Second-Order Bi-Scalar-Tensor Field Equations in a Space of Four-Dimensions (2405.08303v2)

Abstract: Lagrange scalar densities which are concomitants of two scalar fields, a pseudo-Riemannian metric tensor, and their derivatives of arbitrary differential order are investigated in a space of four-dimensions. My intention was to construct the most general second-order Euler-Lagrange tensor densities derivable from such a Lagrangian. It is demonstrated that many such second-order Euler-Lagrange tensor densities can be derived from a set of four Lagrangians which are at most of second-order. These Lagrangians will have a total of six scalar coefficients, each of which is a concomitant of five variables: the two scalar fields, and the three inner products of the gradients of the two scalar fields. Of these six coefficient functions only one is arbitrary, while the other five must satisfy linear partial differential equations. These non-arbitrary scalar functions break up into three groups: two groups of two, and one single function, with different groups appearing in different Lagrangians. Surprisingly each of these five functions give rise to solutions to the wave equation in three-dimensional Minkowski space. However, I do not construct all of the second-order bi-scalar-tensor field equations that can be obtained in a space of four-dimensions, and remark on what needs to be done to do so. I conclude the paper by presenting twelve second-order bi-scalar-tensor Lagrangians, involving eighteen coefficient functions, and conjecture that these Lagrangians can be used to construct all possible second-order bi-scalar-tensor field equations in a space of four-dimensions.