A diversity of localized structures in a (2 + 1)-dimensional KdV equation

## a b s t r a c t In this work, a completely integrable (2 + 1)-dimensional KdV6 equation is investigated. The Cole-Hopf transformation method combined with the Hirota's bilinear sense are used to determine two sets of solutions for this equation. Multiple soliton solutions are formally derived t

Two new 2 + 1 dimensional nonlinear evolution equations are presented. The 2 + 1 dimensional equations closely relate with a hierarchy of 1 + 1 dimensional soliton equations. Through nonlinearizing of Lax pairs, the 1 + 1 dimensional evolution equations are decomposed to the finite dimensional integ

In the framework of a series of studies carried out by our research team, the excess molar enthalpies H E m and excess molar volumes V E m for 21 binary mixtures composed of one of three butyl esters (ethanoate, propanoate, and butanoate) and one of seven odd n-alkanes (pentane to heptadecane) were

Starting from the standard truncated Painlev e e expansion, a B€ a acklund transformation for the (2 + 1)-dimensional breaking soliton equation is derived. Making use of the variable separation approach, a variable separation solution of this model is obtained. By selecting appropriate multi-valued