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.

Why are there paradoxes? This book uses paraconsistent logic to develop the mathematics to find out.