Blog is now updated!
It has been almost two months without any post, today will be the lucky day as i just wrote one :) Actually,I don't mean to delay,but since couple of months ago, i just can't access to the blogspot site. UTM's server admin seems to block this IP from our view, i guess maybe they just want to prevent the opposition from propagating their propaganda (checkout Mahasiswa-UTM), what a chicken! huhu As time past by, i've solve every problem related to my final year project, i already chose different topic and.. Tada! I already submitted the first 2 chapters! haha
Since September, i propose to my supervisor to do Soliton besides the topic before. This subject has a wide and broad interest within the real maths and physics world, since then, many book , articles and journals about soliton's research easily can be found. My interest in soliton study is it Korteweg-de Vries Equation via Hirota Bilinear Method. To those who already puzzle, what is soliton? Here is some information about it. In mathematics and physics, a soliton is a self-reinforcing solitary wave caused by a delicate balance between nonlinear and dispersive effects in the medium. Solitons are found in many physical phenomena, as they arise as the solutions of a widespread class of weakly nonlinear dispersive partial differential equations describing physical systems. The soliton phenomenon was first described by John Scott Russell (1808-1882) who observed a solitary wave in the Union Canal, reproduced the phenomenon in a wave tank, and named it the "Wave of Translation".
It is not easy to define precisely what a soliton is. Drazin and Johnson (1989) describe solitons as solutions of nonlinear differential equations which
1. represent waves of permanent form;
2. are localised, so that they decay or approach a constant at infinity;
3. can interact strongly with other solitons, but they emerge from the collision unchanged apart from a phase shift
Basicly, soliton is all about nonlinear partial differential equations. Since, all of it's equation have nonlinear form, besides Korteweg-de Vries Equation (KdV)they are cubical Scrodinger equation, sine-klein gordon, kadomstev-petviashivili equation and so on. Well, i see that you guys just got bored. hehe I am so exited about soliton, it's fun!
Well, Raya is just about 2 weeks more. I bought my bus ticket for the 20th, whaa.. just couldn't wait to go home :). Before that, By the 18th, i planned to shop for new cloths, the fund was sponsered by my mother. hehe I still confuse what to buy, previously i bought something that look expensive but cheap in price, off course, big sales stuff! Any jeans or shirts with discount up to 50% will be grabbed, as long as the size is match and fit. I wish to shop and spree in JB only,because i don't have much time to go to KL. Well, i want put a full stop here, until next time :P
