Why are there paradoxes? This book uses paraconsistent logic to develop the mathematics to find out.
Zach Weber is Associate Professor of Philosophy at the University of Otago, New Zealand.
Part I. What are the Paradoxes?: Introduction to an inconsistent world; 1. Paradoxes; or, 'here in the presence of an absurdity'; Part II. How to Face the Paradoxes?: 2. In search of a uniform solution; 3. Metatheory and naive theory; 4. Prolegomena to any future inconsistent mathematics. Part III. Where are the Paradoxes?: 5. Set theory; 6. Arithmetic; 7. Algebra; 8. Real analysis; 9. Topology. Part IV. Why Are there Paradoxes?: 10. Ordinary paradox.