Janko group J1

In the area of modern algebra known as group theory, the Janko group J₁ is a sporadic simple group of order

J₁ is one of the 26 sporadic groups and was originally described by Zvonimir Janko in 1965. It is the only Janko group whose existence was proved by Janko himself and was the first sporadic group to be found since the discovery of the Mathieu groups in the 19th century. Its discovery launched the modern theory of sporadic groups.

In 1982 R. L. Griess showed that J₁ cannot be a subquotient of the monster group. Thus it is one of the 6 sporadic groups called the pariahs.

J₁ has no outer automorphisms and its Schur multiplier is trivial.

J₁ can be characterized abstractly as the unique simple group with abelian 2-Sylow subgroups and with an involution whose centralizer is isomorphic to the direct product of the group of order two and the alternating group A₅ of order 60, which is to say, the rotational icosahedral group. That was Janko's original conception of the group. In fact Janko and Thompson were investigating groups similar to the Ree groups ²G₂(3²ⁿ⁺¹), and showed that if a simple group G has abelian Sylow 2-subgroups and a centralizer of an involution of the form Z/2Z×PSL₂(q) for q a prime power at least 3, then either q is a power of 3 and G has the same order as a Ree group (it was later shown that G must be a Ree group in this case) or q is 4 or 5. Note that PSL₂(4)=PSL₂(5)=A₅. This last exceptional case led to the Janko group J₁.

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