Vladimir Arnold is one of the great mathematical scientists of our time. He is famous for both the breadth and the depth of his work.
His first mathematical work, which he did being a third-year student, was the solution of the 13th Hilbert problem about superpositions of continuous functions. His early work on KAM (Kolmogorov, Arnold, Moser) theory solved some of the outstanding problems of mechanics that grew out of fundamental questions raised by Poincare and Birkhoff based on the discovery of complex motions in celestial mechanics. In particular, the discovery of invariant tori, their dynamical implications, and attendant resonance phenomena is regarded today as one of the deepest and most significant achievements in the mathematical sciences.
Arnold has been the advisor to more than 60 PhD students, and is famous for his seminar which thrived on his ability to discover new and beautiful problems. He is known all over the world for his textbooks which include the classics Mathematical Methods of Classical Mechanics, and Ordinary Differential Equations, as well as the more recent Topological Methods m Hydrodynamics written together with Boris Khesin, and Lectures on Partial Differential Equations.

This charming book by Vladimir Igorevich Arnold, one of the leading mathematicians of our day, is a collection of his memories from early childhood up to recent days. Mathematicians will read it for the pure pleasure of learning more about one of their most eminent colleagues, and even the non-mathematical reader will find it very difficult to lay aside. It will be of value to historians of twentieth-century mathematics as source material.

Preface.- My first recollections.- The North-West direction.- Vera Stepanovna Arnold (née Zhitkova).- First scientific reminiscences.- The Arnold family.-A household library.- The axiomatic method.- The color of a meridian.- School years.- It is not easy to keep a secret.- The temple of science.- Who is the winner?- State examination on Marxism.- Goodwill.- The thermal conductivity equation.- Lavoisier and French mathematics during the Revolution.- Queen Eleanor, Rosamund, and labyrinth theory.- Place de Vogueses.- 'Champel Sea'.- Neutrinos, neutrons, and Bruno Pontecorvo.- From Pareto to Arzamas.- How to distinguish good and bad mathematical works.- The combinatorics of Plutarch.- Galilei.- The topology of surfaces according to Alexander of Macedon.- Snake-hunting.- Suputinskii nature reserve.- Pheasants of the Vincent forest.- The guillotine and Marie-Antoinette.- Damienss sufferings.- Queen Marguerite and the kingdom of law.- Jeanne dArc as a witch and as a saint.- Ravailliac, French cuisine, and traffic jams.- Anne Yaroslavna, Princess of Russia.- Gennady of Novgorod and education in Russia under Ivan III.- Catherine I and the Prut river campaign.- Catherine II and I.I.Betskoi.- An order of Catherine II.- Radishchev.- The Crimean war.- Princess Dashkova and parachutes.- The desecrated host and abstract algebra.- France Guinea India.- Julius Caesar and Gallians: protecting Rome from Germans.- A planning department.- Mountain lions over Stanford.- The Pocha river and the dog Shnura.- Hong Kong.- The Pongoma river and the Solovetskie islands.- Brazilian tours.- Leibnitz as Bourbakis predecessor.- The 'Mistral' in the 'Crown'.- How academicians were elected and eliminated.- From the history of French economy.- The origins of mathematics: from Greece to Egypt.- Motivation for mathematical education in Israel.- Struggles against foreigners and their languages.- 'Our Manchuria'.- Religion and science, Martin Luther and anti-semitism.- Ramanujan andHardy.- Catching a pike in Cambridge.- Locust swarming and relocation of deer.- Tamil Tigers at the Swiss consulate in Paris.- Picking cranberries.- The Yamal peninsula and digging caves in the snow.- Brain tomography, geometry, and algebra.- Inedible hares.- A question about the bitch of Rabinovitch.- The cemetery at Aksinino