Glasnik Matematicki, Vol. 59, No. 1 (2024), 125-145. \( \)

SOME RESULTS IN ASYMPTOTIC ANALYSIS OF FINITE-ENERGY SEQUENCES OF ONE-DIMENSIONAL CAHN–HILLIARD FUNCTIONAL WITH NON-STANDARD TWO-WELL POTENTIAL

Andrija Raguž

Department of Economics and Mathematics, Zagreb School of Economics and Management, Filipa Vukasovića 1, 10 000 Zagreb, Croatia
e-mail:araguz@zsem.hr

Abstract.   In this paper we extend the consideration of G. Leoni pertaining to the finite-energy sequences of the one-dimensional Cahn-Hilliard functional \[ I^{\varepsilon}_0(u)=\int_{0}^{1}\Big({\varepsilon}^2 u'^2(s)+W(u(s))\Big)ds, \] where \(u\in {\rm H}^{1}(0,1)\) and where \(W\) is a two-well potential with symmetrically placed wells endowed with a non-standard integrability condition. We introduce several new classes of finite-energy sequences, we recover their underlying geometric properties as \(\varepsilon\longrightarrow 0\), and we prove the related compactness result.

2020 Mathematics Subject Classification.   34E15, 49J45

Key words and phrases.   Asymptotic analysis, singular perturbation, Young measures, Cahn-Hilliard functional, compactness

https://doi.org/10.3336/gm.59.1.06

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