Google Groups no longer supports new Usenet posts or subscriptions. Historical content remains viewable.
Dismiss

Breaking into the Vector Mathematics of Displacement Cryptography.

27 views
Skip to first unread message

austin...@hotmail.com

unread,
May 14, 2012, 2:52:25 PM5/14/12
to

A book that some readers may like is this one called “Advanced Engineering Mathematics “ by K.A. Stroud & Dexter J. Booth. Sixth Edition - ISBN –10; 1403942463

Don’t be put off by the ‘advanced’ bit or the ‘engineering’ bit in the title because the chapters on “Vectors” is all you want – it will be a useful book to have on your shelf after that just the same for future use when refreshing other topics.

What I like about this book is that it takes the non-specialist crypto reader into the topic of vector methods very quickly in discreet modules that will bring the reader up to flying speed quite quickly.

It teaches the reader to teach one’s self by means of program learning – this is the best approach to my mind for readers from other non-engineering disciplines in sci crypt who want to zoom in quickly and get enough vector maths under their belts to deal with this cryptography quickly.

Some readers may not like the ‘program’ learning bit per se but this is simply a quick and easy means to a convenient end that is very readable and should be of interest to anyone wanting to get on top of this vector cryptography easily.

After all, you don’t need to buy a dairy farm when all you need is a pint of milk.

Enjoy,

- adacrypt

bert

unread,
May 15, 2012, 9:01:00 AM5/15/12
to
On Monday, May 14, 2012 7:52:25 PM UTC+1, austin...@hotmail.com wrote:
> ... vector methods ... in discreet modules ...

That would be interesting. But perhaps you meant "discrete"?
--

rossum

unread,
May 16, 2012, 7:33:24 AM5/16/12
to
No. Those modules are very shy, and like to stay well in the
background where they are difficult to notice. :)

rossum

tom st denis

unread,
May 16, 2012, 8:08:45 AM5/16/12
to
Given that the OP doesn't know what EITHER word means I doubt we'll
ever know.
0 new messages