The results of Goedel have been used to cast doubt on the "foundations" of mathematics and the "strong AI" problem. But they have also been used to support "strong AI", as it is felt that the existence of self-referential statements are an indication that a machine is conscious. All of these arguments are interesting, but they have yet to help in the practice of mathematics or in the construction of intelligent machines. In fact, too long an emphasis on these results has probably retarded the advancement of artificial intelligence research. The incompleteness theorems though have stimulated research in the field of 'automatic theorem proving' and in this respect they can be said to have had some value.
This book gives an overview of Goedel's incompleteness theorems and its corollaries from a "semi-popular" point of view, meaning that readers are expected to have some background in elementary logic as well as philosophy, in order to appreciate the contents. The author is eloquent and enthusiatic throughout the book, and this serves to make the book more palatable for the absolute beginner. It would be unfortunate maybe that readers will begin to doubt the "truth" of mathematics after reading this book, but that doubt could also be viewed as a virtue, in that it would motivate further thinking and research. But again, to this date there has been no self-referential statement that has appeared in the everyday practice of mathematics....that I know of anyway.
Student: If I believe that God exists, then I will also believe that I will be saved? Professor: It that is true, then God exists. Student: If I believe that God exists, then will I be saved? Professor: If God exists, then that is true. Prove that if the professor is accurate and if the student believes the professor, then God must exist and the student will be saved" You may also be given insight into one of the most fundamental questions regarding human existence. Published in Journal of Recreational Mathematics, reprinted with permission.