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Solutions of the nonlinear Klein-Gordon equation and the generalized uncertainty principle with the hybrid analytical and numerical method

N. Heidari, M. de Montigny, Ali Ahmadi Azar, T. Sathiyaraj, H. Hassanabadi

2024Nuclear Physics B11 citationsDOIOpen Access PDF

Abstract

Motivated by the prediction of a minimal measurable length at Planck scale found in many candidate theories of quantum gravity, we examine the Klein-Gordon equation with a λ ϕ 4 interaction and a symmetry-breaking term, in the presence of a generalized uncertainty principle associated with a minimal length. This allows us to assess the correction which underlying physical systems of scalar fields would undergo. Further, we solve the Euler-Lagrange equation by applying the Hybrid Analytical and Numerical (or HAN, for short) method, an effective approach for solving a large variety of nonlinear ordinary and partial differential equations.

Topics & Concepts

Nonlinear systemMathematicsApplied mathematicsCalculus (dental)Mathematical analysisPhysicsQuantum mechanicsMedicineDentistryNoncommutative and Quantum Gravity TheoriesQuantum Mechanics and Non-Hermitian PhysicsBlack Holes and Theoretical Physics