An incredible insight into mathematical finance of tomorrow

[QCquant]

From simple to complex, the book presents familiar financial concepts like stocks, market index (Dow Jones Industrial Average), algorithmic trading, to name just a few, in a manner that have never been experienced before. The reader is taken to a journey throughout a financial mathematics world that it seems detached from the 22nd century science.

http://www.amazon.com/Geometry-Topo...=sr_1_1?s=books&ie=UTF8&qid=1409632543&sr=1-1

 

[Ole Bueker]

Somebody's skipping centuries.

 

[QCquant]

Yea, but is nice to see a fragment of the future...

 

[Daniel Duffy]

Yea, but is nice to see a fragment of the future...

What about a TOC (Table of Contents)?

 

[daleholborow]

Look through the Amazon preview, the grammar needs work and suggests a self-produced and not overtly professional product. Ovidiu, you desperately need an editor, and probably at least the outline of some qualifications and experience before you advertise your book here. Good luck though.

 

[QCquant]

What about a TOC (Table of Contents)?

Daniel, follow the link. It will take you to Amazon where you will find the TOC if you click on" Look inside".

 

[QCquant]

Look through the Amazon preview, the grammar needs work and suggests a self-produced and not overtly professional product. Ovidiu, you desperately need an editor, and probably at least the outline of some qualifications and experience before you advertise your book here. Good luck though.

In case you haven't noticed yet, the book is not a novel.

 

[Daniel Duffy]

Daniel, follow the link. It will take you to Amazon where you will find the TOC if you click on" Look inside".

As a mathematician and progammer, it would be useful to see how knots can be computed in any computer language, specifically algoritms. Take a simple example, let's say GARCH.

 

[QCquant]

Daniel, to compute the knots actually means to compute some polynomials (Jones polynomial). It may look simple but in fact it is a hard problem that classical computers can solve it in exponential time. For simple knots you can find many applications on internet that compute Jones polynomial.
For complex knots only quantum algorithms are of any help. You can find a quantum algo
in the book, but ... it won't look like anything you are familiar with (I said that noticing that you use to code in C++).

 

[Daniel Duffy]

Daniel, to compute the knots actually means to compute some polynomials (Jones polynomial). It may look simple but in fact it is a hard problem that classical computers can solve it in exponential time. For simple knots you can find many applications on internet that compute Jones polynomial.
For complex knots only quantum algorithms are of any help. You can find a quantum algo
in the book, but ... it won't look like anything you are familiar with (I said that noticing that you use to code in C++).

Well, I suppose that rules me out as one of the 50 people in the world who understand this topic

 

[QCquant]

Well, I suppose that rules me out as one of the 50 people in the world who understand this topic

You're reading all forums?
I don't mind if you will be the 51!
I assumed that you're more familiar with classical algorithms and least with quantum algorithms. Please accept my apologies if you feel I offended you in any way.

 

[Daniel Duffy]

You're reading all forums?
I don't mind if you will be the 51!
I assumed that you're more familiar with classical algorithms and least with quantum algorithms. Please accept my apologies if you feel I offended you in any way.

Why should I feel offended?

 

[ExSan]

quantum algorithms ? neither I am familiar with them.
could you please provide some links ?