symbols are textual and thus not visual. I'd argue, again, that they are not orthodox text, so these poems are also visual poems.
Also, Bob's definition remains indefensible: "poetry that uses mathematical symbols that actually carry out mathematical operations." These mathematical operations are not actual; they are apparent. That is a big different. Duck cannot be divided by yellow in any mathematical way, though it could in a metaphoric way that has nothing to do with math directly.”
Kaz said:
Gee Geof,
I am going to have to take exception to both of you on a couple of things. First I will start with you and the top paragraph. Unfortunately I have never seen a definition of Visual Poetry that everyone agrees upon. Yet I will have to say that I like what I understand to be Karl Kempton and Karl Young’s definition of: “Visual Poetry is a Poetry that has to be seen” This is such a simple yet powerful definition that seems to me to be true in every case of vizpo that I have seen. With that being said, There are what I would consider pure mathematical poems whereby they can be understood by reading them alone. An example would be, “Love is equal to the limit of 1 over ‘x’ as ‘x’ approaches zero”. This mathematical poem can be understood perfectly without seeing it therefore it would not be visual poetry.
In the next paragraph above Bob states that, " These mathematical operations are not actual; they are apparent. That is a big different.”
I will argue that these operations are actual and they work the same as any equation in applied mathematics. The ‘variable’ or we can say ‘concept’ or ‘word’ in any mathematical poem can be substituted with a number that represents the value of the variable/concept/word/term. The ‘word’ can be substituted with a multitude of numbers just like in the equation ‘x’ equals ‘y’ squared whereby x can equal anything and y will equal whatever x is squared. The thing to focus on is that the words have value or magnitude and they have mathematical relationship to each other. This means the words in a mathematical poem can be substituted with a number and the words or concepts along with their mathematical syntax within the equation provides the units or “unit meaning”. To make this clear let’s look at the equation from physics d=vt or distance is equal to the velocity multiplied by time. If you look at velocity you get units of miles per hour. If you look at time you get the units hours and when you divide the unit ‘miles per hour’ by ‘hour’ you simple get the unit ‘miles’. And ‘miles’ is the unit for distance. Notice we did not talk a bit about numbers, yet, those variables can all be replaced with numbers and it is important to note, the units will remain. Mathematical poetry is the same however the units are created within the poem itself. Unfortunately all the mathematical poets I know are not addressing this issue and thus are missing the boat by thinking that mathematical poems don’t do math.
In your next example where Duck is divided by yellow you say that you cannot divide it in any mathematical way. This is not true you can divide it, however, it is pretty much meaningless gibberish at worse and a wild metaphor at best. The bottom line is that Duck divided by yellow is not anymore incoherent than much of Gertrude Stein’s work.
Endwar (Andrew Russ) wrote:
On mathematical poetry and mathematics: I’m not sure I agree completely with anyone here. It seems to me that in a mathematical poem one sees a mathematical operation with words (usually) operating in a metaphorical way (thus the poetry enters). That said, the mathematical operations involved are usually well-defined for numbers, but not for various words and concepts. “3+1=2” is something everyone (is taught to) agrees on in a literal way, and it follows from the definitions of each number and the signs “+” and “=”. The statement "candy cane + child = happiness" is also probably pretty generally understood, but not with the same level of definiteness (or definition, as per the previous sentence) as the numerical example earlier. You could write "candy cane + child = obesity", which would probably also be understood, but because of the metaphorical nature of the math, you can’t conclude (via the law of substitution) that “happiness = obesity” (though some may point out the phrase “fat, dumb, and happy”, which could then lead us to conclude “happiness = obesity = stupidity” . . . You can see, then where the multiple meanings of words (bifurcations of meaning, to throw in another mathematical metaphor popular in some at one time trendy lit-crit circles)) can lead.)
I would argue that a mathematical poem is a statement that represents a mathematical operation on the words involved, but which isn’t necessarily one that can be checked the way mathematical statements with numbers can be. I will even go one step further and assert that one can create a mathematical poem that is mathematically wrong but which still makes a metaphorical point. I have done this using matrix multiplication – a 2x2 matrix times a 2x1 vector is set equal to a 3x1 vector. That’s not something you can do with real number (or even imaginary number) math, but I think it works as a poem.
Written mathematics is inherently visual, not verbal: I can grant Bob’s point that “3-1=2” is visually not interesting, and furthermore it hardly matters what font is used. It does matter a bit what numbers are used – roman numerals will say “III-I=II”, and binary says “11-1=10”, and ternary says “10-1=2”, which are all the same numerically. But it becomes evident for large numbers that roman numerals are unwieldy for calculating, and we are used to the decimal number system, so the non-decimal numbers need cumbersome subscripts or context to be read as intended. I would argue, though, that the real test of whether we have something verbal versus something visual is whether the statement can be read aloud. Again “Three minus one equals two,” is pretty straightforward, but that is merely because of the simplicity of the expression. Try reading, say, a passage out of the middle of J.D. Jackson’s Classical Electrodynamics or any other graduate physics or mathematics text, and it will be immediately obvious why these equations aren’t written out in words and why mathematicians and scientists do nearly all their professional discussions with slides or in the presence of a blackboard. And even if one does manage to put the text purely into words read aloud, you will find nobody in the audience who will understand what has been said who hasn’t at least written down some equations or a drawing as a guide. One of the most tedious reading experiences I had was a few pages out of an algebra text written by Leonhard Euler, who felt it was necessary to write down an equation and then repeat the equation in words, such as:
“E=mv ²/2
The kinetic energy is equal to half the product of the mass and the square of the velocity.” This continues for page after page.
