In the area of modern algebra known as group theory, the Janko groups are the four sporadic simple groups J<sub>1</sub>, J<sub>2</sub>, J<sub>3</sub> and J<sub>4</sub> introduced by Zvonimir Janko. Unlike the Mathieu groups, Conway groups, or Fischer groups, the Janko groups do not form a series, and the relation among the four groups is mainly historical rather than mathematical.
Janko constructed the first of these groups, J<sub>1</sub>, in 1965 and predicted the existence of J<sub>2</sub> and J<sub>3</sub>. In 1976, he suggested the existence of J<sub>4</sub>. Later, J<sub>2</sub>, J<sub>3</sub> and J<sub>4</sub> were all shown to exist.
J<sub>1</sub> was the first sporadic simple group discovered in nearly a century: until then only the Mathieu groups were known, M<sub>11</sub> and M<sub>12</sub> having been found in 1861, and M<sub>22</sub>, M<sub>23</sub> and M<sub>24</sub> in 1873. The discovery of J<sub>1</sub> caused a great "sensation" and "surprise" among group theory specialists. This began the modern theory of sporadic groups.
And in a sense, J<sub>4</sub> ended it. It would be the last sporadic group (and, since the non-sporadic families had already been found, the last finite simple group) predicted and discovered, though this could only be said in hindsight when the Classification theorem was completed.