Weekend Cat Blogging and more: Glass and metal

This weekend, Luna relaxes by the glass and metal table, just like she used to in our previous home:

Perhaps this is a good weekend to join some of our friends in Photo Hunters, as the theme this weekend is “metal.” Or “Easy like Sunday”, even though it's Saturday.

It looks like more of our friends are experiencing the joy that is moving one's home. Megan and the Bad Kitty Cats are moving. We wish them well. Samantha and Tigger have stepped in to host this weekend's Bad Kitty Cats Festival of Chaos.

This seems to be a rather mobile weekend, and the “cat boys” Kashim and Othello will host Weekend Cat Blogging #146 just as soon as they get back from their Easter trip.

The Carnival of the Cats will be also be this Sunday at Chey's Place. And of course, the Friday Ark is at the modulator.

Our thoughts this weekend are with the family of Smudge. He passed away this Friday.

The logistic function revisted

Today we revisit one of our most popular articles, on the logistic function:

f(x) = ax(x-1)

In the original article, we demonstrated how we can use this function as a “logistic map” by iterating (i.e.,applying it repeatedly to the previous result). The logistic map produced different sorts of behavior depending on the values of a. For example, for some values of a, iteration settles into a cycle, bouncing among two or more points on the function.

The original article provided more examples and more detail about the mathematics, and those who are interested are encouraged to go back and check it out. One of the main this we discussed was how one can characterize the logistic function over
different values of a using a graph called a bifurcation
diagram. As the values of a increase (a is labelled as “r” in this graphic I shamelessly but legally ripped off from wikipedia), one can observe vertically the period doubling where the logistic map converges on a single value, then bounces between two points, then four, then eight, and so on, until the onset of chaos at approximately 3.57.

When a is greater than or equal to 4, the function “diverges”, i.e., it just gets bigger and bigger (or smaller and smaller because the numbers are negative) when you repeatedly apply it.

The bifurcation diagram shows what happens for real values of a, i.e., all integers, fractions and other numbers that can be expressed as a decimal. But suppose we allow a to be any complex number, or any combination of real and “imaginary” numbers (i.e., square roots of negative numbers). Real numbers can be expressed a line, while complex numbers are expressed on a plane. So we can produce an analog of the bifurcation diagram over a plane instead of a line as above.

In the following diagrams, we are looking at the complex plane of
different values for a. If the logistic map converges to either a single value or a cycle, the location on the plane is colored in black. If it diverges, i.e., gets infinitely farther away from zero, then the location is white. Unlike for real numbers, where the convergent “black” values of a form a simple line segment, for complex numbers the set of convergent values is a lot more “complex”:

Zooming in, we can see the structure of the set, with lots of smaller “bubbles” and “filaments” off of the main circles. The large circles are the complex-number equivalents of the single-line sections of the bifurcation diagrams, with the small bubbles representing cycles and period doubling.

Some readers might recognize similarities between this set and more well-known Mandelbrot set:

The similarity is more than coincidence, as the Mandelbrot set is based on a map similar to the logistic map. But the Mandelbrot set has the pronounced cardioid shape and asymmetry different from the logistic-map set. Zooming in further, we see that filaments and local areas of the two sets have more similarity. Indeed, we see small “Mandelbrot-like sets” at the junctions of the filaments:

It is interesting how these miniature versions have a shape similar to Mandelbrot set rather than the double-circle of the logistic-map set.

Although these sets have a “fractal-like” qualities, neither is a fractal in the strict sense of the word. They are not strictly self-similar, nor do they have fractional dimension. Nonetheless, we are featuring the logistic-map set as a “Friday Fractal” , an event started by our friend Andrée at meeyauw.

I am not sure the logistic-map set has a name like the Mandelbrot set has, so how about calling it the CatSynth set?

Submitted to Carnival of Mathematics #29.







Aquatic at Amazon


Well, it looks like my album Aquatic is available at Amazon. Or rather, via Amazon's MP3 download service. Amazon provides music for sale as straight MP3, with no DRM (Digital Rights Management) so that you can play them anywhere (and also copy them). Previously, the only way to get this and many other albums as DRM-free MP3s was to subscribe to a service like eMusic, or just steal them.

I did also notice that the album appears in Amazon Marketplace – in fact, a store in Santa Cruz is offering a used copy. That is itself a milestone, to find your own album in a used bin. That means someone who had a copy gave it up. Hopefully it's not because he or she disliked it. Indeed, I would prefer that they ripped it and continue to enjoy it (DRM-free, of course). It's not because I want people to steal music, but it is worth more to me just to know that people are listening…

Which brings us back to Amazon. I'm not expecting to sell a lot here, but it's great forum for feedback and comments, so I encourage anyone who has the album or individual tracks, legal or otherwise, to write a comment or review…



Weekend Cat Blogging and more: "Light"

This weekend we have some interesting “bright” photos:

It is amazing how the diagonals in both photos seem to line up.

In the first we have Luna peering off one of the balconies, as she is wont to do . The second could be an “easy like Sunday” photo, but one can also see the bases of Luna's paws, which is the theme of this weekend's Bad Kitty Cats Festival of Chaos. No chaos here, of course.

Some sad news this weekend from our friend's at What Did You Eat. Upsie has being diagnosed with cancer. Her prognosis is pretty grim. She does at least get to go off of her diet and enjoy some of the pleasures of life for last few months. We at CatSynth extend our thoughts to Upsie and to our friend sher – they also lost Sundance last summer.

Weekend Cat Blogging #145 will be held at the The Cat Blogosphere.

The Bad Kitty Cats Festival of Chaos will be hosted this weekend by Pet & The Bengal Brats at Pet?s Garden Blog. The optional theme this weekend is “toes and claws.”

Carnival of the Cats will be on this Sunday at This, That and The Other Thing.

And of course Friday Ark #182 will be at the modulator

Fun with Pi (Day)

We saw this picture on meeyauw, and thought it was a good way to open our own Pi Day offering. Pi Day, or π day is celebrated on March 14 (3/14) of every year.

π does turn up in some interesting places besides circles and standard trigonometry (and LOLcat photos). There is of course Euler's famous identity:

which unites π with four of the other most famous constants in mathematics: zero, 1, i (the imaginary root of -1) and e. But it also turns up in some more surprising places. Consider the well-known factorial function, where n! or “n factorial” is the product of all the integers between 1 and n. For example:

5! = 5×4×3×2×1 = 120.

Simple enough. But of course some troublemaker is eventually going to ask for the factorial of 1/2. Not so easy. Fortunately, there is a function, called the Gamma function, that provides a solution:

Not really as simple as the original integer-only factorial. Once calculus is involved, might as well forget about it. But if you go through the trouble of plugging in 1/2 to the formula, you get the following intriguing result:

or

So the factorial of one half is one half the square root of π. Who knew?