If you’re still not convinced, show me how to do read calculus aloud and make it intelligible. Two pages minimum.
Because the visual representation is integral to the intelligible communication of all but the simplest mathematics, I would argue that mathematics is inherently visual language, and that by extension, mathematical poetry is also inherently visual poetry. The visual poem may still not depend on which font is used (though I have examples where that is the case as well), but it still can’t be read aloud and have the same meaning, because it will not then register as mathematical.
Kaz wrote in response to Endwar:
That is an interesting argument however, you seem to be making a distinction between the existence of a math equation which doesn’t have to be seen (like your Euler example) and then the distinction of performing the mathematical operations which have to been seen. (or at least I will agree that I would have extreme difficulty working out equations with out seeing them). Yet, since you can have math equations in verbal form (you just can’t work them out) it seems that math does not have to be in visual form and therefore not necessarily ‘exclusively’ visual. Or this begs the question what is math? Is it the performing of mathematical expressions or is it the expression itself? Or a mathematical Platonist would claim that math is an inherent object in nature … Gee why did I have to drag the Platonists into this – go ahead and slap me and forget that I said that.
Yours,
Kaz
Bob Grumman wrote:
Thanks for all the comments, endwar. I’ll get to all of them, I hope. Right now, just some thoughts in response to your comments about mathematical poetry.
I don’t care whether a poem can be read aloud or not. Mathematics is written in text just as ordinary verbal material is. Text printed standardly is effectively not visual, as far as I’m concerned: it’s symbolic. So a purely mathematical poem, in my definition, would be expressed in verbal and mathematical symbols.
On further thought, it seems to me all mathematics can be read out loud. So what if one needs to see it on the page to understand it? That would be true of many linguexclusive poems, too. Even relatively simple ones. I’ve almost never understood poems I was unfamiliar with when read at poetry readings.
As for the child and candy cane, I like your reasoning, but it now seems to me you have simple shown that “candy cane + child = happiness” and “candy cane + child = obesity” are both incorrect! They should be “candy cane + child = happiness + X” and “candy cane + child = obesity +Y.” And “happiness – obesity + X – Y.”
* * * * * * *
.
By the way, I love this discussion of mathematical poetry. I suddenly wondered, though, if there’s a subject fewer people in the world would be interested in.
One futher note: even if we admitted that difficult math must be seen to be understood, that would not make “candy cane + child – X = happiness” a visual poem since that particular poem would not have to be seen to be understood. That said, I can’t wait for the first mathematical poem based on mathematics you have to see on the page to understand.
–Bob
Kaz wrote:
As far as this Candy Cane analogy goes. I think that in both cases multiplication works better than addition. That said, I would imagine that people would relate to the following best.
Candy cane + childhood = happiness
Candy Cane x childhood = obesity
I am going to ignore the two equations above and rewrite them as multiplication problems with coefficients. The bottom-line is asking what numerical values you assign to these variables or words:
1(Candy Cane) multiplied by 100000(Childhood) equals 1(happiness)
Yet,
1000(Candy Cane) multiplied by 1(Childhood) equal 1(Obesity)
Kaz wrote:
Bob said, “Text printed standardly is effectively not visual, as far as I'm concerned: it's symbolic”
Gee Bob, if symbols are not visual then what are they? … verbal descriptions of symbols are just that ‘descriptions’ they are not the symbol.
Here you make an excellent point that language is just as difficult to understand when listened to as large mathematical equations Thus making a stronger case that pure mathematical poetry is not visual poetry or possibly making the case that all poetry is visual:
“On further thought, it seems to me all mathematics can be read out loud. So what if one needs to see it on the page to understand it? That would be true of many linguexclusive poems, too. Even relatively simple ones. I've almost never understood poems I was unfamiliar with when read at poetry readings.”
Instead of the definition of Visual poetry being – Poetry that has to be seen then state it as such: “Visual poetry is poetry that cannot be verbalized.”
Kaz wrote:
Bob said on his blog:
This is, I believe, the first time I’ve accepted that the operations are metaphorical, as Gregory St. Thomasino tried to convince me six months or so ago. My trouble (still) is that the operations seem actual to me–the sun really does multiply a field to get flowers!
