Bloch was born in 1893 in Besançon, France. According to one of his teachers, Georges Valiron, both André Bloch and his younger brother Georges were in the same class in October 1910. Valiron believed Georges to have the better talent, and due to lack of preparation, André finished last in the class. André was spared from failing the class by convincing Ernest Vessiot to give him an oral exam. The exam convinced Vessiot of Andre's talent and both André and Georges entered the École Polytechnique.
World War IEdit
Both Bloch brothers were injured: André suffered a fall from an observation post, while Georges sustained a head wound which cost him an eye. Georges was released from service and returned to the École Polytechnique on 7 October 1917. André, however, was allowed to convalesce but not released from duty.
On 17 November 1917, while on convalescent leave from service in World War I, Bloch killed his brother Georges and his aunt and uncle. Several conjectures about the motives for Bloch's crime exist among mathematicians. However, Cartan and Ferrand quote Henri Baruk, who was the medical head of the asylum where Bloch was confined. Bloch told Baruk that the murders were a eugenic act, in order to eliminate branches of his family affected by mental illness.
Commitment and mathematical careerEdit
After the murders, Bloch was committed to the asylum at Charenton in Saint Maurice, a suburb of Paris. Bloch continued his mathematical career while confined. All of his publications, including those relating to Bloch's constant, were written while he was committed. Bloch corresponded with several mathematicians, including Georges Valiron, George Pólya, Jacques Hadamard and others, giving his return address as only "57 Grande rue, Saint-Maurice", never mentioning that this was a psychiatric hospital. Several of his correspondents were thus unaware of his confinement.
During the German occupation of France, Bloch (who was Jewish) wrote under aliases, in order to avoid advertising his presence to Nazi occupiers. In particular, Bloch is known to have authored papers under the names of René Binaud and Marcel Segond during this time.
According to Pólya, Bloch had the habit of dating his letters with 1 April, regardless of when they were written.
Most important works of Bloch belong to complex analysis.
His early contribution is known as Bloch's theorem. This theorem asserts the existence of a certain absolute constant which is called the Bloch constant. The exact value of the Bloch constant is still unknown as of 2021[update]. Research originating from this theorem led to introduction of Bloch's functions which form the so-called Bloch space. (This usage should not be confused with Bloch's functions of Swiss physicist Felix Bloch.)
Bloch formulated two important philosophical principles which proved to be useful in research in complex analysis. The more famous of these two is the so-called Bloch's principle. In Bloch's own words it is formulated (in Latin) as follows: "Nihil est in infinito quod non prius fuerit in finito", translated as "There is nothing in the infinite that did not exist before in the finite". Guided by this principle, Bloch was able to discover several important facts which were later proved by other mathematicians, for example, the five-island theorem. There is an intensive current research related to Bloch's principle.
Bloch's ideas stimulated much of the research on holomorphic curves in the 20th century and remain central in this subfield. He stated a fundamental theorem on holomorphic curves in complex manifolds whose irregularity exceeds dimension. (This can be considered as a deep and far-reaching generalization of Picard's theorem.) His proof of this theorem contained gaps (which he recognized), and later the theorem was known as "Bloch's conjecture". Bloch's conjecture, as stated, was proved by Takushiro Ochiai, Pit Man Wong, and simultaneously by Yujiro Kawamata in 1980,  and the related research started a new area which is called holomorphic curves in Abelian varieties (and semi-Abelian varieties).
Bloch was the first (jointly with Pólya) to consider the distribution of roots of random polynomials, which is another area of research which is intensively developing since the middle of 20th century.
- O'Connor, John J.; Robertson, Edmund F. (December 1996), "Andre Bloch", MacTutor History of Mathematics archive, University of St Andrews
- G. Valiron, Des Théorèmes de Bloch aux Théories d'Ahlfors, Bulletin des Sciences Mathematiques 73 (1949) 152–162.
- D. Campbell, Beauty and the beast: The strange case of André Bloch, The Mathematical Intelligencer 7 (1985) 36–38.
- Cartan, Henri; Ferrand, Jacqueline (1988), "The Case of André Bloch", The Mathematical Intelligencer, 10 (1): 23–26, doi:10.1007/BF03023847, MR 0918660
- See the article by Campbell for several anecdotal examples. Henri Cartan and Jacqueline Ferrand note that "certain of these conjectures are outrageously eccentric". Steven G. Krantz ("Mathematical Apocrypha: Stories and Anecdotes of Mathematicians and the Mathematical", American Mathematical Society, 2002) also lists some conjectures.
- Bloch, André (1926). "La conception actuelle de la theorie des fonctions entieres et meromorphes". L'Enseignement Mathématique. 25: 83–103.
- Bloch, André (1926). "Sur les systemes de fonctions uniformes satisfaisant a l'equations d'une variete algebriques dont l'irregularite depasse la dimension". Journal de Mathématiques Pures et Appliquées. 5: 19–66.
- Noguchi, Junjiro; Ochiai, Takushiro (1990). Geometric function theory in several complex variables. Providence RI: American Mathematical Society.
- Bloch, André; Pólya, George (1931). "On the roots of certain algebraic equations". Proceedings of the London Mathematical Society. 33: 102–114. doi:10.1112/plms/s2-33.1.102.