ABSTRACTLarge‐time patterns of general higher‐order lump solutions in the Kadomtsev–Petviashvili I (KP‐I) equation are investigated. It is shown that when the index vector of the general lump solution is a sequence of consecutive odd integers starting from one, the large‐time pattern in the spatial ‐plane generically would comprise fundamental lumps uniformly distributed on concentric rings. For other index vectors, the large‐time pattern would comprise fundamental lumps in the outer region as described analytically by the nonzero‐root structure of the associated Wronskian–Hermite polynomial, together with possible fundamental lumps in the inner region that are uniformly distributed on concentric rings generically. Leading‐order predictions of fundamental lumps in these solution patterns are also derived. The predicted patterns at large times are compared to true solutions, and good agreement is observed.
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