Kaz said as a comment to Bob’s Blog:
There is a bit of a disconnect here. All mathematics is based in metaphor not just mathematical poetry. The problem Gregory had was that he was trying to delineate mathematical poetry from pure mathematics by claiming that mathematical poetry works by analogy and Pure mathematics doesn’t.
If you read George Lakoff’s book “Where mathematics comes from” then you will come to realize that all mathematics is based in metaphor. Not just mathematical poetry.
Posted by Kaz Maslanka at 12:44 AM 7 comments
Labels: Bob Grumman, Endwar, Geof Huth, Mathematical Poetry, Types of Mathematical Poetry
Blue Book Formulae by Connie Tettenborn
Posted by Kaz Maslanka at 12:38 AM 0 comments
Labels: Connie Tettenborn
"The Root of Pi" by Karl Kempton
Posted by Kaz Maslanka at 12:35 AM 0 comments
Labels: Karl Kempton, mathematical visual poetry
Saturday, January 08, 2011
The Lab Gallery 2010 Retrospective Video
Here is a retrospective video showing snipits of all the shows at "The Lab Gallery" in NYC. If you have a keen eye you will see a glimpse of myself and my show "A Spectrum Of Jewels" amid the clips.
Here is a link to My Show at "The Lab Gallery"
Posted by Kaz Maslanka at 9:22 PM 0 comments
Labels: A Spectrum Of Jewels, Dodecaorthogonal Space Poem, orthogonal space poem, Roger Smith Labs
Saturday, January 01, 2011
Happy New Year Everyone
I noticed that the NYC new years ball was decorated with Sierpinski triangles.
Pretty Cool.
Happy New Year!
Kaz
Posted by Kaz Maslanka at 12:28 AM 0 comments
Labels: Happy New Year, Sierpinski
Wednesday, December 29, 2010
New Singularity
This post is a new version of the proportional poem posted December 13, 2010.
Posted by Kaz Maslanka at 1:06 AM 6 comments
Labels: proportional poems, Richard Kostelanetz, similar triangles poems, singularity
Saturday, December 18, 2010
A Thought From Samuel Butler
Posted by Kaz Maslanka at 4:40 PM 0 comments
Labels: Kaz Quote, Samuel Butler
Monday, December 13, 2010
Singularity by Kaz Maslanka
Here is a new proportional poem titled "Singularity".
If you are not familiar with how to read proportional poems please click here
Posted by Kaz Maslanka at 1:42 AM 0 comments
Thursday, December 09, 2010
Kaz Quote
To be a great artist one must immerse oneself in the tragedies of culture, only then can one awaken ones empathy.
Posted by Kaz Maslanka at 9:45 PM 2 comments
Labels: Kaz Quote
Sunday, November 28, 2010
The Polyaesthetic Work Of Keith Tyson
Here is some polyaesthetic work I was recently turned on to. The artist, Keith Tyson won the Turner prize in England for his work and I am certainly happy that our genre is getting more attention. The poetic content reminds me of Scott Helmes's work yet this work is obviously polyaesthetic due to the mixture of visual images. Very Cool!
Posted by Kaz Maslanka at 9:09 PM 0 comments
Labels: Keith Tyson, Polyaesthetics
Tuesday, November 23, 2010
New Math @ Mathematical Poetry
New Math
Craig Damrauer calls his 'Mathphorism' pieces “New Math” I would like to share the fact that he created new a set of Equational post cards. The group was edited by Ed Ruscha and quickly sold out. Here is a sample from the set:
Posted by Kaz Maslanka at 10:32 PM 0 comments
Labels: Craig Damrauer, new math
Fractured By Connie Tettenborn
Posted by Kaz Maslanka at 10:24 PM 0 comments
Labels: Connie Tettenborn, orthogonal space poem
Sunday, November 21, 2010
Blood Manure Nature And The Despot
Here are three new proportional/similar triangles poems.
Posted by Kaz Maslanka at 1:48 AM 1 comments
Monday, November 08, 2010
Proof With Words by Art Benjamin
Here is one submitted to me by Xenharmonic Guru John Chalmers. This is right in line with Karl Kemptons thread of thought
Posted by Kaz Maslanka at 12:19 AM 6 comments
Labels: Art Benjamin, Karl Kempton
Thursday, November 04, 2010
Benoit Mandelbrot Passes Away October 14
Benoit Mandelbrot passed away this last October 14 and left a legacy of fractal geometry behind him. It is quite amazing that a simple formula such as z = z^2 + c could be iterated and produce such beautiful images. Here is a rock music video by M. Eric Carr with music that was written and sung by Jonathan Coulton as a tribute to Mandelbrot and I find it quite clever.
Here are some fractals that I made using some software called ultrafractal and many of these are based on the Mandelbrot set. What I find most fascinating about these images is that when you are looking at them you are visualizing one small but beautiful facet of the logical structure in your mind. It is like a magical magnifying mirror looking directly at the logical foundation of the house you call mind.
Posted by Kaz Maslanka at 11:36 PM 7 comments
Labels: M. Eric Carr, Mandelbrot